144.34/144.25 MAYBE 144.34/144.25 144.34/144.25 DP problem for innermost termination. 144.34/144.25 P = 144.34/144.25 f243#(x1, x2, x3) -> f242#(x1, x2, x3) 144.34/144.25 f242#(I0, I1, I2) -> f241#(2, 0, 0) 144.34/144.25 f35#(I3, I4, I5) -> f34#(I3, I4, I5) 144.34/144.25 f161#(I6, I7, I8) -> f160#(I6, I7, I8) 144.34/144.25 f163#(I9, I10, I11) -> f162#(I9, I10, I11) 144.34/144.25 f165#(I12, I13, I14) -> f164#(I12, I13, I14) 144.34/144.25 f167#(I15, I16, I17) -> f166#(I15, I16, I17) 144.34/144.25 f169#(I18, I19, I20) -> f168#(I18, I19, I20) 144.34/144.25 f171#(I21, I22, I23) -> f170#(I21, I22, I23) 144.34/144.25 f173#(I24, I25, I26) -> f172#(I24, I25, I26) 144.34/144.25 f175#(I27, I28, I29) -> f174#(I27, I28, I29) 144.34/144.25 f177#(I30, I31, I32) -> f176#(I30, I31, I32) 144.34/144.25 f179#(I33, I34, I35) -> f178#(I33, I34, I35) 144.34/144.25 f181#(I36, I37, I38) -> f180#(I36, I37, I38) 144.34/144.25 f183#(I39, I40, I41) -> f182#(I39, I40, I41) 144.34/144.25 f185#(I42, I43, I44) -> f184#(I42, I43, I44) 144.34/144.25 f187#(I45, I46, I47) -> f186#(I45, I46, I47) 144.34/144.25 f189#(I48, I49, I50) -> f188#(I48, I49, I50) 144.34/144.25 f191#(I51, I52, I53) -> f190#(I51, I52, I53) 144.34/144.25 f39#(I54, I55, I56) -> f38#(I54, I55, I56) 144.34/144.25 f193#(I57, I58, I59) -> f192#(I57, I58, I59) 144.34/144.25 f195#(I60, I61, I62) -> f194#(I60, I61, I62) 144.34/144.25 f197#(I63, I64, I65) -> f196#(I63, I64, I65) 144.34/144.25 f199#(I66, I67, I68) -> f198#(I66, I67, I68) 144.34/144.25 f201#(I69, I70, I71) -> f200#(I69, I70, I71) 144.34/144.25 f203#(I72, I73, I74) -> f202#(I72, I73, I74) 144.34/144.25 f205#(I75, I76, I77) -> f204#(I75, I76, I77) 144.34/144.25 f207#(I78, I79, I80) -> f206#(I78, I79, I80) 144.34/144.25 f43#(I81, I82, I83) -> f42#(I81, I82, I83) 144.34/144.25 f209#(I84, I85, I86) -> f208#(I84, I85, I86) 144.34/144.25 f211#(I87, I88, I89) -> f210#(I87, I88, I89) 144.34/144.25 f213#(I90, I91, I92) -> f212#(I90, I91, I92) 144.34/144.25 f215#(I93, I94, I95) -> f214#(I93, I94, I95) 144.34/144.25 f217#(I96, I97, I98) -> f216#(I96, I97, I98) 144.34/144.25 f219#(I99, I100, I101) -> f218#(I99, I100, I101) 144.34/144.25 f221#(I102, I103, I104) -> f220#(I102, I103, I104) 144.34/144.25 f223#(I105, I106, I107) -> f222#(I105, I106, I107) 144.34/144.25 f45#(I108, I109, I110) -> f44#(I108, I109, I110) 144.34/144.25 f225#(I111, I112, I113) -> f224#(I111, I112, I113) 144.34/144.25 f227#(I114, I115, I116) -> f226#(I114, I115, I116) 144.34/144.25 f229#(I117, I118, I119) -> f228#(I117, I118, I119) 144.34/144.25 f231#(I120, I121, I122) -> f230#(I120, I121, I122) 144.34/144.25 f233#(I123, I124, I125) -> f232#(I123, I124, I125) 144.34/144.25 f235#(I126, I127, I128) -> f234#(I126, I127, I128) 144.34/144.25 f237#(I129, I130, I131) -> f236#(I129, I130, I131) 144.34/144.25 f239#(I132, I133, I134) -> f238#(I132, I133, I134) 144.34/144.25 f47#(I135, I136, I137) -> f46#(I135, I136, I137) 144.34/144.25 f241#(I138, I139, I140) -> f240#(I138, I139, I140) 144.34/144.25 f240#(I141, I142, I143) -> f241#(I141, 1 + I142, I142 + I143) [1 + I142 <= 3] 144.34/144.25 f240#(I144, I145, I146) -> f239#(I144, 0, I146) [3 <= I145] 144.34/144.25 f238#(I147, I148, I149) -> f239#(I147, 1 + I148, I148 + I149) [I148 <= 3] 144.34/144.25 f238#(I150, I151, I152) -> f237#(I150, 0, I152) [4 <= I151] 144.34/144.25 f236#(I153, I154, I155) -> f237#(I153, 1 + I154, I154 + I155) [1 + I154 <= 3] 144.34/144.25 f236#(I156, I157, I158) -> f235#(I156, 0, I158) [3 <= I157] 144.34/144.25 f51#(I159, I160, I161) -> f50#(I159, I160, I161) 144.34/144.25 f234#(I162, I163, I164) -> f235#(I162, 1 + I163, I163 + I164) [I163 <= 3] 144.34/144.25 f234#(I165, I166, I167) -> f233#(I165, 1, I167) [4 <= I166] 144.34/144.25 f53#(I168, I169, I170) -> f52#(I168, I169, I170) 144.34/144.25 f232#(I171, I172, I173) -> f233#(I171, 1 + I172, I172 + I173) [1 + I172 <= 2] 144.34/144.25 f232#(I174, I175, I176) -> f231#(I174, 1, I176) [2 <= I175] 144.34/144.25 f230#(I177, I178, I179) -> f231#(I177, 1 + I178, I178 + I179) [I178 <= 2] 144.34/144.25 f230#(I180, I181, I182) -> f229#(I180, 1, I182) [3 <= I181] 144.34/144.25 f57#(I183, I184, I185) -> f56#(I183, I184, I185) 144.34/144.25 f228#(I186, I187, I188) -> f229#(I186, 1 + I187, I187 + I188) [1 + I187 <= 2] 144.34/144.25 f228#(I189, I190, I191) -> f227#(I189, 1, I191) [2 <= I190] 144.34/144.25 f226#(I192, I193, I194) -> f227#(I192, 1 + I193, I193 + I194) [I193 <= 2] 144.34/144.25 f226#(I195, I196, I197) -> f225#(I195, -3, I197) [3 <= I196] 144.34/144.25 f15#(I198, I199, I200) -> f13#(I198, I199, I200) 144.34/144.25 f59#(I201, I202, I203) -> f58#(I201, I202, I203) 144.34/144.25 f224#(I204, I205, I206) -> f225#(I204, 1 + I205, I205 + I206) [1 + I205 <= -2] 144.34/144.25 f224#(I207, I208, I209) -> f223#(I207, -3, I209) [-2 <= I208] 144.34/144.25 f222#(I210, I211, I212) -> f223#(I210, 1 + I211, I211 + I212) [I211 <= -2] 144.34/144.25 f222#(I213, I214, I215) -> f221#(I213, -3, I215) [-1 <= I214] 144.34/144.25 f220#(I216, I217, I218) -> f221#(I216, 1 + I217, I217 + I218) [1 + I217 <= -2] 144.34/144.25 f220#(I219, I220, I221) -> f219#(I219, -3, I221) [-2 <= I220] 144.34/144.25 f63#(I222, I223, I224) -> f62#(I222, I223, I224) 144.34/144.25 f218#(I225, I226, I227) -> f219#(I225, 1 + I226, I226 + I227) [I226 <= -2] 144.34/144.25 f218#(I228, I229, I230) -> f217#(I228, -4, I230) [-1 <= I229] 144.34/144.25 f67#(I231, I232, I233) -> f66#(I231, I232, I233) 144.34/144.25 f216#(I234, I235, I236) -> f217#(I234, 1 + I235, I235 + I236) [1 + I235 <= -1] 144.34/144.25 f216#(I237, I238, I239) -> f215#(I237, -4, I239) [-1 <= I238] 144.34/144.25 f214#(I240, I241, I242) -> f215#(I240, 1 + I241, I241 + I242) [I241 <= -1] 144.34/144.25 f214#(I243, I244, I245) -> f213#(I243, -4, I245) [0 <= I244] 144.34/144.25 f69#(I246, I247, I248) -> f68#(I246, I247, I248) 144.34/144.25 f212#(I249, I250, I251) -> f213#(I249, 1 + I250, I250 + I251) [1 + I250 <= -1] 144.34/144.25 f212#(I252, I253, I254) -> f211#(I252, -4, I254) [-1 <= I253] 144.34/144.25 f71#(I255, I256, I257) -> f70#(I255, I256, I257) 144.34/144.25 f210#(I258, I259, I260) -> f211#(I258, 1 + I259, I259 + I260) [I259 <= -1] 144.34/144.25 f210#(I261, I262, I263) -> f209#(I261, -5, I263) [0 <= I262] 144.34/144.25 f208#(I264, I265, I266) -> f209#(I264, 1 + I265, I265 + I266) [1 + I265 <= 0] 144.34/144.25 f208#(I267, I268, I269) -> f207#(I267, -5, I269) [0 <= I268] 144.34/144.25 f206#(I270, I271, I272) -> f207#(I270, 1 + I271, I271 + I272) [I271 <= 0] 144.34/144.25 f206#(I273, I274, I275) -> f205#(I273, -5, I275) [1 <= I274] 144.34/144.25 f75#(I276, I277, I278) -> f74#(I276, I277, I278) 144.34/144.25 f204#(I279, I280, I281) -> f205#(I279, 1 + I280, I280 + I281) [1 + I280 <= 0] 144.34/144.25 f204#(I282, I283, I284) -> f203#(I282, -5, I284) [0 <= I283] 144.34/144.25 f202#(I285, I286, I287) -> f203#(I285, 1 + I286, I286 + I287) [I286 <= 0] 144.34/144.25 f202#(I288, I289, I290) -> f201#(I288, -6, I290) [1 <= I289] 144.34/144.25 f77#(I291, I292, I293) -> f76#(I291, I292, I293) 144.34/144.25 f200#(I294, I295, I296) -> f201#(I294, 1 + I295, I295 + I296) [1 + I295 <= 4] 144.34/144.25 f200#(I297, I298, I299) -> f199#(I297, -6, I299) [4 <= I298] 144.34/144.25 f81#(I300, I301, I302) -> f80#(I300, I301, I302) 144.34/144.25 f198#(I303, I304, I305) -> f199#(I303, 1 + I304, I304 + I305) [I304 <= 4] 144.34/144.25 f198#(I306, I307, I308) -> f197#(I306, -6, I308) [5 <= I307] 144.34/144.25 f196#(I309, I310, I311) -> f197#(I309, 1 + I310, I310 + I311) [1 + I310 <= 4] 144.34/144.25 f196#(I312, I313, I314) -> f195#(I312, -6, I314) [4 <= I313] 144.34/144.25 f17#(I315, I316, I317) -> f16#(I315, I316, I317) 144.34/144.25 f85#(I318, I319, I320) -> f84#(I318, I319, I320) 144.34/144.25 f194#(I321, I322, I323) -> f195#(I321, 1 + I322, I322 + I323) [I322 <= 4] 144.34/144.25 f194#(I324, I325, I326) -> f193#(I324, 0, I326) [5 <= I325] 144.34/144.25 f192#(I327, I328, I329) -> f193#(I327, I327 + I328, I328 + I329) [1 + I328 <= 3] 144.34/144.25 f192#(I330, I331, I332) -> f191#(I330, 0, I332) [3 <= I331] 144.34/144.25 f190#(I333, I334, I335) -> f191#(I333, I333 + I334, I334 + I335) [I334 <= 3] 144.34/144.25 f190#(I336, I337, I338) -> f189#(I336, 0, I338) [4 <= I337] 144.34/144.25 f87#(I339, I340, I341) -> f86#(I339, I340, I341) 144.34/144.25 f188#(I342, I343, I344) -> f189#(I342, I342 + I343, I343 + I344) [1 + I343 <= 3] 144.34/144.25 f188#(I345, I346, I347) -> f187#(I345, 0, I347) [3 <= I346] 144.34/144.25 f186#(I348, I349, I350) -> f187#(I348, I348 + I349, I349 + I350) [I349 <= 3] 144.34/144.25 f186#(I351, I352, I353) -> f185#(I351, 1, I353) [4 <= I352] 144.34/144.25 f91#(I354, I355, I356) -> f90#(I354, I355, I356) 144.34/144.25 f184#(I357, I358, I359) -> f185#(I357, I357 + I358, I358 + I359) [1 + I358 <= 2] 144.34/144.25 f184#(I360, I361, I362) -> f183#(I360, 1, I362) [2 <= I361] 144.34/144.25 f93#(I363, I364, I365) -> f92#(I363, I364, I365) 144.34/144.25 f182#(I366, I367, I368) -> f183#(I366, I366 + I367, I367 + I368) [I367 <= 2] 144.34/144.25 f182#(I369, I370, I371) -> f181#(I369, 1, I371) [3 <= I370] 144.34/144.25 f180#(I372, I373, I374) -> f181#(I372, I372 + I373, I373 + I374) [1 + I373 <= 2] 144.34/144.25 f180#(I375, I376, I377) -> f179#(I375, 1, I377) [2 <= I376] 144.34/144.25 f95#(I378, I379, I380) -> f94#(I378, I379, I380) 144.34/144.25 f178#(I381, I382, I383) -> f179#(I381, I381 + I382, I382 + I383) [I382 <= 2] 144.34/144.25 f178#(I384, I385, I386) -> f177#(I384, -3, I386) [3 <= I385] 144.34/144.25 f176#(I387, I388, I389) -> f177#(I387, I387 + I388, I388 + I389) [1 + I388 <= -2] 144.34/144.25 f176#(I390, I391, I392) -> f175#(I390, -3, I392) [-2 <= I391] 144.34/144.25 f174#(I393, I394, I395) -> f175#(I393, I393 + I394, I394 + I395) [I394 <= -2] 144.34/144.25 f174#(I396, I397, I398) -> f173#(I396, -3, I398) [-1 <= I397] 144.34/144.25 f99#(I399, I400, I401) -> f98#(I399, I400, I401) 144.34/144.25 f172#(I402, I403, I404) -> f173#(I402, I402 + I403, I403 + I404) [1 + I403 <= -2] 144.34/144.25 f172#(I405, I406, I407) -> f171#(I405, -3, I407) [-2 <= I406] 144.34/144.25 f103#(I408, I409, I410) -> f102#(I408, I409, I410) 144.34/144.25 f170#(I411, I412, I413) -> f171#(I411, I411 + I412, I412 + I413) [I412 <= -2] 144.34/144.25 f170#(I414, I415, I416) -> f169#(I414, -4, I416) [-1 <= I415] 144.34/144.25 f168#(I417, I418, I419) -> f169#(I417, I417 + I418, I418 + I419) [1 + I418 <= -1] 144.34/144.25 f168#(I420, I421, I422) -> f167#(I420, -4, I422) [-1 <= I421] 144.34/144.25 f105#(I423, I424, I425) -> f104#(I423, I424, I425) 144.34/144.25 f166#(I426, I427, I428) -> f167#(I426, I426 + I427, I427 + I428) [I427 <= -1] 144.34/144.25 f166#(I429, I430, I431) -> f165#(I429, -4, I431) [0 <= I430] 144.34/144.25 f21#(I432, I433, I434) -> f20#(I432, I433, I434) 144.34/144.25 f109#(I435, I436, I437) -> f108#(I435, I436, I437) 144.34/144.25 f164#(I438, I439, I440) -> f165#(I438, I438 + I439, I439 + I440) [1 + I439 <= -1] 144.34/144.25 f164#(I441, I442, I443) -> f163#(I441, -4, I443) [-1 <= I442] 144.34/144.25 f162#(I444, I445, I446) -> f163#(I444, I444 + I445, I445 + I446) [I445 <= -1] 144.34/144.25 f162#(I447, I448, I449) -> f161#(I447, -5, I449) [0 <= I448] 144.34/144.25 f160#(I450, I451, I452) -> f161#(I450, I450 + I451, I451 + I452) [1 + I451 <= 0] 144.34/144.25 f160#(I453, I454, I455) -> f1#(I453, -5, I455) [0 <= I454] 144.34/144.25 f113#(I456, I457, I458) -> f112#(I456, I457, I458) 144.34/144.25 f2#(I459, I460, I461) -> f1#(I459, I459 + I460, I460 + I461) [I460 <= 0] 144.34/144.25 f2#(I462, I463, I464) -> f3#(I462, -5, I464) [1 <= I463] 144.34/144.25 f4#(I465, I466, I467) -> f3#(I465, I465 + I466, I466 + I467) [1 + I466 <= 0] 144.34/144.25 f4#(I468, I469, I470) -> f5#(I468, -5, I470) [0 <= I469] 144.34/144.25 f115#(I471, I472, I473) -> f114#(I471, I472, I473) 144.34/144.25 f6#(I474, I475, I476) -> f5#(I474, I474 + I475, I475 + I476) [I475 <= 0] 144.34/144.25 f6#(I477, I478, I479) -> f7#(I477, -6, I479) [1 <= I478] 144.34/144.25 f117#(I480, I481, I482) -> f116#(I480, I481, I482) 144.34/144.25 f8#(I483, I484, I485) -> f7#(I483, I483 + I484, I484 + I485) [1 + I484 <= 4] 144.34/144.25 f8#(I486, I487, I488) -> f9#(I486, -6, I488) [4 <= I487] 144.34/144.25 f10#(I489, I490, I491) -> f9#(I489, I489 + I490, I490 + I491) [I490 <= 4] 144.34/144.25 f10#(I492, I493, I494) -> f11#(I492, -6, I494) [5 <= I493] 144.34/144.25 f119#(I495, I496, I497) -> f118#(I495, I496, I497) 144.34/144.25 f12#(I498, I499, I500) -> f11#(I498, I498 + I499, I499 + I500) [1 + I499 <= 4] 144.34/144.25 f12#(I501, I502, I503) -> f18#(I501, -6, I503) [4 <= I502] 144.34/144.25 f19#(I504, I505, I506) -> f18#(I504, I504 + I505, I505 + I506) [I505 <= 4] 144.34/144.25 f19#(I507, I508, I509) -> f26#(I507, 5, I509) [5 <= I508] 144.34/144.25 f27#(I510, I511, I512) -> f26#(I510, -1 + I511, I511 + I512) [3 <= I511] 144.34/144.25 f27#(I513, I514, I515) -> f32#(I513, 5, I515) [I514 <= 2] 144.34/144.25 f123#(I516, I517, I518) -> f122#(I516, I517, I518) 144.34/144.25 f33#(I519, I520, I521) -> f32#(I519, -1 + I520, I520 + I521) [2 <= I520] 144.34/144.25 f33#(I522, I523, I524) -> f36#(I522, 5, I524) [1 + I523 <= 2] 144.34/144.25 f37#(I525, I526, I527) -> f36#(I525, -1 + I526, I526 + I527) [3 <= I526] 144.34/144.25 f37#(I528, I529, I530) -> f40#(I528, 5, I530) [I529 <= 2] 144.34/144.25 f127#(I531, I532, I533) -> f126#(I531, I532, I533) 144.34/144.25 f41#(I534, I535, I536) -> f40#(I534, -1 + I535, I535 + I536) [2 <= I535] 144.34/144.25 f41#(I537, I538, I539) -> f48#(I537, 6, I539) [1 + I538 <= 2] 144.34/144.25 f129#(I540, I541, I542) -> f128#(I540, I541, I542) 144.34/144.25 f49#(I543, I544, I545) -> f48#(I543, -1 + I544, I544 + I545) [2 <= I544] 144.34/144.25 f49#(I546, I547, I548) -> f54#(I546, 6, I548) [I547 <= 1] 144.34/144.25 f55#(I549, I550, I551) -> f54#(I549, -1 + I550, I550 + I551) [1 <= I550] 144.34/144.25 f55#(I552, I553, I554) -> f60#(I552, 6, I554) [1 + I553 <= 1] 144.34/144.25 f23#(I555, I556, I557) -> f22#(I555, I556, I557) 144.34/144.25 f133#(I558, I559, I560) -> f132#(I558, I559, I560) 144.34/144.25 f61#(I561, I562, I563) -> f60#(I561, -1 + I562, I562 + I563) [2 <= I562] 144.34/144.25 f61#(I564, I565, I566) -> f64#(I564, 6, I566) [I565 <= 1] 144.34/144.25 f65#(I567, I568, I569) -> f64#(I567, -1 + I568, I568 + I569) [1 <= I568] 144.34/144.25 f65#(I570, I571, I572) -> f72#(I570, 7, I572) [1 + I571 <= 1] 144.34/144.25 f73#(I573, I574, I575) -> f72#(I573, -1 + I574, I574 + I575) [1 <= I574] 144.34/144.25 f73#(I576, I577, I578) -> f78#(I576, 7, I578) [I577 <= 0] 144.34/144.25 f137#(I579, I580, I581) -> f136#(I579, I580, I581) 144.34/144.25 f79#(I582, I583, I584) -> f78#(I582, -1 + I583, I583 + I584) [0 <= I583] 144.34/144.25 f79#(I585, I586, I587) -> f82#(I585, 7, I587) [1 + I586 <= 0] 144.34/144.25 f139#(I588, I589, I590) -> f138#(I588, I589, I590) 144.34/144.25 f83#(I591, I592, I593) -> f82#(I591, -1 + I592, I592 + I593) [1 <= I592] 144.34/144.25 f83#(I594, I595, I596) -> f88#(I594, 7, I596) [I595 <= 0] 144.34/144.25 f89#(I597, I598, I599) -> f88#(I597, -1 + I598, I598 + I599) [0 <= I598] 144.34/144.25 f89#(I600, I601, I602) -> f96#(I600, 8, I602) [1 + I601 <= 0] 144.34/144.25 f141#(I603, I604, I605) -> f140#(I603, I604, I605) 144.34/144.25 f97#(I606, I607, I608) -> f96#(I606, -1 + I607, I607 + I608) [0 <= I607] 144.34/144.25 f97#(I609, I610, I611) -> f100#(I609, 8, I611) [I610 <= -1] 144.34/144.25 f145#(I612, I613, I614) -> f144#(I612, I613, I614) 144.34/144.25 f101#(I615, I616, I617) -> f100#(I615, -1 + I616, I616 + I617) [-1 <= I616] 144.34/144.25 f101#(I618, I619, I620) -> f106#(I618, 8, I620) [1 + I619 <= -1] 144.34/144.25 f107#(I621, I622, I623) -> f106#(I621, -1 + I622, I622 + I623) [0 <= I622] 144.34/144.25 f107#(I624, I625, I626) -> f110#(I624, 8, I626) [I625 <= -1] 144.34/144.25 f111#(I627, I628, I629) -> f110#(I627, -1 + I628, I628 + I629) [-1 <= I628] 144.34/144.25 f111#(I630, I631, I632) -> f120#(I630, 9, I632) [1 + I631 <= -1] 144.34/144.25 f147#(I633, I634, I635) -> f146#(I633, I634, I635) 144.34/144.25 f121#(I636, I637, I638) -> f120#(I636, -1 + I637, I637 + I638) [-1 <= I637] 144.34/144.25 f121#(I639, I640, I641) -> f124#(I639, 9, I641) [I640 <= -2] 144.34/144.25 f125#(I642, I643, I644) -> f124#(I642, -1 + I643, I643 + I644) [-2 <= I643] 144.34/144.25 f125#(I645, I646, I647) -> f130#(I645, 9, I647) [1 + I646 <= -2] 144.34/144.25 f151#(I648, I649, I650) -> f150#(I648, I649, I650) 144.34/144.25 f131#(I651, I652, I653) -> f130#(I651, -1 + I652, I652 + I653) [-1 <= I652] 144.34/144.25 f131#(I654, I655, I656) -> f134#(I654, 9, I656) [I655 <= -2] 144.34/144.25 f135#(I657, I658, I659) -> f134#(I657, -1 + I658, I658 + I659) [-2 <= I658] 144.34/144.25 f135#(I660, I661, I662) -> f142#(I660, 0, I662) [1 + I661 <= -2] 144.34/144.25 f155#(I663, I664, I665) -> f154#(I663, I664, I665) 144.34/144.25 f143#(I666, I667, I668) -> f142#(I666, -1 + I667, I667 + I668) [-2 <= I667] 144.34/144.25 f143#(I669, I670, I671) -> f148#(I669, 0, I671) [I670 <= -3] 144.34/144.25 f157#(I672, I673, I674) -> f156#(I672, I673, I674) 144.34/144.25 f149#(I675, I676, I677) -> f148#(I675, -1 + I676, I676 + I677) [-3 <= I676] 144.34/144.25 f149#(I678, I679, I680) -> f152#(I678, 0, I680) [1 + I679 <= -3] 144.34/144.25 f153#(I681, I682, I683) -> f152#(I681, -1 + I682, I682 + I683) [-2 <= I682] 144.34/144.25 f153#(I684, I685, I686) -> f158#(I684, 0, I686) [I685 <= -3] 144.34/144.25 f159#(I687, I688, I689) -> f158#(I687, -1 + I688, I688 + I689) [-3 <= I688] 144.34/144.25 f159#(I690, I691, I692) -> f157#(I690, -1, I692) [1 + I691 <= -3] 144.34/144.25 f158#(I693, I694, I695) -> f159#(I693, I694, I695) 144.34/144.25 f156#(I696, I697, I698) -> f157#(I696, -1 + I697, I697 + I698) [-4 <= I697] 144.34/144.25 f156#(I699, I700, I701) -> f155#(I699, -1, I701) [I700 <= -5] 144.34/144.25 f154#(I702, I703, I704) -> f155#(I702, -1 + I703, I703 + I704) [-5 <= I703] 144.34/144.25 f154#(I705, I706, I707) -> f151#(I705, -1, I707) [1 + I706 <= -5] 144.34/144.25 f152#(I708, I709, I710) -> f153#(I708, I709, I710) 144.34/144.25 f150#(I711, I712, I713) -> f151#(I711, -1 + I712, I712 + I713) [-4 <= I712] 144.34/144.25 f150#(I714, I715, I716) -> f147#(I714, -1, I716) [I715 <= -5] 144.34/144.25 f148#(I717, I718, I719) -> f149#(I717, I718, I719) 144.34/144.25 f146#(I720, I721, I722) -> f147#(I720, -1 + I721, I721 + I722) [-5 <= I721] 144.34/144.25 f146#(I723, I724, I725) -> f145#(I723, -2, I725) [1 + I724 <= -5] 144.34/144.25 f144#(I726, I727, I728) -> f145#(I726, -1 + I727, I727 + I728) [-6 <= I727] 144.34/144.25 f144#(I729, I730, I731) -> f141#(I729, -2, I731) [I730 <= -7] 144.34/144.25 f142#(I732, I733, I734) -> f143#(I732, I733, I734) 144.34/144.25 f140#(I735, I736, I737) -> f141#(I735, -1 + I736, I736 + I737) [-7 <= I736] 144.34/144.25 f140#(I738, I739, I740) -> f139#(I738, -2, I740) [1 + I739 <= -7] 144.34/144.25 f138#(I741, I742, I743) -> f139#(I741, -1 + I742, I742 + I743) [-6 <= I742] 144.34/144.25 f138#(I744, I745, I746) -> f137#(I744, -2, I746) [I745 <= -7] 144.34/144.25 f136#(I747, I748, I749) -> f137#(I747, -1 + I748, I748 + I749) [-7 <= I748] 144.34/144.25 f136#(I750, I751, I752) -> f133#(I750, 16, I752) [1 + I751 <= -7] 144.34/144.25 f134#(I753, I754, I755) -> f135#(I753, I754, I755) 144.34/144.25 f132#(I756, I757, I758) -> f133#(I756, -1 + I757, I757 + I758) [-7 <= I757] 144.34/144.25 f132#(I759, I760, I761) -> f129#(I759, 16, I761) [I760 <= -8] 144.34/144.25 f130#(I762, I763, I764) -> f131#(I762, I763, I764) 144.34/144.25 f128#(I765, I766, I767) -> f129#(I765, -1 + I766, I766 + I767) [-8 <= I766] 144.34/144.25 f128#(I768, I769, I770) -> f127#(I768, 16, I770) [1 + I769 <= -8] 144.34/144.25 f126#(I771, I772, I773) -> f127#(I771, -1 + I772, I772 + I773) [-7 <= I772] 144.34/144.25 f126#(I774, I775, I776) -> f123#(I774, 16, I776) [I775 <= -8] 144.34/144.25 f124#(I777, I778, I779) -> f125#(I777, I778, I779) 144.34/144.25 f122#(I780, I781, I782) -> f123#(I780, -1 + I781, I781 + I782) [-8 <= I781] 144.34/144.25 f122#(I783, I784, I785) -> f119#(I783, 5, I785) [1 + I784 <= -8] 144.34/144.25 f25#(I786, I787, I788) -> f24#(I786, I787, I788) 144.34/144.25 f120#(I789, I790, I791) -> f121#(I789, I790, I791) 144.34/144.25 f118#(I792, I793, I794) -> f119#(I792, -1 * I792 + I793, I793 + I794) [3 <= I793] 144.34/144.25 f118#(I795, I796, I797) -> f117#(I795, 5, I797) [I796 <= 2] 144.34/144.25 f116#(I798, I799, I800) -> f117#(I798, -1 * I798 + I799, I799 + I800) [2 <= I799] 144.34/144.25 f116#(I801, I802, I803) -> f115#(I801, 5, I803) [1 + I802 <= 2] 144.34/144.25 f114#(I804, I805, I806) -> f115#(I804, -1 * I804 + I805, I805 + I806) [3 <= I805] 144.34/144.25 f114#(I807, I808, I809) -> f113#(I807, 5, I809) [I808 <= 2] 144.34/144.25 f112#(I810, I811, I812) -> f113#(I810, -1 * I810 + I811, I811 + I812) [2 <= I811] 144.34/144.25 f112#(I813, I814, I815) -> f109#(I813, 6, I815) [1 + I814 <= 2] 144.34/144.25 f110#(I816, I817, I818) -> f111#(I816, I817, I818) 144.34/144.25 f108#(I819, I820, I821) -> f109#(I819, -1 * I819 + I820, I820 + I821) [2 <= I820] 144.34/144.25 f108#(I822, I823, I824) -> f105#(I822, 6, I824) [I823 <= 1] 144.34/144.25 f106#(I825, I826, I827) -> f107#(I825, I826, I827) 144.34/144.25 f104#(I828, I829, I830) -> f105#(I828, -1 * I828 + I829, I829 + I830) [1 <= I829] 144.34/144.25 f104#(I831, I832, I833) -> f103#(I831, 6, I833) [1 + I832 <= 1] 144.34/144.25 f102#(I834, I835, I836) -> f103#(I834, -1 * I834 + I835, I835 + I836) [2 <= I835] 144.34/144.25 f102#(I837, I838, I839) -> f99#(I837, 6, I839) [I838 <= 1] 144.34/144.25 f100#(I840, I841, I842) -> f101#(I840, I841, I842) 144.34/144.25 f98#(I843, I844, I845) -> f99#(I843, -1 * I843 + I844, I844 + I845) [1 <= I844] 144.34/144.25 f98#(I846, I847, I848) -> f95#(I846, 7, I848) [1 + I847 <= 1] 144.34/144.25 f96#(I849, I850, I851) -> f97#(I849, I850, I851) 144.34/144.25 f94#(I852, I853, I854) -> f95#(I852, -1 * I852 + I853, I853 + I854) [1 <= I853] 144.34/144.25 f94#(I855, I856, I857) -> f93#(I855, 7, I857) [I856 <= 0] 144.34/144.25 f92#(I858, I859, I860) -> f93#(I858, -1 * I858 + I859, I859 + I860) [0 <= I859] 144.34/144.25 f92#(I861, I862, I863) -> f91#(I861, 7, I863) [1 + I862 <= 0] 144.34/144.25 f90#(I864, I865, I866) -> f91#(I864, -1 * I864 + I865, I865 + I866) [1 <= I865] 144.34/144.25 f90#(I867, I868, I869) -> f87#(I867, 7, I869) [I868 <= 0] 144.34/144.25 f88#(I870, I871, I872) -> f89#(I870, I871, I872) 144.34/144.25 f86#(I873, I874, I875) -> f87#(I873, -1 * I873 + I874, I874 + I875) [0 <= I874] 144.34/144.25 f86#(I876, I877, I878) -> f85#(I876, 8, I878) [1 + I877 <= 0] 144.34/144.25 f84#(I879, I880, I881) -> f85#(I879, -1 * I879 + I880, I880 + I881) [0 <= I880] 144.34/144.25 f84#(I882, I883, I884) -> f81#(I882, 8, I884) [I883 <= -1] 144.34/144.25 f82#(I885, I886, I887) -> f83#(I885, I886, I887) 144.34/144.25 f80#(I888, I889, I890) -> f81#(I888, -1 * I888 + I889, I889 + I890) [-1 <= I889] 144.34/144.25 f80#(I891, I892, I893) -> f77#(I891, 8, I893) [1 + I892 <= -1] 144.34/144.25 f78#(I894, I895, I896) -> f79#(I894, I895, I896) 144.34/144.25 f76#(I897, I898, I899) -> f77#(I897, -1 * I897 + I898, I898 + I899) [0 <= I898] 144.34/144.25 f76#(I900, I901, I902) -> f75#(I900, 8, I902) [I901 <= -1] 144.34/144.25 f74#(I903, I904, I905) -> f75#(I903, -1 * I903 + I904, I904 + I905) [-1 <= I904] 144.34/144.25 f74#(I906, I907, I908) -> f71#(I906, 9, I908) [1 + I907 <= -1] 144.34/144.25 f31#(I909, I910, I911) -> f30#(I909, I910, I911) 144.34/144.25 f72#(I912, I913, I914) -> f73#(I912, I913, I914) 144.34/144.25 f70#(I915, I916, I917) -> f71#(I915, -1 * I915 + I916, I916 + I917) [-1 <= I916] 144.34/144.25 f70#(I918, I919, I920) -> f69#(I918, 9, I920) [I919 <= -2] 144.34/144.25 f68#(I921, I922, I923) -> f69#(I921, -1 * I921 + I922, I922 + I923) [-2 <= I922] 144.34/144.25 f68#(I924, I925, I926) -> f67#(I924, 9, I926) [1 + I925 <= -2] 144.34/144.25 f66#(I927, I928, I929) -> f67#(I927, -1 * I927 + I928, I928 + I929) [-1 <= I928] 144.34/144.25 f66#(I930, I931, I932) -> f63#(I930, 9, I932) [I931 <= -2] 144.34/144.25 f64#(I933, I934, I935) -> f65#(I933, I934, I935) 144.34/144.25 f62#(I936, I937, I938) -> f63#(I936, -1 * I936 + I937, I937 + I938) [-2 <= I937] 144.34/144.25 f62#(I939, I940, I941) -> f59#(I939, 0, I941) [1 + I940 <= -2] 144.34/144.25 f60#(I942, I943, I944) -> f61#(I942, I943, I944) 144.34/144.25 f58#(I945, I946, I947) -> f59#(I945, -1 * I945 + I946, I946 + I947) [-2 <= I946] 144.34/144.25 f58#(I948, I949, I950) -> f57#(I948, 0, I950) [I949 <= -3] 144.34/144.25 f56#(I951, I952, I953) -> f57#(I951, -1 * I951 + I952, I952 + I953) [-3 <= I952] 144.34/144.25 f56#(I954, I955, I956) -> f53#(I954, 0, I956) [1 + I955 <= -3] 144.34/144.25 f54#(I957, I958, I959) -> f55#(I957, I958, I959) 144.34/144.25 f52#(I960, I961, I962) -> f53#(I960, -1 * I960 + I961, I961 + I962) [-2 <= I961] 144.34/144.25 f52#(I963, I964, I965) -> f51#(I963, 0, I965) [I964 <= -3] 144.34/144.25 f50#(I966, I967, I968) -> f51#(I966, -1 * I966 + I967, I967 + I968) [-3 <= I967] 144.34/144.25 f50#(I969, I970, I971) -> f47#(I969, -1, I971) [1 + I970 <= -3] 144.34/144.25 f48#(I972, I973, I974) -> f49#(I972, I973, I974) 144.34/144.25 f46#(I975, I976, I977) -> f47#(I975, -1 * I975 + I976, I976 + I977) [-4 <= I976] 144.34/144.25 f46#(I978, I979, I980) -> f45#(I978, -1, I980) [I979 <= -5] 144.34/144.25 f44#(I981, I982, I983) -> f45#(I981, -1 * I981 + I982, I982 + I983) [-5 <= I982] 144.34/144.25 f44#(I984, I985, I986) -> f43#(I984, -1, I986) [1 + I985 <= -5] 144.34/144.25 f42#(I987, I988, I989) -> f43#(I987, -1 * I987 + I988, I988 + I989) [-4 <= I988] 144.34/144.25 f42#(I990, I991, I992) -> f39#(I990, -1, I992) [I991 <= -5] 144.34/144.25 f40#(I993, I994, I995) -> f41#(I993, I994, I995) 144.34/144.25 f38#(I996, I997, I998) -> f39#(I996, -1 * I996 + I997, I997 + I998) [-5 <= I997] 144.34/144.25 f38#(I999, I1000, I1001) -> f35#(I999, -2, I1001) [1 + I1000 <= -5] 144.34/144.25 f36#(I1002, I1003, I1004) -> f37#(I1002, I1003, I1004) 144.34/144.25 f34#(I1005, I1006, I1007) -> f35#(I1005, -1 * I1005 + I1006, I1006 + I1007) [-6 <= I1006] 144.34/144.25 f34#(I1008, I1009, I1010) -> f28#(I1008, -2, I1010) [I1009 <= -7] 144.34/144.25 f29#(I1011, I1012, I1013) -> f28#(I1011, -1 * I1011 + I1012, I1012 + I1013) [-7 <= I1012] 144.34/144.25 f29#(I1014, I1015, I1016) -> f31#(I1014, -2, I1016) [1 + I1015 <= -7] 144.34/144.25 f32#(I1017, I1018, I1019) -> f33#(I1017, I1018, I1019) 144.34/144.25 f30#(I1020, I1021, I1022) -> f31#(I1020, -1 * I1020 + I1021, I1021 + I1022) [-6 <= I1021] 144.34/144.25 f30#(I1023, I1024, I1025) -> f25#(I1023, -2, I1025) [I1024 <= -7] 144.34/144.25 f28#(I1026, I1027, I1028) -> f29#(I1026, I1027, I1028) 144.34/144.25 f26#(I1029, I1030, I1031) -> f27#(I1029, I1030, I1031) 144.34/144.25 f24#(I1032, I1033, I1034) -> f25#(I1032, -1 * I1032 + I1033, I1033 + I1034) [-7 <= I1033] 144.34/144.25 f24#(I1035, I1036, I1037) -> f23#(I1035, 16, I1037) [1 + I1036 <= -7] 144.34/144.25 f22#(I1038, I1039, I1040) -> f23#(I1038, -1 * I1038 + I1039, I1039 + I1040) [-7 <= I1039] 144.34/144.25 f22#(I1041, I1042, I1043) -> f21#(I1041, 16, I1043) [I1042 <= -8] 144.34/144.25 f20#(I1044, I1045, I1046) -> f21#(I1044, -1 * I1044 + I1045, I1045 + I1046) [-8 <= I1045] 144.34/144.25 f20#(I1047, I1048, I1049) -> f17#(I1047, 16, I1049) [1 + I1048 <= -8] 144.34/144.25 f18#(I1050, I1051, I1052) -> f19#(I1050, I1051, I1052) 144.34/144.25 f16#(I1053, I1054, I1055) -> f17#(I1053, -1 * I1053 + I1054, I1054 + I1055) [-7 <= I1054] 144.34/144.25 f16#(I1056, I1057, I1058) -> f15#(I1056, 16, I1058) [I1057 <= -8] 144.34/144.25 f13#(I1059, I1060, I1061) -> f15#(I1059, -1 * I1059 + I1060, I1060 + I1061) [-8 <= I1060] 144.34/144.25 f11#(I1065, I1066, I1067) -> f12#(I1065, I1066, I1067) 144.34/144.25 f9#(I1068, I1069, I1070) -> f10#(I1068, I1069, I1070) 144.34/144.25 f7#(I1071, I1072, I1073) -> f8#(I1071, I1072, I1073) 144.34/144.25 f5#(I1074, I1075, I1076) -> f6#(I1074, I1075, I1076) 144.34/144.25 f3#(I1077, I1078, I1079) -> f4#(I1077, I1078, I1079) 144.34/144.25 f1#(I1080, I1081, I1082) -> f2#(I1080, I1081, I1082) 144.34/144.25 R = 144.34/144.25 f243(x1, x2, x3) -> f242(x1, x2, x3) 144.34/144.25 f242(I0, I1, I2) -> f241(2, 0, 0) 144.34/144.25 f35(I3, I4, I5) -> f34(I3, I4, I5) 144.34/144.25 f161(I6, I7, I8) -> f160(I6, I7, I8) 144.34/144.25 f163(I9, I10, I11) -> f162(I9, I10, I11) 144.34/144.25 f165(I12, I13, I14) -> f164(I12, I13, I14) 144.34/144.25 f167(I15, I16, I17) -> f166(I15, I16, I17) 144.34/144.25 f169(I18, I19, I20) -> f168(I18, I19, I20) 144.34/144.25 f171(I21, I22, I23) -> f170(I21, I22, I23) 144.34/144.25 f173(I24, I25, I26) -> f172(I24, I25, I26) 144.34/144.25 f175(I27, I28, I29) -> f174(I27, I28, I29) 144.34/144.25 f177(I30, I31, I32) -> f176(I30, I31, I32) 144.34/144.25 f179(I33, I34, I35) -> f178(I33, I34, I35) 144.34/144.25 f181(I36, I37, I38) -> f180(I36, I37, I38) 144.34/144.25 f183(I39, I40, I41) -> f182(I39, I40, I41) 144.34/144.25 f185(I42, I43, I44) -> f184(I42, I43, I44) 144.34/144.25 f187(I45, I46, I47) -> f186(I45, I46, I47) 144.34/144.25 f189(I48, I49, I50) -> f188(I48, I49, I50) 144.34/144.25 f191(I51, I52, I53) -> f190(I51, I52, I53) 144.34/144.25 f39(I54, I55, I56) -> f38(I54, I55, I56) 144.34/144.25 f193(I57, I58, I59) -> f192(I57, I58, I59) 144.34/144.25 f195(I60, I61, I62) -> f194(I60, I61, I62) 144.34/144.25 f197(I63, I64, I65) -> f196(I63, I64, I65) 144.34/144.25 f199(I66, I67, I68) -> f198(I66, I67, I68) 144.34/144.25 f201(I69, I70, I71) -> f200(I69, I70, I71) 144.34/144.25 f203(I72, I73, I74) -> f202(I72, I73, I74) 144.34/144.25 f205(I75, I76, I77) -> f204(I75, I76, I77) 144.34/144.25 f207(I78, I79, I80) -> f206(I78, I79, I80) 144.34/144.25 f43(I81, I82, I83) -> f42(I81, I82, I83) 144.34/144.25 f209(I84, I85, I86) -> f208(I84, I85, I86) 144.34/144.25 f211(I87, I88, I89) -> f210(I87, I88, I89) 144.34/144.25 f213(I90, I91, I92) -> f212(I90, I91, I92) 144.34/144.25 f215(I93, I94, I95) -> f214(I93, I94, I95) 144.34/144.25 f217(I96, I97, I98) -> f216(I96, I97, I98) 144.34/144.25 f219(I99, I100, I101) -> f218(I99, I100, I101) 144.34/144.25 f221(I102, I103, I104) -> f220(I102, I103, I104) 144.34/144.25 f223(I105, I106, I107) -> f222(I105, I106, I107) 144.34/144.25 f45(I108, I109, I110) -> f44(I108, I109, I110) 144.34/144.25 f225(I111, I112, I113) -> f224(I111, I112, I113) 144.34/144.25 f227(I114, I115, I116) -> f226(I114, I115, I116) 144.34/144.25 f229(I117, I118, I119) -> f228(I117, I118, I119) 144.34/144.25 f231(I120, I121, I122) -> f230(I120, I121, I122) 144.34/144.25 f233(I123, I124, I125) -> f232(I123, I124, I125) 144.34/144.25 f235(I126, I127, I128) -> f234(I126, I127, I128) 144.34/144.26 f237(I129, I130, I131) -> f236(I129, I130, I131) 144.34/144.26 f239(I132, I133, I134) -> f238(I132, I133, I134) 144.34/144.26 f47(I135, I136, I137) -> f46(I135, I136, I137) 144.34/144.26 f241(I138, I139, I140) -> f240(I138, I139, I140) 144.34/144.26 f240(I141, I142, I143) -> f241(I141, 1 + I142, I142 + I143) [1 + I142 <= 3] 144.34/144.26 f240(I144, I145, I146) -> f239(I144, 0, I146) [3 <= I145] 144.34/144.26 f238(I147, I148, I149) -> f239(I147, 1 + I148, I148 + I149) [I148 <= 3] 144.34/144.26 f238(I150, I151, I152) -> f237(I150, 0, I152) [4 <= I151] 144.34/144.26 f236(I153, I154, I155) -> f237(I153, 1 + I154, I154 + I155) [1 + I154 <= 3] 144.34/144.26 f236(I156, I157, I158) -> f235(I156, 0, I158) [3 <= I157] 144.34/144.26 f51(I159, I160, I161) -> f50(I159, I160, I161) 144.34/144.26 f234(I162, I163, I164) -> f235(I162, 1 + I163, I163 + I164) [I163 <= 3] 144.34/144.26 f234(I165, I166, I167) -> f233(I165, 1, I167) [4 <= I166] 144.34/144.26 f53(I168, I169, I170) -> f52(I168, I169, I170) 144.34/144.26 f232(I171, I172, I173) -> f233(I171, 1 + I172, I172 + I173) [1 + I172 <= 2] 144.34/144.26 f232(I174, I175, I176) -> f231(I174, 1, I176) [2 <= I175] 144.34/144.26 f230(I177, I178, I179) -> f231(I177, 1 + I178, I178 + I179) [I178 <= 2] 144.34/144.26 f230(I180, I181, I182) -> f229(I180, 1, I182) [3 <= I181] 144.34/144.26 f57(I183, I184, I185) -> f56(I183, I184, I185) 144.34/144.26 f228(I186, I187, I188) -> f229(I186, 1 + I187, I187 + I188) [1 + I187 <= 2] 144.34/144.26 f228(I189, I190, I191) -> f227(I189, 1, I191) [2 <= I190] 144.34/144.26 f226(I192, I193, I194) -> f227(I192, 1 + I193, I193 + I194) [I193 <= 2] 144.34/144.26 f226(I195, I196, I197) -> f225(I195, -3, I197) [3 <= I196] 144.34/144.26 f15(I198, I199, I200) -> f13(I198, I199, I200) 144.34/144.26 f59(I201, I202, I203) -> f58(I201, I202, I203) 144.34/144.26 f224(I204, I205, I206) -> f225(I204, 1 + I205, I205 + I206) [1 + I205 <= -2] 144.34/144.26 f224(I207, I208, I209) -> f223(I207, -3, I209) [-2 <= I208] 144.34/144.26 f222(I210, I211, I212) -> f223(I210, 1 + I211, I211 + I212) [I211 <= -2] 144.34/144.26 f222(I213, I214, I215) -> f221(I213, -3, I215) [-1 <= I214] 144.34/144.26 f220(I216, I217, I218) -> f221(I216, 1 + I217, I217 + I218) [1 + I217 <= -2] 144.34/144.26 f220(I219, I220, I221) -> f219(I219, -3, I221) [-2 <= I220] 144.34/144.26 f63(I222, I223, I224) -> f62(I222, I223, I224) 144.34/144.26 f218(I225, I226, I227) -> f219(I225, 1 + I226, I226 + I227) [I226 <= -2] 144.34/144.26 f218(I228, I229, I230) -> f217(I228, -4, I230) [-1 <= I229] 144.34/144.26 f67(I231, I232, I233) -> f66(I231, I232, I233) 144.34/144.26 f216(I234, I235, I236) -> f217(I234, 1 + I235, I235 + I236) [1 + I235 <= -1] 144.34/144.26 f216(I237, I238, I239) -> f215(I237, -4, I239) [-1 <= I238] 144.34/144.26 f214(I240, I241, I242) -> f215(I240, 1 + I241, I241 + I242) [I241 <= -1] 144.34/144.26 f214(I243, I244, I245) -> f213(I243, -4, I245) [0 <= I244] 144.34/144.26 f69(I246, I247, I248) -> f68(I246, I247, I248) 144.34/144.26 f212(I249, I250, I251) -> f213(I249, 1 + I250, I250 + I251) [1 + I250 <= -1] 144.34/144.26 f212(I252, I253, I254) -> f211(I252, -4, I254) [-1 <= I253] 144.34/144.26 f71(I255, I256, I257) -> f70(I255, I256, I257) 144.34/144.26 f210(I258, I259, I260) -> f211(I258, 1 + I259, I259 + I260) [I259 <= -1] 144.34/144.26 f210(I261, I262, I263) -> f209(I261, -5, I263) [0 <= I262] 144.34/144.26 f208(I264, I265, I266) -> f209(I264, 1 + I265, I265 + I266) [1 + I265 <= 0] 144.34/144.26 f208(I267, I268, I269) -> f207(I267, -5, I269) [0 <= I268] 144.34/144.26 f206(I270, I271, I272) -> f207(I270, 1 + I271, I271 + I272) [I271 <= 0] 144.34/144.26 f206(I273, I274, I275) -> f205(I273, -5, I275) [1 <= I274] 144.34/144.26 f75(I276, I277, I278) -> f74(I276, I277, I278) 144.34/144.26 f204(I279, I280, I281) -> f205(I279, 1 + I280, I280 + I281) [1 + I280 <= 0] 144.34/144.26 f204(I282, I283, I284) -> f203(I282, -5, I284) [0 <= I283] 144.34/144.26 f202(I285, I286, I287) -> f203(I285, 1 + I286, I286 + I287) [I286 <= 0] 144.34/144.26 f202(I288, I289, I290) -> f201(I288, -6, I290) [1 <= I289] 144.34/144.26 f77(I291, I292, I293) -> f76(I291, I292, I293) 144.34/144.26 f200(I294, I295, I296) -> f201(I294, 1 + I295, I295 + I296) [1 + I295 <= 4] 144.34/144.26 f200(I297, I298, I299) -> f199(I297, -6, I299) [4 <= I298] 144.34/144.26 f81(I300, I301, I302) -> f80(I300, I301, I302) 144.34/144.26 f198(I303, I304, I305) -> f199(I303, 1 + I304, I304 + I305) [I304 <= 4] 144.34/144.26 f198(I306, I307, I308) -> f197(I306, -6, I308) [5 <= I307] 144.34/144.26 f196(I309, I310, I311) -> f197(I309, 1 + I310, I310 + I311) [1 + I310 <= 4] 144.34/144.26 f196(I312, I313, I314) -> f195(I312, -6, I314) [4 <= I313] 144.34/144.26 f17(I315, I316, I317) -> f16(I315, I316, I317) 144.34/144.26 f85(I318, I319, I320) -> f84(I318, I319, I320) 144.34/144.26 f194(I321, I322, I323) -> f195(I321, 1 + I322, I322 + I323) [I322 <= 4] 144.34/144.26 f194(I324, I325, I326) -> f193(I324, 0, I326) [5 <= I325] 144.34/144.26 f192(I327, I328, I329) -> f193(I327, I327 + I328, I328 + I329) [1 + I328 <= 3] 144.34/144.26 f192(I330, I331, I332) -> f191(I330, 0, I332) [3 <= I331] 144.34/144.26 f190(I333, I334, I335) -> f191(I333, I333 + I334, I334 + I335) [I334 <= 3] 144.34/144.26 f190(I336, I337, I338) -> f189(I336, 0, I338) [4 <= I337] 144.34/144.26 f87(I339, I340, I341) -> f86(I339, I340, I341) 144.34/144.26 f188(I342, I343, I344) -> f189(I342, I342 + I343, I343 + I344) [1 + I343 <= 3] 144.34/144.26 f188(I345, I346, I347) -> f187(I345, 0, I347) [3 <= I346] 144.34/144.26 f186(I348, I349, I350) -> f187(I348, I348 + I349, I349 + I350) [I349 <= 3] 144.34/144.26 f186(I351, I352, I353) -> f185(I351, 1, I353) [4 <= I352] 144.34/144.26 f91(I354, I355, I356) -> f90(I354, I355, I356) 144.34/144.26 f184(I357, I358, I359) -> f185(I357, I357 + I358, I358 + I359) [1 + I358 <= 2] 144.34/144.26 f184(I360, I361, I362) -> f183(I360, 1, I362) [2 <= I361] 144.34/144.26 f93(I363, I364, I365) -> f92(I363, I364, I365) 144.34/144.26 f182(I366, I367, I368) -> f183(I366, I366 + I367, I367 + I368) [I367 <= 2] 144.34/144.26 f182(I369, I370, I371) -> f181(I369, 1, I371) [3 <= I370] 144.34/144.26 f180(I372, I373, I374) -> f181(I372, I372 + I373, I373 + I374) [1 + I373 <= 2] 144.34/144.26 f180(I375, I376, I377) -> f179(I375, 1, I377) [2 <= I376] 144.34/144.26 f95(I378, I379, I380) -> f94(I378, I379, I380) 144.34/144.26 f178(I381, I382, I383) -> f179(I381, I381 + I382, I382 + I383) [I382 <= 2] 144.34/144.26 f178(I384, I385, I386) -> f177(I384, -3, I386) [3 <= I385] 144.34/144.26 f176(I387, I388, I389) -> f177(I387, I387 + I388, I388 + I389) [1 + I388 <= -2] 144.34/144.26 f176(I390, I391, I392) -> f175(I390, -3, I392) [-2 <= I391] 144.34/144.26 f174(I393, I394, I395) -> f175(I393, I393 + I394, I394 + I395) [I394 <= -2] 144.34/144.26 f174(I396, I397, I398) -> f173(I396, -3, I398) [-1 <= I397] 144.34/144.26 f99(I399, I400, I401) -> f98(I399, I400, I401) 144.34/144.26 f172(I402, I403, I404) -> f173(I402, I402 + I403, I403 + I404) [1 + I403 <= -2] 144.34/144.26 f172(I405, I406, I407) -> f171(I405, -3, I407) [-2 <= I406] 144.34/144.26 f103(I408, I409, I410) -> f102(I408, I409, I410) 144.34/144.26 f170(I411, I412, I413) -> f171(I411, I411 + I412, I412 + I413) [I412 <= -2] 144.34/144.26 f170(I414, I415, I416) -> f169(I414, -4, I416) [-1 <= I415] 144.34/144.26 f168(I417, I418, I419) -> f169(I417, I417 + I418, I418 + I419) [1 + I418 <= -1] 144.34/144.26 f168(I420, I421, I422) -> f167(I420, -4, I422) [-1 <= I421] 144.34/144.26 f105(I423, I424, I425) -> f104(I423, I424, I425) 144.34/144.26 f166(I426, I427, I428) -> f167(I426, I426 + I427, I427 + I428) [I427 <= -1] 144.34/144.26 f166(I429, I430, I431) -> f165(I429, -4, I431) [0 <= I430] 144.34/144.26 f21(I432, I433, I434) -> f20(I432, I433, I434) 144.34/144.26 f109(I435, I436, I437) -> f108(I435, I436, I437) 144.34/144.26 f164(I438, I439, I440) -> f165(I438, I438 + I439, I439 + I440) [1 + I439 <= -1] 144.34/144.26 f164(I441, I442, I443) -> f163(I441, -4, I443) [-1 <= I442] 144.34/144.26 f162(I444, I445, I446) -> f163(I444, I444 + I445, I445 + I446) [I445 <= -1] 144.34/144.26 f162(I447, I448, I449) -> f161(I447, -5, I449) [0 <= I448] 144.34/144.26 f160(I450, I451, I452) -> f161(I450, I450 + I451, I451 + I452) [1 + I451 <= 0] 144.34/144.26 f160(I453, I454, I455) -> f1(I453, -5, I455) [0 <= I454] 144.34/144.26 f113(I456, I457, I458) -> f112(I456, I457, I458) 144.34/144.26 f2(I459, I460, I461) -> f1(I459, I459 + I460, I460 + I461) [I460 <= 0] 144.34/144.26 f2(I462, I463, I464) -> f3(I462, -5, I464) [1 <= I463] 144.34/144.26 f4(I465, I466, I467) -> f3(I465, I465 + I466, I466 + I467) [1 + I466 <= 0] 144.34/144.26 f4(I468, I469, I470) -> f5(I468, -5, I470) [0 <= I469] 144.34/144.26 f115(I471, I472, I473) -> f114(I471, I472, I473) 144.34/144.26 f6(I474, I475, I476) -> f5(I474, I474 + I475, I475 + I476) [I475 <= 0] 144.34/144.26 f6(I477, I478, I479) -> f7(I477, -6, I479) [1 <= I478] 144.34/144.26 f117(I480, I481, I482) -> f116(I480, I481, I482) 144.34/144.26 f8(I483, I484, I485) -> f7(I483, I483 + I484, I484 + I485) [1 + I484 <= 4] 144.34/144.26 f8(I486, I487, I488) -> f9(I486, -6, I488) [4 <= I487] 144.34/144.26 f10(I489, I490, I491) -> f9(I489, I489 + I490, I490 + I491) [I490 <= 4] 144.34/144.26 f10(I492, I493, I494) -> f11(I492, -6, I494) [5 <= I493] 144.34/144.26 f119(I495, I496, I497) -> f118(I495, I496, I497) 144.34/144.26 f12(I498, I499, I500) -> f11(I498, I498 + I499, I499 + I500) [1 + I499 <= 4] 144.34/144.26 f12(I501, I502, I503) -> f18(I501, -6, I503) [4 <= I502] 144.34/144.26 f19(I504, I505, I506) -> f18(I504, I504 + I505, I505 + I506) [I505 <= 4] 144.34/144.26 f19(I507, I508, I509) -> f26(I507, 5, I509) [5 <= I508] 144.34/144.26 f27(I510, I511, I512) -> f26(I510, -1 + I511, I511 + I512) [3 <= I511] 144.34/144.26 f27(I513, I514, I515) -> f32(I513, 5, I515) [I514 <= 2] 144.34/144.26 f123(I516, I517, I518) -> f122(I516, I517, I518) 144.34/144.26 f33(I519, I520, I521) -> f32(I519, -1 + I520, I520 + I521) [2 <= I520] 144.34/144.26 f33(I522, I523, I524) -> f36(I522, 5, I524) [1 + I523 <= 2] 144.34/144.26 f37(I525, I526, I527) -> f36(I525, -1 + I526, I526 + I527) [3 <= I526] 144.34/144.26 f37(I528, I529, I530) -> f40(I528, 5, I530) [I529 <= 2] 144.34/144.26 f127(I531, I532, I533) -> f126(I531, I532, I533) 144.34/144.26 f41(I534, I535, I536) -> f40(I534, -1 + I535, I535 + I536) [2 <= I535] 144.34/144.26 f41(I537, I538, I539) -> f48(I537, 6, I539) [1 + I538 <= 2] 144.34/144.26 f129(I540, I541, I542) -> f128(I540, I541, I542) 144.34/144.26 f49(I543, I544, I545) -> f48(I543, -1 + I544, I544 + I545) [2 <= I544] 144.34/144.26 f49(I546, I547, I548) -> f54(I546, 6, I548) [I547 <= 1] 144.34/144.26 f55(I549, I550, I551) -> f54(I549, -1 + I550, I550 + I551) [1 <= I550] 144.34/144.26 f55(I552, I553, I554) -> f60(I552, 6, I554) [1 + I553 <= 1] 144.34/144.26 f23(I555, I556, I557) -> f22(I555, I556, I557) 144.34/144.26 f133(I558, I559, I560) -> f132(I558, I559, I560) 144.34/144.26 f61(I561, I562, I563) -> f60(I561, -1 + I562, I562 + I563) [2 <= I562] 144.34/144.26 f61(I564, I565, I566) -> f64(I564, 6, I566) [I565 <= 1] 144.34/144.26 f65(I567, I568, I569) -> f64(I567, -1 + I568, I568 + I569) [1 <= I568] 144.34/144.26 f65(I570, I571, I572) -> f72(I570, 7, I572) [1 + I571 <= 1] 144.34/144.26 f73(I573, I574, I575) -> f72(I573, -1 + I574, I574 + I575) [1 <= I574] 144.34/144.26 f73(I576, I577, I578) -> f78(I576, 7, I578) [I577 <= 0] 144.34/144.26 f137(I579, I580, I581) -> f136(I579, I580, I581) 144.34/144.26 f79(I582, I583, I584) -> f78(I582, -1 + I583, I583 + I584) [0 <= I583] 144.34/144.26 f79(I585, I586, I587) -> f82(I585, 7, I587) [1 + I586 <= 0] 144.34/144.26 f139(I588, I589, I590) -> f138(I588, I589, I590) 144.34/144.26 f83(I591, I592, I593) -> f82(I591, -1 + I592, I592 + I593) [1 <= I592] 144.34/144.26 f83(I594, I595, I596) -> f88(I594, 7, I596) [I595 <= 0] 144.34/144.26 f89(I597, I598, I599) -> f88(I597, -1 + I598, I598 + I599) [0 <= I598] 144.34/144.26 f89(I600, I601, I602) -> f96(I600, 8, I602) [1 + I601 <= 0] 144.34/144.26 f141(I603, I604, I605) -> f140(I603, I604, I605) 144.34/144.26 f97(I606, I607, I608) -> f96(I606, -1 + I607, I607 + I608) [0 <= I607] 144.34/144.26 f97(I609, I610, I611) -> f100(I609, 8, I611) [I610 <= -1] 144.34/144.26 f145(I612, I613, I614) -> f144(I612, I613, I614) 144.34/144.26 f101(I615, I616, I617) -> f100(I615, -1 + I616, I616 + I617) [-1 <= I616] 144.34/144.26 f101(I618, I619, I620) -> f106(I618, 8, I620) [1 + I619 <= -1] 144.34/144.26 f107(I621, I622, I623) -> f106(I621, -1 + I622, I622 + I623) [0 <= I622] 144.34/144.26 f107(I624, I625, I626) -> f110(I624, 8, I626) [I625 <= -1] 144.34/144.26 f111(I627, I628, I629) -> f110(I627, -1 + I628, I628 + I629) [-1 <= I628] 144.34/144.26 f111(I630, I631, I632) -> f120(I630, 9, I632) [1 + I631 <= -1] 144.34/144.26 f147(I633, I634, I635) -> f146(I633, I634, I635) 144.34/144.26 f121(I636, I637, I638) -> f120(I636, -1 + I637, I637 + I638) [-1 <= I637] 144.34/144.26 f121(I639, I640, I641) -> f124(I639, 9, I641) [I640 <= -2] 144.34/144.26 f125(I642, I643, I644) -> f124(I642, -1 + I643, I643 + I644) [-2 <= I643] 144.34/144.26 f125(I645, I646, I647) -> f130(I645, 9, I647) [1 + I646 <= -2] 144.34/144.26 f151(I648, I649, I650) -> f150(I648, I649, I650) 144.34/144.26 f131(I651, I652, I653) -> f130(I651, -1 + I652, I652 + I653) [-1 <= I652] 144.34/144.26 f131(I654, I655, I656) -> f134(I654, 9, I656) [I655 <= -2] 144.34/144.26 f135(I657, I658, I659) -> f134(I657, -1 + I658, I658 + I659) [-2 <= I658] 144.34/144.26 f135(I660, I661, I662) -> f142(I660, 0, I662) [1 + I661 <= -2] 144.34/144.26 f155(I663, I664, I665) -> f154(I663, I664, I665) 144.34/144.26 f143(I666, I667, I668) -> f142(I666, -1 + I667, I667 + I668) [-2 <= I667] 144.34/144.26 f143(I669, I670, I671) -> f148(I669, 0, I671) [I670 <= -3] 144.34/144.26 f157(I672, I673, I674) -> f156(I672, I673, I674) 144.34/144.26 f149(I675, I676, I677) -> f148(I675, -1 + I676, I676 + I677) [-3 <= I676] 144.34/144.26 f149(I678, I679, I680) -> f152(I678, 0, I680) [1 + I679 <= -3] 144.34/144.26 f153(I681, I682, I683) -> f152(I681, -1 + I682, I682 + I683) [-2 <= I682] 144.34/144.26 f153(I684, I685, I686) -> f158(I684, 0, I686) [I685 <= -3] 144.34/144.26 f159(I687, I688, I689) -> f158(I687, -1 + I688, I688 + I689) [-3 <= I688] 144.34/144.26 f159(I690, I691, I692) -> f157(I690, -1, I692) [1 + I691 <= -3] 144.34/144.26 f158(I693, I694, I695) -> f159(I693, I694, I695) 144.34/144.26 f156(I696, I697, I698) -> f157(I696, -1 + I697, I697 + I698) [-4 <= I697] 144.34/144.26 f156(I699, I700, I701) -> f155(I699, -1, I701) [I700 <= -5] 144.34/144.26 f154(I702, I703, I704) -> f155(I702, -1 + I703, I703 + I704) [-5 <= I703] 144.34/144.26 f154(I705, I706, I707) -> f151(I705, -1, I707) [1 + I706 <= -5] 144.34/144.26 f152(I708, I709, I710) -> f153(I708, I709, I710) 144.34/144.26 f150(I711, I712, I713) -> f151(I711, -1 + I712, I712 + I713) [-4 <= I712] 144.34/144.26 f150(I714, I715, I716) -> f147(I714, -1, I716) [I715 <= -5] 144.34/144.26 f148(I717, I718, I719) -> f149(I717, I718, I719) 144.34/144.26 f146(I720, I721, I722) -> f147(I720, -1 + I721, I721 + I722) [-5 <= I721] 144.34/144.26 f146(I723, I724, I725) -> f145(I723, -2, I725) [1 + I724 <= -5] 144.34/144.26 f144(I726, I727, I728) -> f145(I726, -1 + I727, I727 + I728) [-6 <= I727] 144.34/144.26 f144(I729, I730, I731) -> f141(I729, -2, I731) [I730 <= -7] 144.34/144.26 f142(I732, I733, I734) -> f143(I732, I733, I734) 144.34/144.26 f140(I735, I736, I737) -> f141(I735, -1 + I736, I736 + I737) [-7 <= I736] 144.34/144.26 f140(I738, I739, I740) -> f139(I738, -2, I740) [1 + I739 <= -7] 144.34/144.26 f138(I741, I742, I743) -> f139(I741, -1 + I742, I742 + I743) [-6 <= I742] 144.34/144.26 f138(I744, I745, I746) -> f137(I744, -2, I746) [I745 <= -7] 144.34/144.26 f136(I747, I748, I749) -> f137(I747, -1 + I748, I748 + I749) [-7 <= I748] 144.34/144.26 f136(I750, I751, I752) -> f133(I750, 16, I752) [1 + I751 <= -7] 144.34/144.26 f134(I753, I754, I755) -> f135(I753, I754, I755) 144.34/144.26 f132(I756, I757, I758) -> f133(I756, -1 + I757, I757 + I758) [-7 <= I757] 144.34/144.26 f132(I759, I760, I761) -> f129(I759, 16, I761) [I760 <= -8] 144.34/144.26 f130(I762, I763, I764) -> f131(I762, I763, I764) 144.34/144.26 f128(I765, I766, I767) -> f129(I765, -1 + I766, I766 + I767) [-8 <= I766] 144.34/144.26 f128(I768, I769, I770) -> f127(I768, 16, I770) [1 + I769 <= -8] 144.34/144.26 f126(I771, I772, I773) -> f127(I771, -1 + I772, I772 + I773) [-7 <= I772] 144.34/144.26 f126(I774, I775, I776) -> f123(I774, 16, I776) [I775 <= -8] 144.34/144.26 f124(I777, I778, I779) -> f125(I777, I778, I779) 144.34/144.26 f122(I780, I781, I782) -> f123(I780, -1 + I781, I781 + I782) [-8 <= I781] 144.34/144.26 f122(I783, I784, I785) -> f119(I783, 5, I785) [1 + I784 <= -8] 144.34/144.26 f25(I786, I787, I788) -> f24(I786, I787, I788) 144.34/144.26 f120(I789, I790, I791) -> f121(I789, I790, I791) 144.34/144.26 f118(I792, I793, I794) -> f119(I792, -1 * I792 + I793, I793 + I794) [3 <= I793] 144.34/144.26 f118(I795, I796, I797) -> f117(I795, 5, I797) [I796 <= 2] 144.34/144.26 f116(I798, I799, I800) -> f117(I798, -1 * I798 + I799, I799 + I800) [2 <= I799] 144.34/144.26 f116(I801, I802, I803) -> f115(I801, 5, I803) [1 + I802 <= 2] 144.34/144.26 f114(I804, I805, I806) -> f115(I804, -1 * I804 + I805, I805 + I806) [3 <= I805] 144.34/144.26 f114(I807, I808, I809) -> f113(I807, 5, I809) [I808 <= 2] 144.34/144.26 f112(I810, I811, I812) -> f113(I810, -1 * I810 + I811, I811 + I812) [2 <= I811] 144.34/144.26 f112(I813, I814, I815) -> f109(I813, 6, I815) [1 + I814 <= 2] 144.34/144.26 f110(I816, I817, I818) -> f111(I816, I817, I818) 144.34/144.26 f108(I819, I820, I821) -> f109(I819, -1 * I819 + I820, I820 + I821) [2 <= I820] 144.34/144.26 f108(I822, I823, I824) -> f105(I822, 6, I824) [I823 <= 1] 144.34/144.26 f106(I825, I826, I827) -> f107(I825, I826, I827) 144.34/144.26 f104(I828, I829, I830) -> f105(I828, -1 * I828 + I829, I829 + I830) [1 <= I829] 144.34/144.26 f104(I831, I832, I833) -> f103(I831, 6, I833) [1 + I832 <= 1] 144.34/144.26 f102(I834, I835, I836) -> f103(I834, -1 * I834 + I835, I835 + I836) [2 <= I835] 144.34/144.26 f102(I837, I838, I839) -> f99(I837, 6, I839) [I838 <= 1] 144.34/144.26 f100(I840, I841, I842) -> f101(I840, I841, I842) 144.34/144.26 f98(I843, I844, I845) -> f99(I843, -1 * I843 + I844, I844 + I845) [1 <= I844] 144.34/144.26 f98(I846, I847, I848) -> f95(I846, 7, I848) [1 + I847 <= 1] 144.34/144.26 f96(I849, I850, I851) -> f97(I849, I850, I851) 144.34/144.26 f94(I852, I853, I854) -> f95(I852, -1 * I852 + I853, I853 + I854) [1 <= I853] 144.34/144.26 f94(I855, I856, I857) -> f93(I855, 7, I857) [I856 <= 0] 144.34/144.26 f92(I858, I859, I860) -> f93(I858, -1 * I858 + I859, I859 + I860) [0 <= I859] 144.34/144.26 f92(I861, I862, I863) -> f91(I861, 7, I863) [1 + I862 <= 0] 144.34/144.26 f90(I864, I865, I866) -> f91(I864, -1 * I864 + I865, I865 + I866) [1 <= I865] 144.34/144.26 f90(I867, I868, I869) -> f87(I867, 7, I869) [I868 <= 0] 144.34/144.26 f88(I870, I871, I872) -> f89(I870, I871, I872) 144.34/144.26 f86(I873, I874, I875) -> f87(I873, -1 * I873 + I874, I874 + I875) [0 <= I874] 144.34/144.26 f86(I876, I877, I878) -> f85(I876, 8, I878) [1 + I877 <= 0] 144.34/144.26 f84(I879, I880, I881) -> f85(I879, -1 * I879 + I880, I880 + I881) [0 <= I880] 144.34/144.26 f84(I882, I883, I884) -> f81(I882, 8, I884) [I883 <= -1] 144.34/144.26 f82(I885, I886, I887) -> f83(I885, I886, I887) 144.34/144.26 f80(I888, I889, I890) -> f81(I888, -1 * I888 + I889, I889 + I890) [-1 <= I889] 144.34/144.26 f80(I891, I892, I893) -> f77(I891, 8, I893) [1 + I892 <= -1] 144.34/144.26 f78(I894, I895, I896) -> f79(I894, I895, I896) 144.34/144.26 f76(I897, I898, I899) -> f77(I897, -1 * I897 + I898, I898 + I899) [0 <= I898] 144.34/144.26 f76(I900, I901, I902) -> f75(I900, 8, I902) [I901 <= -1] 144.34/144.26 f74(I903, I904, I905) -> f75(I903, -1 * I903 + I904, I904 + I905) [-1 <= I904] 144.34/144.26 f74(I906, I907, I908) -> f71(I906, 9, I908) [1 + I907 <= -1] 144.34/144.26 f31(I909, I910, I911) -> f30(I909, I910, I911) 144.34/144.26 f72(I912, I913, I914) -> f73(I912, I913, I914) 144.34/144.26 f70(I915, I916, I917) -> f71(I915, -1 * I915 + I916, I916 + I917) [-1 <= I916] 144.34/144.26 f70(I918, I919, I920) -> f69(I918, 9, I920) [I919 <= -2] 144.34/144.26 f68(I921, I922, I923) -> f69(I921, -1 * I921 + I922, I922 + I923) [-2 <= I922] 144.34/144.26 f68(I924, I925, I926) -> f67(I924, 9, I926) [1 + I925 <= -2] 144.34/144.26 f66(I927, I928, I929) -> f67(I927, -1 * I927 + I928, I928 + I929) [-1 <= I928] 144.34/144.26 f66(I930, I931, I932) -> f63(I930, 9, I932) [I931 <= -2] 144.34/144.26 f64(I933, I934, I935) -> f65(I933, I934, I935) 144.34/144.26 f62(I936, I937, I938) -> f63(I936, -1 * I936 + I937, I937 + I938) [-2 <= I937] 144.34/144.26 f62(I939, I940, I941) -> f59(I939, 0, I941) [1 + I940 <= -2] 144.34/144.26 f60(I942, I943, I944) -> f61(I942, I943, I944) 144.34/144.26 f58(I945, I946, I947) -> f59(I945, -1 * I945 + I946, I946 + I947) [-2 <= I946] 144.34/144.26 f58(I948, I949, I950) -> f57(I948, 0, I950) [I949 <= -3] 144.34/144.26 f56(I951, I952, I953) -> f57(I951, -1 * I951 + I952, I952 + I953) [-3 <= I952] 144.34/144.26 f56(I954, I955, I956) -> f53(I954, 0, I956) [1 + I955 <= -3] 144.34/144.26 f54(I957, I958, I959) -> f55(I957, I958, I959) 144.34/144.26 f52(I960, I961, I962) -> f53(I960, -1 * I960 + I961, I961 + I962) [-2 <= I961] 144.34/144.26 f52(I963, I964, I965) -> f51(I963, 0, I965) [I964 <= -3] 144.34/144.26 f50(I966, I967, I968) -> f51(I966, -1 * I966 + I967, I967 + I968) [-3 <= I967] 144.34/144.26 f50(I969, I970, I971) -> f47(I969, -1, I971) [1 + I970 <= -3] 144.34/144.26 f48(I972, I973, I974) -> f49(I972, I973, I974) 144.34/144.26 f46(I975, I976, I977) -> f47(I975, -1 * I975 + I976, I976 + I977) [-4 <= I976] 144.34/144.26 f46(I978, I979, I980) -> f45(I978, -1, I980) [I979 <= -5] 144.34/144.26 f44(I981, I982, I983) -> f45(I981, -1 * I981 + I982, I982 + I983) [-5 <= I982] 144.34/144.26 f44(I984, I985, I986) -> f43(I984, -1, I986) [1 + I985 <= -5] 144.34/144.26 f42(I987, I988, I989) -> f43(I987, -1 * I987 + I988, I988 + I989) [-4 <= I988] 144.34/144.26 f42(I990, I991, I992) -> f39(I990, -1, I992) [I991 <= -5] 144.34/144.26 f40(I993, I994, I995) -> f41(I993, I994, I995) 144.34/144.26 f38(I996, I997, I998) -> f39(I996, -1 * I996 + I997, I997 + I998) [-5 <= I997] 144.34/144.26 f38(I999, I1000, I1001) -> f35(I999, -2, I1001) [1 + I1000 <= -5] 144.34/144.26 f36(I1002, I1003, I1004) -> f37(I1002, I1003, I1004) 144.34/144.26 f34(I1005, I1006, I1007) -> f35(I1005, -1 * I1005 + I1006, I1006 + I1007) [-6 <= I1006] 144.34/144.26 f34(I1008, I1009, I1010) -> f28(I1008, -2, I1010) [I1009 <= -7] 144.34/144.26 f29(I1011, I1012, I1013) -> f28(I1011, -1 * I1011 + I1012, I1012 + I1013) [-7 <= I1012] 144.34/144.26 f29(I1014, I1015, I1016) -> f31(I1014, -2, I1016) [1 + I1015 <= -7] 144.34/144.26 f32(I1017, I1018, I1019) -> f33(I1017, I1018, I1019) 144.34/144.26 f30(I1020, I1021, I1022) -> f31(I1020, -1 * I1020 + I1021, I1021 + I1022) [-6 <= I1021] 144.34/144.26 f30(I1023, I1024, I1025) -> f25(I1023, -2, I1025) [I1024 <= -7] 144.34/144.26 f28(I1026, I1027, I1028) -> f29(I1026, I1027, I1028) 144.34/144.26 f26(I1029, I1030, I1031) -> f27(I1029, I1030, I1031) 144.34/144.26 f24(I1032, I1033, I1034) -> f25(I1032, -1 * I1032 + I1033, I1033 + I1034) [-7 <= I1033] 144.34/144.26 f24(I1035, I1036, I1037) -> f23(I1035, 16, I1037) [1 + I1036 <= -7] 144.34/144.26 f22(I1038, I1039, I1040) -> f23(I1038, -1 * I1038 + I1039, I1039 + I1040) [-7 <= I1039] 144.34/144.26 f22(I1041, I1042, I1043) -> f21(I1041, 16, I1043) [I1042 <= -8] 144.34/144.26 f20(I1044, I1045, I1046) -> f21(I1044, -1 * I1044 + I1045, I1045 + I1046) [-8 <= I1045] 144.34/144.26 f20(I1047, I1048, I1049) -> f17(I1047, 16, I1049) [1 + I1048 <= -8] 144.34/144.26 f18(I1050, I1051, I1052) -> f19(I1050, I1051, I1052) 144.34/144.26 f16(I1053, I1054, I1055) -> f17(I1053, -1 * I1053 + I1054, I1054 + I1055) [-7 <= I1054] 144.34/144.26 f16(I1056, I1057, I1058) -> f15(I1056, 16, I1058) [I1057 <= -8] 144.34/144.26 f13(I1059, I1060, I1061) -> f15(I1059, -1 * I1059 + I1060, I1060 + I1061) [-8 <= I1060] 144.34/144.26 f13(I1062, I1063, I1064) -> f14(I1062, I1063, I1064) [1 + I1063 <= -8] 144.34/144.26 f11(I1065, I1066, I1067) -> f12(I1065, I1066, I1067) 144.34/144.26 f9(I1068, I1069, I1070) -> f10(I1068, I1069, I1070) 144.34/144.26 f7(I1071, I1072, I1073) -> f8(I1071, I1072, I1073) 144.34/144.26 f5(I1074, I1075, I1076) -> f6(I1074, I1075, I1076) 144.34/144.26 f3(I1077, I1078, I1079) -> f4(I1077, I1078, I1079) 144.34/144.26 f1(I1080, I1081, I1082) -> f2(I1080, I1081, I1082) 144.34/144.26 144.34/144.26 The dependency graph for this problem is: 144.34/144.26 0 -> 1 144.34/144.26 1 -> 47 144.34/144.26 2 -> 336, 337 144.34/144.26 3 -> 151, 152 144.34/144.26 4 -> 149, 150 144.34/144.26 5 -> 147, 148 144.34/144.26 6 -> 143, 144 144.34/144.26 7 -> 140, 141 144.34/144.26 8 -> 138, 139 144.34/144.26 9 -> 135, 136 144.34/144.26 10 -> 132, 133 144.34/144.26 11 -> 130, 131 144.34/144.26 12 -> 128, 129 144.34/144.26 13 -> 125, 126 144.34/144.26 14 -> 123, 124 144.34/144.26 15 -> 120, 121 144.34/144.26 16 -> 117, 118 144.34/144.26 17 -> 115, 116 144.34/144.26 18 -> 112, 113 144.34/144.26 19 -> 333, 334 144.34/144.26 20 -> 110, 111 144.34/144.26 21 -> 108, 109 144.34/144.26 22 -> 104, 105 144.34/144.26 23 -> 102, 103 144.34/144.26 24 -> 99, 100 144.34/144.26 25 -> 96, 97 144.34/144.26 26 -> 94, 95 144.34/144.26 27 -> 91, 92 144.34/144.26 28 -> 330, 331 144.34/144.26 29 -> 89, 90 144.34/144.26 30 -> 87, 88 144.34/144.26 31 -> 84, 85 144.34/144.26 32 -> 81, 82 144.34/144.26 33 -> 79, 80 144.34/144.26 34 -> 76, 77 144.34/144.26 35 -> 73, 74 144.34/144.26 36 -> 71, 72 144.34/144.26 37 -> 328, 329 144.34/144.26 38 -> 69, 70 144.34/144.26 39 -> 65, 66 144.34/144.26 40 -> 63, 64 144.34/144.26 41 -> 60, 61 144.34/144.26 42 -> 58, 59 144.34/144.26 43 -> 55, 56 144.34/144.26 44 -> 52, 53 144.34/144.26 45 -> 50, 51 144.34/144.26 46 -> 326, 327 144.34/144.26 47 -> 48, 49 144.34/144.26 48 -> 47 144.34/144.26 49 -> 45 144.34/144.26 50 -> 45 144.34/144.26 51 -> 44 144.34/144.26 52 -> 44 144.34/144.26 53 -> 43 144.34/144.26 54 -> 323, 324 144.34/144.26 55 -> 43 144.34/144.26 56 -> 42 144.34/144.26 57 -> 321, 322 144.34/144.26 58 -> 42 144.34/144.26 59 -> 41 144.34/144.26 60 -> 41 144.34/144.26 61 -> 40 144.34/144.26 62 -> 318, 319 144.34/144.26 63 -> 40 144.34/144.26 64 -> 39 144.34/144.26 65 -> 39 144.34/144.26 66 -> 38 144.34/144.26 67 -> 354 144.34/144.26 68 -> 316, 317 144.34/144.26 69 -> 38 144.34/144.26 70 -> 36 144.34/144.26 71 -> 36 144.34/144.26 72 -> 35 144.34/144.26 73 -> 35 144.34/144.26 74 -> 34 144.34/144.26 75 -> 313, 314 144.34/144.26 76 -> 34 144.34/144.26 77 -> 33 144.34/144.26 78 -> 310, 311 144.34/144.26 79 -> 33 144.34/144.26 80 -> 32 144.34/144.26 81 -> 32 144.34/144.26 82 -> 31 144.34/144.26 83 -> 308, 309 144.34/144.26 84 -> 31 144.34/144.26 85 -> 30 144.34/144.26 86 -> 306, 307 144.34/144.26 87 -> 30 144.34/144.26 88 -> 29 144.34/144.26 89 -> 29 144.34/144.26 90 -> 27 144.34/144.26 91 -> 27 144.34/144.26 92 -> 26 144.34/144.26 93 -> 302, 303 144.34/144.26 94 -> 26 144.34/144.26 95 -> 25 144.34/144.26 96 -> 25 144.34/144.26 97 -> 24 144.34/144.26 98 -> 300, 301 144.34/144.26 99 -> 24 144.34/144.26 100 -> 23 144.34/144.26 101 -> 297, 298 144.34/144.26 102 -> 23 144.34/144.26 103 -> 22 144.34/144.26 104 -> 22 144.34/144.26 105 -> 21 144.34/144.26 106 -> 352, 353 144.34/144.26 107 -> 294, 295 144.34/144.26 108 -> 21 144.34/144.26 109 -> 20 144.34/144.26 110 -> 20 144.34/144.26 111 -> 18 144.34/144.26 112 -> 18 144.34/144.26 113 -> 17 144.34/144.26 114 -> 292, 293 144.34/144.26 115 -> 17 144.34/144.26 116 -> 16 144.34/144.26 117 -> 16 144.34/144.26 118 -> 15 144.34/144.26 119 -> 289, 290 144.34/144.26 120 -> 15 144.34/144.26 121 -> 14 144.34/144.26 122 -> 287, 288 144.34/144.26 123 -> 14 144.34/144.26 124 -> 13 144.34/144.26 125 -> 13 144.34/144.26 126 -> 12 144.34/144.26 127 -> 285, 286 144.34/144.26 128 -> 12 144.34/144.26 129 -> 11 144.34/144.26 130 -> 11 144.34/144.26 131 -> 10 144.34/144.26 132 -> 10 144.34/144.26 133 -> 9 144.34/144.26 134 -> 282, 283 144.34/144.26 135 -> 9 144.34/144.26 136 -> 8 144.34/144.26 137 -> 279, 280 144.34/144.26 138 -> 8 144.34/144.26 139 -> 7 144.34/144.26 140 -> 7 144.34/144.26 141 -> 6 144.34/144.26 142 -> 277, 278 144.34/144.26 143 -> 6 144.34/144.26 144 -> 5 144.34/144.26 145 -> 349, 350 144.34/144.26 146 -> 274, 275 144.34/144.26 147 -> 5 144.34/144.26 148 -> 4 144.34/144.26 149 -> 4 144.34/144.26 150 -> 3 144.34/144.26 151 -> 3 144.34/144.26 152 -> 360 144.34/144.26 153 -> 271, 272 144.34/144.26 154 -> 360 144.34/144.26 155 -> 359 144.34/144.26 156 -> 359 144.34/144.26 157 -> 358 144.34/144.26 158 -> 269, 270 144.34/144.26 159 -> 358 144.34/144.26 160 -> 357 144.34/144.26 161 -> 267, 268 144.34/144.26 162 -> 357 144.34/144.26 163 -> 356 144.34/144.26 164 -> 356 144.34/144.26 165 -> 355 144.34/144.26 166 -> 265, 266 144.34/144.26 167 -> 355 144.34/144.26 168 -> 351 144.34/144.26 169 -> 351 144.34/144.26 170 -> 344 144.34/144.26 171 -> 344 144.34/144.26 172 -> 340 144.34/144.26 173 -> 261, 262 144.34/144.26 174 -> 340 144.34/144.26 175 -> 335 144.34/144.26 176 -> 335 144.34/144.26 177 -> 332 144.34/144.26 178 -> 258, 259 144.34/144.26 179 -> 332 144.34/144.26 180 -> 325 144.34/144.26 181 -> 256, 257 144.34/144.26 182 -> 325 144.34/144.26 183 -> 320 144.34/144.26 184 -> 320 144.34/144.26 185 -> 315 144.34/144.26 186 -> 347, 348 144.34/144.26 187 -> 253, 254 144.34/144.26 188 -> 315 144.34/144.26 189 -> 312 144.34/144.26 190 -> 312 144.34/144.26 191 -> 305 144.34/144.26 192 -> 305 144.34/144.26 193 -> 299 144.34/144.26 194 -> 250, 251 144.34/144.26 195 -> 299 144.34/144.26 196 -> 296 144.34/144.26 197 -> 248, 249 144.34/144.26 198 -> 296 144.34/144.26 199 -> 291 144.34/144.26 200 -> 291 144.34/144.26 201 -> 284 144.34/144.26 202 -> 246, 247 144.34/144.26 203 -> 284 144.34/144.26 204 -> 281 144.34/144.26 205 -> 243, 244 144.34/144.26 206 -> 281 144.34/144.26 207 -> 276 144.34/144.26 208 -> 276 144.34/144.26 209 -> 273 144.34/144.26 210 -> 273 144.34/144.26 211 -> 264 144.34/144.26 212 -> 241, 242 144.34/144.26 213 -> 264 144.34/144.26 214 -> 260 144.34/144.26 215 -> 260 144.34/144.26 216 -> 255 144.34/144.26 217 -> 238, 239 144.34/144.26 218 -> 255 144.34/144.26 219 -> 252 144.34/144.26 220 -> 252 144.34/144.26 221 -> 245 144.34/144.26 222 -> 235, 236 144.34/144.26 223 -> 245 144.34/144.26 224 -> 240 144.34/144.26 225 -> 233, 234 144.34/144.26 226 -> 240 144.34/144.26 227 -> 237 144.34/144.26 228 -> 237 144.34/144.26 229 -> 232 144.34/144.26 230 -> 232 144.34/144.26 231 -> 225 144.34/144.26 232 -> 230, 231 144.34/144.26 233 -> 225 144.34/144.26 234 -> 222 144.34/144.26 235 -> 222 144.34/144.26 236 -> 217 144.34/144.26 237 -> 228, 229 144.34/144.26 238 -> 217 144.34/144.26 239 -> 212 144.34/144.26 240 -> 226, 227 144.34/144.26 241 -> 212 144.34/144.26 242 -> 205 144.34/144.26 243 -> 205 144.34/144.26 244 -> 202 144.34/144.26 245 -> 223, 224 144.34/144.26 246 -> 202 144.34/144.26 247 -> 197 144.34/144.26 248 -> 197 144.34/144.26 249 -> 194 144.34/144.26 250 -> 194 144.34/144.26 251 -> 187 144.34/144.26 252 -> 220, 221 144.34/144.26 253 -> 187 144.34/144.26 254 -> 181 144.34/144.26 255 -> 218, 219 144.34/144.26 256 -> 181 144.34/144.26 257 -> 178 144.34/144.26 258 -> 178 144.34/144.26 259 -> 173 144.34/144.26 260 -> 215, 216 144.34/144.26 261 -> 173 144.34/144.26 262 -> 166 144.34/144.26 263 -> 345, 346 144.34/144.26 264 -> 213, 214 144.34/144.26 265 -> 166 144.34/144.26 266 -> 161 144.34/144.26 267 -> 161 144.34/144.26 268 -> 158 144.34/144.26 269 -> 158 144.34/144.26 270 -> 153 144.34/144.26 271 -> 153 144.34/144.26 272 -> 146 144.34/144.26 273 -> 210, 211 144.34/144.26 274 -> 146 144.34/144.26 275 -> 142 144.34/144.26 276 -> 208, 209 144.34/144.26 277 -> 142 144.34/144.26 278 -> 137 144.34/144.26 279 -> 137 144.34/144.26 280 -> 134 144.34/144.26 281 -> 206, 207 144.34/144.26 282 -> 134 144.34/144.26 283 -> 127 144.34/144.26 284 -> 203, 204 144.34/144.26 285 -> 127 144.34/144.26 286 -> 122 144.34/144.26 287 -> 122 144.34/144.26 288 -> 119 144.34/144.26 289 -> 119 144.34/144.26 290 -> 114 144.34/144.26 291 -> 200, 201 144.34/144.26 292 -> 114 144.34/144.26 293 -> 107 144.34/144.26 294 -> 107 144.34/144.26 295 -> 101 144.34/144.26 296 -> 198, 199 144.34/144.26 297 -> 101 144.34/144.26 298 -> 98 144.34/144.26 299 -> 195, 196 144.34/144.26 300 -> 98 144.34/144.26 301 -> 93 144.34/144.26 302 -> 93 144.34/144.26 303 -> 86 144.34/144.26 304 -> 341, 342 144.34/144.26 305 -> 192, 193 144.34/144.26 306 -> 86 144.34/144.26 307 -> 83 144.34/144.26 308 -> 83 144.34/144.26 309 -> 78 144.34/144.26 310 -> 78 144.34/144.26 311 -> 75 144.34/144.26 312 -> 190, 191 144.34/144.26 313 -> 75 144.34/144.26 314 -> 68 144.34/144.26 315 -> 188, 189 144.34/144.26 316 -> 68 144.34/144.26 317 -> 62 144.34/144.26 318 -> 62 144.34/144.26 319 -> 57 144.34/144.26 320 -> 184, 185 144.34/144.26 321 -> 57 144.34/144.26 322 -> 54 144.34/144.26 323 -> 54 144.34/144.26 324 -> 46 144.34/144.26 325 -> 182, 183 144.34/144.26 326 -> 46 144.34/144.26 327 -> 37 144.34/144.26 328 -> 37 144.34/144.26 329 -> 28 144.34/144.26 330 -> 28 144.34/144.26 331 -> 19 144.34/144.26 332 -> 179, 180 144.34/144.26 333 -> 19 144.34/144.26 334 -> 2 144.34/144.26 335 -> 176, 177 144.34/144.26 336 -> 2 144.34/144.26 337 -> 343 144.34/144.26 338 -> 343 144.34/144.26 339 -> 304 144.34/144.26 340 -> 174, 175 144.34/144.26 341 -> 304 144.34/144.26 342 -> 263 144.34/144.26 343 -> 338, 339 144.34/144.26 344 -> 171, 172 144.34/144.26 345 -> 263 144.34/144.26 346 -> 186 144.34/144.26 347 -> 186 144.34/144.26 348 -> 145 144.34/144.26 349 -> 145 144.34/144.26 350 -> 106 144.34/144.26 351 -> 169, 170 144.34/144.26 352 -> 106 144.34/144.26 353 -> 67 144.34/144.26 354 -> 67 144.34/144.26 355 -> 167, 168 144.34/144.26 356 -> 164, 165 144.34/144.26 357 -> 162, 163 144.34/144.26 358 -> 159, 160 144.34/144.26 359 -> 156, 157 144.34/144.26 360 -> 154, 155 144.34/144.26 Where: 144.34/144.26 0) f243#(x1, x2, x3) -> f242#(x1, x2, x3) 144.34/144.26 1) f242#(I0, I1, I2) -> f241#(2, 0, 0) 144.34/144.26 2) f35#(I3, I4, I5) -> f34#(I3, I4, I5) 144.34/144.26 3) f161#(I6, I7, I8) -> f160#(I6, I7, I8) 144.34/144.26 4) f163#(I9, I10, I11) -> f162#(I9, I10, I11) 144.34/144.26 5) f165#(I12, I13, I14) -> f164#(I12, I13, I14) 144.34/144.26 6) f167#(I15, I16, I17) -> f166#(I15, I16, I17) 144.34/144.26 7) f169#(I18, I19, I20) -> f168#(I18, I19, I20) 144.34/144.26 8) f171#(I21, I22, I23) -> f170#(I21, I22, I23) 144.34/144.26 9) f173#(I24, I25, I26) -> f172#(I24, I25, I26) 144.34/144.26 10) f175#(I27, I28, I29) -> f174#(I27, I28, I29) 144.34/144.26 11) f177#(I30, I31, I32) -> f176#(I30, I31, I32) 144.34/144.26 12) f179#(I33, I34, I35) -> f178#(I33, I34, I35) 144.34/144.26 13) f181#(I36, I37, I38) -> f180#(I36, I37, I38) 144.34/144.26 14) f183#(I39, I40, I41) -> f182#(I39, I40, I41) 144.34/144.26 15) f185#(I42, I43, I44) -> f184#(I42, I43, I44) 144.34/144.26 16) f187#(I45, I46, I47) -> f186#(I45, I46, I47) 144.34/144.26 17) f189#(I48, I49, I50) -> f188#(I48, I49, I50) 144.34/144.26 18) f191#(I51, I52, I53) -> f190#(I51, I52, I53) 144.34/144.26 19) f39#(I54, I55, I56) -> f38#(I54, I55, I56) 144.34/144.26 20) f193#(I57, I58, I59) -> f192#(I57, I58, I59) 144.34/144.26 21) f195#(I60, I61, I62) -> f194#(I60, I61, I62) 144.34/144.26 22) f197#(I63, I64, I65) -> f196#(I63, I64, I65) 144.34/144.26 23) f199#(I66, I67, I68) -> f198#(I66, I67, I68) 144.34/144.26 24) f201#(I69, I70, I71) -> f200#(I69, I70, I71) 144.34/144.26 25) f203#(I72, I73, I74) -> f202#(I72, I73, I74) 144.34/144.26 26) f205#(I75, I76, I77) -> f204#(I75, I76, I77) 144.34/144.26 27) f207#(I78, I79, I80) -> f206#(I78, I79, I80) 144.34/144.26 28) f43#(I81, I82, I83) -> f42#(I81, I82, I83) 144.34/144.26 29) f209#(I84, I85, I86) -> f208#(I84, I85, I86) 144.34/144.26 30) f211#(I87, I88, I89) -> f210#(I87, I88, I89) 144.34/144.26 31) f213#(I90, I91, I92) -> f212#(I90, I91, I92) 144.34/144.26 32) f215#(I93, I94, I95) -> f214#(I93, I94, I95) 144.34/144.26 33) f217#(I96, I97, I98) -> f216#(I96, I97, I98) 144.34/144.26 34) f219#(I99, I100, I101) -> f218#(I99, I100, I101) 144.34/144.26 35) f221#(I102, I103, I104) -> f220#(I102, I103, I104) 144.34/144.26 36) f223#(I105, I106, I107) -> f222#(I105, I106, I107) 144.34/144.26 37) f45#(I108, I109, I110) -> f44#(I108, I109, I110) 144.34/144.26 38) f225#(I111, I112, I113) -> f224#(I111, I112, I113) 144.34/144.26 39) f227#(I114, I115, I116) -> f226#(I114, I115, I116) 144.34/144.26 40) f229#(I117, I118, I119) -> f228#(I117, I118, I119) 144.34/144.26 41) f231#(I120, I121, I122) -> f230#(I120, I121, I122) 144.34/144.26 42) f233#(I123, I124, I125) -> f232#(I123, I124, I125) 144.34/144.26 43) f235#(I126, I127, I128) -> f234#(I126, I127, I128) 144.34/144.26 44) f237#(I129, I130, I131) -> f236#(I129, I130, I131) 144.34/144.26 45) f239#(I132, I133, I134) -> f238#(I132, I133, I134) 144.34/144.26 46) f47#(I135, I136, I137) -> f46#(I135, I136, I137) 144.34/144.26 47) f241#(I138, I139, I140) -> f240#(I138, I139, I140) 144.34/144.26 48) f240#(I141, I142, I143) -> f241#(I141, 1 + I142, I142 + I143) [1 + I142 <= 3] 144.34/144.26 49) f240#(I144, I145, I146) -> f239#(I144, 0, I146) [3 <= I145] 144.34/144.26 50) f238#(I147, I148, I149) -> f239#(I147, 1 + I148, I148 + I149) [I148 <= 3] 144.34/144.26 51) f238#(I150, I151, I152) -> f237#(I150, 0, I152) [4 <= I151] 144.34/144.26 52) f236#(I153, I154, I155) -> f237#(I153, 1 + I154, I154 + I155) [1 + I154 <= 3] 144.34/144.26 53) f236#(I156, I157, I158) -> f235#(I156, 0, I158) [3 <= I157] 144.34/144.26 54) f51#(I159, I160, I161) -> f50#(I159, I160, I161) 144.34/144.26 55) f234#(I162, I163, I164) -> f235#(I162, 1 + I163, I163 + I164) [I163 <= 3] 144.34/144.26 56) f234#(I165, I166, I167) -> f233#(I165, 1, I167) [4 <= I166] 144.34/144.26 57) f53#(I168, I169, I170) -> f52#(I168, I169, I170) 144.34/144.26 58) f232#(I171, I172, I173) -> f233#(I171, 1 + I172, I172 + I173) [1 + I172 <= 2] 144.34/144.26 59) f232#(I174, I175, I176) -> f231#(I174, 1, I176) [2 <= I175] 144.34/144.26 60) f230#(I177, I178, I179) -> f231#(I177, 1 + I178, I178 + I179) [I178 <= 2] 144.34/144.26 61) f230#(I180, I181, I182) -> f229#(I180, 1, I182) [3 <= I181] 144.34/144.26 62) f57#(I183, I184, I185) -> f56#(I183, I184, I185) 144.34/144.26 63) f228#(I186, I187, I188) -> f229#(I186, 1 + I187, I187 + I188) [1 + I187 <= 2] 144.34/144.26 64) f228#(I189, I190, I191) -> f227#(I189, 1, I191) [2 <= I190] 144.34/144.26 65) f226#(I192, I193, I194) -> f227#(I192, 1 + I193, I193 + I194) [I193 <= 2] 144.34/144.26 66) f226#(I195, I196, I197) -> f225#(I195, -3, I197) [3 <= I196] 144.34/144.26 67) f15#(I198, I199, I200) -> f13#(I198, I199, I200) 144.34/144.26 68) f59#(I201, I202, I203) -> f58#(I201, I202, I203) 144.34/144.26 69) f224#(I204, I205, I206) -> f225#(I204, 1 + I205, I205 + I206) [1 + I205 <= -2] 144.34/144.26 70) f224#(I207, I208, I209) -> f223#(I207, -3, I209) [-2 <= I208] 144.34/144.26 71) f222#(I210, I211, I212) -> f223#(I210, 1 + I211, I211 + I212) [I211 <= -2] 144.34/144.26 72) f222#(I213, I214, I215) -> f221#(I213, -3, I215) [-1 <= I214] 144.34/144.26 73) f220#(I216, I217, I218) -> f221#(I216, 1 + I217, I217 + I218) [1 + I217 <= -2] 144.34/144.26 74) f220#(I219, I220, I221) -> f219#(I219, -3, I221) [-2 <= I220] 144.34/144.26 75) f63#(I222, I223, I224) -> f62#(I222, I223, I224) 144.34/144.26 76) f218#(I225, I226, I227) -> f219#(I225, 1 + I226, I226 + I227) [I226 <= -2] 144.34/144.26 77) f218#(I228, I229, I230) -> f217#(I228, -4, I230) [-1 <= I229] 144.34/144.26 78) f67#(I231, I232, I233) -> f66#(I231, I232, I233) 144.34/144.26 79) f216#(I234, I235, I236) -> f217#(I234, 1 + I235, I235 + I236) [1 + I235 <= -1] 144.34/144.26 80) f216#(I237, I238, I239) -> f215#(I237, -4, I239) [-1 <= I238] 144.34/144.26 81) f214#(I240, I241, I242) -> f215#(I240, 1 + I241, I241 + I242) [I241 <= -1] 144.34/144.26 82) f214#(I243, I244, I245) -> f213#(I243, -4, I245) [0 <= I244] 144.34/144.26 83) f69#(I246, I247, I248) -> f68#(I246, I247, I248) 144.34/144.26 84) f212#(I249, I250, I251) -> f213#(I249, 1 + I250, I250 + I251) [1 + I250 <= -1] 144.34/144.26 85) f212#(I252, I253, I254) -> f211#(I252, -4, I254) [-1 <= I253] 144.34/144.26 86) f71#(I255, I256, I257) -> f70#(I255, I256, I257) 144.34/144.26 87) f210#(I258, I259, I260) -> f211#(I258, 1 + I259, I259 + I260) [I259 <= -1] 144.34/144.26 88) f210#(I261, I262, I263) -> f209#(I261, -5, I263) [0 <= I262] 144.34/144.26 89) f208#(I264, I265, I266) -> f209#(I264, 1 + I265, I265 + I266) [1 + I265 <= 0] 144.34/144.26 90) f208#(I267, I268, I269) -> f207#(I267, -5, I269) [0 <= I268] 144.34/144.26 91) f206#(I270, I271, I272) -> f207#(I270, 1 + I271, I271 + I272) [I271 <= 0] 144.34/144.26 92) f206#(I273, I274, I275) -> f205#(I273, -5, I275) [1 <= I274] 144.34/144.26 93) f75#(I276, I277, I278) -> f74#(I276, I277, I278) 144.34/144.26 94) f204#(I279, I280, I281) -> f205#(I279, 1 + I280, I280 + I281) [1 + I280 <= 0] 144.34/144.26 95) f204#(I282, I283, I284) -> f203#(I282, -5, I284) [0 <= I283] 144.34/144.26 96) f202#(I285, I286, I287) -> f203#(I285, 1 + I286, I286 + I287) [I286 <= 0] 144.34/144.26 97) f202#(I288, I289, I290) -> f201#(I288, -6, I290) [1 <= I289] 144.34/144.26 98) f77#(I291, I292, I293) -> f76#(I291, I292, I293) 144.34/144.26 99) f200#(I294, I295, I296) -> f201#(I294, 1 + I295, I295 + I296) [1 + I295 <= 4] 144.34/144.26 100) f200#(I297, I298, I299) -> f199#(I297, -6, I299) [4 <= I298] 144.34/144.26 101) f81#(I300, I301, I302) -> f80#(I300, I301, I302) 144.34/144.26 102) f198#(I303, I304, I305) -> f199#(I303, 1 + I304, I304 + I305) [I304 <= 4] 144.34/144.26 103) f198#(I306, I307, I308) -> f197#(I306, -6, I308) [5 <= I307] 144.34/144.26 104) f196#(I309, I310, I311) -> f197#(I309, 1 + I310, I310 + I311) [1 + I310 <= 4] 144.34/144.26 105) f196#(I312, I313, I314) -> f195#(I312, -6, I314) [4 <= I313] 144.34/144.26 106) f17#(I315, I316, I317) -> f16#(I315, I316, I317) 144.34/144.26 107) f85#(I318, I319, I320) -> f84#(I318, I319, I320) 144.34/144.26 108) f194#(I321, I322, I323) -> f195#(I321, 1 + I322, I322 + I323) [I322 <= 4] 144.34/144.26 109) f194#(I324, I325, I326) -> f193#(I324, 0, I326) [5 <= I325] 144.34/144.26 110) f192#(I327, I328, I329) -> f193#(I327, I327 + I328, I328 + I329) [1 + I328 <= 3] 144.34/144.26 111) f192#(I330, I331, I332) -> f191#(I330, 0, I332) [3 <= I331] 144.34/144.26 112) f190#(I333, I334, I335) -> f191#(I333, I333 + I334, I334 + I335) [I334 <= 3] 144.34/144.26 113) f190#(I336, I337, I338) -> f189#(I336, 0, I338) [4 <= I337] 144.34/144.26 114) f87#(I339, I340, I341) -> f86#(I339, I340, I341) 144.34/144.26 115) f188#(I342, I343, I344) -> f189#(I342, I342 + I343, I343 + I344) [1 + I343 <= 3] 144.34/144.26 116) f188#(I345, I346, I347) -> f187#(I345, 0, I347) [3 <= I346] 144.34/144.26 117) f186#(I348, I349, I350) -> f187#(I348, I348 + I349, I349 + I350) [I349 <= 3] 144.34/144.26 118) f186#(I351, I352, I353) -> f185#(I351, 1, I353) [4 <= I352] 144.34/144.26 119) f91#(I354, I355, I356) -> f90#(I354, I355, I356) 144.34/144.26 120) f184#(I357, I358, I359) -> f185#(I357, I357 + I358, I358 + I359) [1 + I358 <= 2] 144.34/144.26 121) f184#(I360, I361, I362) -> f183#(I360, 1, I362) [2 <= I361] 144.34/144.26 122) f93#(I363, I364, I365) -> f92#(I363, I364, I365) 144.34/144.26 123) f182#(I366, I367, I368) -> f183#(I366, I366 + I367, I367 + I368) [I367 <= 2] 144.34/144.26 124) f182#(I369, I370, I371) -> f181#(I369, 1, I371) [3 <= I370] 144.34/144.26 125) f180#(I372, I373, I374) -> f181#(I372, I372 + I373, I373 + I374) [1 + I373 <= 2] 144.34/144.26 126) f180#(I375, I376, I377) -> f179#(I375, 1, I377) [2 <= I376] 144.34/144.26 127) f95#(I378, I379, I380) -> f94#(I378, I379, I380) 144.34/144.26 128) f178#(I381, I382, I383) -> f179#(I381, I381 + I382, I382 + I383) [I382 <= 2] 144.34/144.26 129) f178#(I384, I385, I386) -> f177#(I384, -3, I386) [3 <= I385] 144.34/144.26 130) f176#(I387, I388, I389) -> f177#(I387, I387 + I388, I388 + I389) [1 + I388 <= -2] 144.34/144.26 131) f176#(I390, I391, I392) -> f175#(I390, -3, I392) [-2 <= I391] 144.34/144.26 132) f174#(I393, I394, I395) -> f175#(I393, I393 + I394, I394 + I395) [I394 <= -2] 144.34/144.26 133) f174#(I396, I397, I398) -> f173#(I396, -3, I398) [-1 <= I397] 144.34/144.26 134) f99#(I399, I400, I401) -> f98#(I399, I400, I401) 144.34/144.26 135) f172#(I402, I403, I404) -> f173#(I402, I402 + I403, I403 + I404) [1 + I403 <= -2] 144.34/144.26 136) f172#(I405, I406, I407) -> f171#(I405, -3, I407) [-2 <= I406] 144.34/144.26 137) f103#(I408, I409, I410) -> f102#(I408, I409, I410) 144.34/144.26 138) f170#(I411, I412, I413) -> f171#(I411, I411 + I412, I412 + I413) [I412 <= -2] 144.34/144.26 139) f170#(I414, I415, I416) -> f169#(I414, -4, I416) [-1 <= I415] 144.34/144.26 140) f168#(I417, I418, I419) -> f169#(I417, I417 + I418, I418 + I419) [1 + I418 <= -1] 144.34/144.26 141) f168#(I420, I421, I422) -> f167#(I420, -4, I422) [-1 <= I421] 144.34/144.26 142) f105#(I423, I424, I425) -> f104#(I423, I424, I425) 144.34/144.26 143) f166#(I426, I427, I428) -> f167#(I426, I426 + I427, I427 + I428) [I427 <= -1] 144.34/144.26 144) f166#(I429, I430, I431) -> f165#(I429, -4, I431) [0 <= I430] 144.34/144.26 145) f21#(I432, I433, I434) -> f20#(I432, I433, I434) 144.34/144.26 146) f109#(I435, I436, I437) -> f108#(I435, I436, I437) 144.34/144.26 147) f164#(I438, I439, I440) -> f165#(I438, I438 + I439, I439 + I440) [1 + I439 <= -1] 144.34/144.26 148) f164#(I441, I442, I443) -> f163#(I441, -4, I443) [-1 <= I442] 144.34/144.26 149) f162#(I444, I445, I446) -> f163#(I444, I444 + I445, I445 + I446) [I445 <= -1] 144.34/144.26 150) f162#(I447, I448, I449) -> f161#(I447, -5, I449) [0 <= I448] 144.34/144.26 151) f160#(I450, I451, I452) -> f161#(I450, I450 + I451, I451 + I452) [1 + I451 <= 0] 144.34/144.26 152) f160#(I453, I454, I455) -> f1#(I453, -5, I455) [0 <= I454] 144.34/144.26 153) f113#(I456, I457, I458) -> f112#(I456, I457, I458) 144.34/144.26 154) f2#(I459, I460, I461) -> f1#(I459, I459 + I460, I460 + I461) [I460 <= 0] 144.34/144.26 155) f2#(I462, I463, I464) -> f3#(I462, -5, I464) [1 <= I463] 144.34/144.26 156) f4#(I465, I466, I467) -> f3#(I465, I465 + I466, I466 + I467) [1 + I466 <= 0] 144.34/144.26 157) f4#(I468, I469, I470) -> f5#(I468, -5, I470) [0 <= I469] 144.34/144.26 158) f115#(I471, I472, I473) -> f114#(I471, I472, I473) 144.34/144.26 159) f6#(I474, I475, I476) -> f5#(I474, I474 + I475, I475 + I476) [I475 <= 0] 144.34/144.26 160) f6#(I477, I478, I479) -> f7#(I477, -6, I479) [1 <= I478] 144.34/144.26 161) f117#(I480, I481, I482) -> f116#(I480, I481, I482) 144.34/144.26 162) f8#(I483, I484, I485) -> f7#(I483, I483 + I484, I484 + I485) [1 + I484 <= 4] 144.34/144.26 163) f8#(I486, I487, I488) -> f9#(I486, -6, I488) [4 <= I487] 144.34/144.26 164) f10#(I489, I490, I491) -> f9#(I489, I489 + I490, I490 + I491) [I490 <= 4] 144.34/144.26 165) f10#(I492, I493, I494) -> f11#(I492, -6, I494) [5 <= I493] 144.34/144.26 166) f119#(I495, I496, I497) -> f118#(I495, I496, I497) 144.34/144.26 167) f12#(I498, I499, I500) -> f11#(I498, I498 + I499, I499 + I500) [1 + I499 <= 4] 144.34/144.26 168) f12#(I501, I502, I503) -> f18#(I501, -6, I503) [4 <= I502] 144.34/144.26 169) f19#(I504, I505, I506) -> f18#(I504, I504 + I505, I505 + I506) [I505 <= 4] 144.34/144.26 170) f19#(I507, I508, I509) -> f26#(I507, 5, I509) [5 <= I508] 144.34/144.26 171) f27#(I510, I511, I512) -> f26#(I510, -1 + I511, I511 + I512) [3 <= I511] 144.34/144.26 172) f27#(I513, I514, I515) -> f32#(I513, 5, I515) [I514 <= 2] 144.34/144.26 173) f123#(I516, I517, I518) -> f122#(I516, I517, I518) 144.34/144.26 174) f33#(I519, I520, I521) -> f32#(I519, -1 + I520, I520 + I521) [2 <= I520] 144.34/144.26 175) f33#(I522, I523, I524) -> f36#(I522, 5, I524) [1 + I523 <= 2] 144.34/144.26 176) f37#(I525, I526, I527) -> f36#(I525, -1 + I526, I526 + I527) [3 <= I526] 144.34/144.26 177) f37#(I528, I529, I530) -> f40#(I528, 5, I530) [I529 <= 2] 144.34/144.26 178) f127#(I531, I532, I533) -> f126#(I531, I532, I533) 144.34/144.26 179) f41#(I534, I535, I536) -> f40#(I534, -1 + I535, I535 + I536) [2 <= I535] 144.34/144.26 180) f41#(I537, I538, I539) -> f48#(I537, 6, I539) [1 + I538 <= 2] 144.34/144.26 181) f129#(I540, I541, I542) -> f128#(I540, I541, I542) 144.34/144.26 182) f49#(I543, I544, I545) -> f48#(I543, -1 + I544, I544 + I545) [2 <= I544] 144.34/144.26 183) f49#(I546, I547, I548) -> f54#(I546, 6, I548) [I547 <= 1] 144.34/144.26 184) f55#(I549, I550, I551) -> f54#(I549, -1 + I550, I550 + I551) [1 <= I550] 144.34/144.26 185) f55#(I552, I553, I554) -> f60#(I552, 6, I554) [1 + I553 <= 1] 144.34/144.26 186) f23#(I555, I556, I557) -> f22#(I555, I556, I557) 144.34/144.26 187) f133#(I558, I559, I560) -> f132#(I558, I559, I560) 144.34/144.26 188) f61#(I561, I562, I563) -> f60#(I561, -1 + I562, I562 + I563) [2 <= I562] 144.34/144.26 189) f61#(I564, I565, I566) -> f64#(I564, 6, I566) [I565 <= 1] 144.34/144.26 190) f65#(I567, I568, I569) -> f64#(I567, -1 + I568, I568 + I569) [1 <= I568] 144.34/144.26 191) f65#(I570, I571, I572) -> f72#(I570, 7, I572) [1 + I571 <= 1] 144.34/144.26 192) f73#(I573, I574, I575) -> f72#(I573, -1 + I574, I574 + I575) [1 <= I574] 144.34/144.26 193) f73#(I576, I577, I578) -> f78#(I576, 7, I578) [I577 <= 0] 144.34/144.26 194) f137#(I579, I580, I581) -> f136#(I579, I580, I581) 144.34/144.26 195) f79#(I582, I583, I584) -> f78#(I582, -1 + I583, I583 + I584) [0 <= I583] 144.34/144.26 196) f79#(I585, I586, I587) -> f82#(I585, 7, I587) [1 + I586 <= 0] 144.34/144.26 197) f139#(I588, I589, I590) -> f138#(I588, I589, I590) 144.34/144.26 198) f83#(I591, I592, I593) -> f82#(I591, -1 + I592, I592 + I593) [1 <= I592] 144.34/144.26 199) f83#(I594, I595, I596) -> f88#(I594, 7, I596) [I595 <= 0] 144.34/144.26 200) f89#(I597, I598, I599) -> f88#(I597, -1 + I598, I598 + I599) [0 <= I598] 144.34/144.26 201) f89#(I600, I601, I602) -> f96#(I600, 8, I602) [1 + I601 <= 0] 144.34/144.26 202) f141#(I603, I604, I605) -> f140#(I603, I604, I605) 144.34/144.26 203) f97#(I606, I607, I608) -> f96#(I606, -1 + I607, I607 + I608) [0 <= I607] 144.34/144.26 204) f97#(I609, I610, I611) -> f100#(I609, 8, I611) [I610 <= -1] 144.34/144.26 205) f145#(I612, I613, I614) -> f144#(I612, I613, I614) 144.34/144.26 206) f101#(I615, I616, I617) -> f100#(I615, -1 + I616, I616 + I617) [-1 <= I616] 144.34/144.26 207) f101#(I618, I619, I620) -> f106#(I618, 8, I620) [1 + I619 <= -1] 144.34/144.26 208) f107#(I621, I622, I623) -> f106#(I621, -1 + I622, I622 + I623) [0 <= I622] 144.34/144.26 209) f107#(I624, I625, I626) -> f110#(I624, 8, I626) [I625 <= -1] 144.34/144.26 210) f111#(I627, I628, I629) -> f110#(I627, -1 + I628, I628 + I629) [-1 <= I628] 144.34/144.26 211) f111#(I630, I631, I632) -> f120#(I630, 9, I632) [1 + I631 <= -1] 144.34/144.26 212) f147#(I633, I634, I635) -> f146#(I633, I634, I635) 144.34/144.26 213) f121#(I636, I637, I638) -> f120#(I636, -1 + I637, I637 + I638) [-1 <= I637] 144.34/144.26 214) f121#(I639, I640, I641) -> f124#(I639, 9, I641) [I640 <= -2] 144.34/144.26 215) f125#(I642, I643, I644) -> f124#(I642, -1 + I643, I643 + I644) [-2 <= I643] 144.34/144.26 216) f125#(I645, I646, I647) -> f130#(I645, 9, I647) [1 + I646 <= -2] 144.34/144.26 217) f151#(I648, I649, I650) -> f150#(I648, I649, I650) 144.34/144.26 218) f131#(I651, I652, I653) -> f130#(I651, -1 + I652, I652 + I653) [-1 <= I652] 144.34/144.26 219) f131#(I654, I655, I656) -> f134#(I654, 9, I656) [I655 <= -2] 144.34/144.26 220) f135#(I657, I658, I659) -> f134#(I657, -1 + I658, I658 + I659) [-2 <= I658] 144.34/144.26 221) f135#(I660, I661, I662) -> f142#(I660, 0, I662) [1 + I661 <= -2] 144.34/144.26 222) f155#(I663, I664, I665) -> f154#(I663, I664, I665) 144.34/144.26 223) f143#(I666, I667, I668) -> f142#(I666, -1 + I667, I667 + I668) [-2 <= I667] 144.34/144.26 224) f143#(I669, I670, I671) -> f148#(I669, 0, I671) [I670 <= -3] 144.34/144.26 225) f157#(I672, I673, I674) -> f156#(I672, I673, I674) 144.34/144.26 226) f149#(I675, I676, I677) -> f148#(I675, -1 + I676, I676 + I677) [-3 <= I676] 144.34/144.26 227) f149#(I678, I679, I680) -> f152#(I678, 0, I680) [1 + I679 <= -3] 144.34/144.26 228) f153#(I681, I682, I683) -> f152#(I681, -1 + I682, I682 + I683) [-2 <= I682] 144.34/144.26 229) f153#(I684, I685, I686) -> f158#(I684, 0, I686) [I685 <= -3] 144.34/144.26 230) f159#(I687, I688, I689) -> f158#(I687, -1 + I688, I688 + I689) [-3 <= I688] 144.34/144.26 231) f159#(I690, I691, I692) -> f157#(I690, -1, I692) [1 + I691 <= -3] 144.34/144.26 232) f158#(I693, I694, I695) -> f159#(I693, I694, I695) 144.34/144.26 233) f156#(I696, I697, I698) -> f157#(I696, -1 + I697, I697 + I698) [-4 <= I697] 144.34/144.26 234) f156#(I699, I700, I701) -> f155#(I699, -1, I701) [I700 <= -5] 144.34/144.26 235) f154#(I702, I703, I704) -> f155#(I702, -1 + I703, I703 + I704) [-5 <= I703] 144.34/144.26 236) f154#(I705, I706, I707) -> f151#(I705, -1, I707) [1 + I706 <= -5] 144.34/144.26 237) f152#(I708, I709, I710) -> f153#(I708, I709, I710) 144.34/144.26 238) f150#(I711, I712, I713) -> f151#(I711, -1 + I712, I712 + I713) [-4 <= I712] 144.34/144.26 239) f150#(I714, I715, I716) -> f147#(I714, -1, I716) [I715 <= -5] 144.34/144.26 240) f148#(I717, I718, I719) -> f149#(I717, I718, I719) 144.34/144.26 241) f146#(I720, I721, I722) -> f147#(I720, -1 + I721, I721 + I722) [-5 <= I721] 144.34/144.26 242) f146#(I723, I724, I725) -> f145#(I723, -2, I725) [1 + I724 <= -5] 144.34/144.26 243) f144#(I726, I727, I728) -> f145#(I726, -1 + I727, I727 + I728) [-6 <= I727] 144.34/144.26 244) f144#(I729, I730, I731) -> f141#(I729, -2, I731) [I730 <= -7] 144.34/144.26 245) f142#(I732, I733, I734) -> f143#(I732, I733, I734) 144.34/144.26 246) f140#(I735, I736, I737) -> f141#(I735, -1 + I736, I736 + I737) [-7 <= I736] 144.34/144.26 247) f140#(I738, I739, I740) -> f139#(I738, -2, I740) [1 + I739 <= -7] 144.34/144.26 248) f138#(I741, I742, I743) -> f139#(I741, -1 + I742, I742 + I743) [-6 <= I742] 144.34/144.26 249) f138#(I744, I745, I746) -> f137#(I744, -2, I746) [I745 <= -7] 144.34/144.26 250) f136#(I747, I748, I749) -> f137#(I747, -1 + I748, I748 + I749) [-7 <= I748] 144.34/144.26 251) f136#(I750, I751, I752) -> f133#(I750, 16, I752) [1 + I751 <= -7] 144.34/144.26 252) f134#(I753, I754, I755) -> f135#(I753, I754, I755) 144.34/144.26 253) f132#(I756, I757, I758) -> f133#(I756, -1 + I757, I757 + I758) [-7 <= I757] 144.34/144.26 254) f132#(I759, I760, I761) -> f129#(I759, 16, I761) [I760 <= -8] 144.34/144.26 255) f130#(I762, I763, I764) -> f131#(I762, I763, I764) 144.34/144.26 256) f128#(I765, I766, I767) -> f129#(I765, -1 + I766, I766 + I767) [-8 <= I766] 144.34/144.26 257) f128#(I768, I769, I770) -> f127#(I768, 16, I770) [1 + I769 <= -8] 144.34/144.26 258) f126#(I771, I772, I773) -> f127#(I771, -1 + I772, I772 + I773) [-7 <= I772] 144.34/144.26 259) f126#(I774, I775, I776) -> f123#(I774, 16, I776) [I775 <= -8] 144.34/144.26 260) f124#(I777, I778, I779) -> f125#(I777, I778, I779) 144.34/144.26 261) f122#(I780, I781, I782) -> f123#(I780, -1 + I781, I781 + I782) [-8 <= I781] 144.34/144.26 262) f122#(I783, I784, I785) -> f119#(I783, 5, I785) [1 + I784 <= -8] 144.34/144.26 263) f25#(I786, I787, I788) -> f24#(I786, I787, I788) 144.34/144.26 264) f120#(I789, I790, I791) -> f121#(I789, I790, I791) 144.34/144.26 265) f118#(I792, I793, I794) -> f119#(I792, -1 * I792 + I793, I793 + I794) [3 <= I793] 144.34/144.26 266) f118#(I795, I796, I797) -> f117#(I795, 5, I797) [I796 <= 2] 144.34/144.26 267) f116#(I798, I799, I800) -> f117#(I798, -1 * I798 + I799, I799 + I800) [2 <= I799] 144.34/144.26 268) f116#(I801, I802, I803) -> f115#(I801, 5, I803) [1 + I802 <= 2] 144.34/144.26 269) f114#(I804, I805, I806) -> f115#(I804, -1 * I804 + I805, I805 + I806) [3 <= I805] 144.34/144.26 270) f114#(I807, I808, I809) -> f113#(I807, 5, I809) [I808 <= 2] 144.34/144.26 271) f112#(I810, I811, I812) -> f113#(I810, -1 * I810 + I811, I811 + I812) [2 <= I811] 144.34/144.26 272) f112#(I813, I814, I815) -> f109#(I813, 6, I815) [1 + I814 <= 2] 144.34/144.26 273) f110#(I816, I817, I818) -> f111#(I816, I817, I818) 144.34/144.26 274) f108#(I819, I820, I821) -> f109#(I819, -1 * I819 + I820, I820 + I821) [2 <= I820] 144.34/144.26 275) f108#(I822, I823, I824) -> f105#(I822, 6, I824) [I823 <= 1] 144.34/144.26 276) f106#(I825, I826, I827) -> f107#(I825, I826, I827) 144.34/144.26 277) f104#(I828, I829, I830) -> f105#(I828, -1 * I828 + I829, I829 + I830) [1 <= I829] 144.34/144.26 278) f104#(I831, I832, I833) -> f103#(I831, 6, I833) [1 + I832 <= 1] 144.34/144.26 279) f102#(I834, I835, I836) -> f103#(I834, -1 * I834 + I835, I835 + I836) [2 <= I835] 144.34/144.26 280) f102#(I837, I838, I839) -> f99#(I837, 6, I839) [I838 <= 1] 144.34/144.26 281) f100#(I840, I841, I842) -> f101#(I840, I841, I842) 144.34/144.26 282) f98#(I843, I844, I845) -> f99#(I843, -1 * I843 + I844, I844 + I845) [1 <= I844] 144.34/144.26 283) f98#(I846, I847, I848) -> f95#(I846, 7, I848) [1 + I847 <= 1] 144.34/144.26 284) f96#(I849, I850, I851) -> f97#(I849, I850, I851) 144.34/144.26 285) f94#(I852, I853, I854) -> f95#(I852, -1 * I852 + I853, I853 + I854) [1 <= I853] 144.34/144.26 286) f94#(I855, I856, I857) -> f93#(I855, 7, I857) [I856 <= 0] 144.34/144.26 287) f92#(I858, I859, I860) -> f93#(I858, -1 * I858 + I859, I859 + I860) [0 <= I859] 144.34/144.26 288) f92#(I861, I862, I863) -> f91#(I861, 7, I863) [1 + I862 <= 0] 144.34/144.26 289) f90#(I864, I865, I866) -> f91#(I864, -1 * I864 + I865, I865 + I866) [1 <= I865] 144.34/144.26 290) f90#(I867, I868, I869) -> f87#(I867, 7, I869) [I868 <= 0] 144.34/144.26 291) f88#(I870, I871, I872) -> f89#(I870, I871, I872) 144.34/144.26 292) f86#(I873, I874, I875) -> f87#(I873, -1 * I873 + I874, I874 + I875) [0 <= I874] 144.34/144.26 293) f86#(I876, I877, I878) -> f85#(I876, 8, I878) [1 + I877 <= 0] 144.34/144.26 294) f84#(I879, I880, I881) -> f85#(I879, -1 * I879 + I880, I880 + I881) [0 <= I880] 144.34/144.26 295) f84#(I882, I883, I884) -> f81#(I882, 8, I884) [I883 <= -1] 144.34/144.26 296) f82#(I885, I886, I887) -> f83#(I885, I886, I887) 144.34/144.26 297) f80#(I888, I889, I890) -> f81#(I888, -1 * I888 + I889, I889 + I890) [-1 <= I889] 144.34/144.26 298) f80#(I891, I892, I893) -> f77#(I891, 8, I893) [1 + I892 <= -1] 144.34/144.26 299) f78#(I894, I895, I896) -> f79#(I894, I895, I896) 144.34/144.26 300) f76#(I897, I898, I899) -> f77#(I897, -1 * I897 + I898, I898 + I899) [0 <= I898] 144.34/144.26 301) f76#(I900, I901, I902) -> f75#(I900, 8, I902) [I901 <= -1] 144.34/144.26 302) f74#(I903, I904, I905) -> f75#(I903, -1 * I903 + I904, I904 + I905) [-1 <= I904] 144.34/144.26 303) f74#(I906, I907, I908) -> f71#(I906, 9, I908) [1 + I907 <= -1] 144.34/144.26 304) f31#(I909, I910, I911) -> f30#(I909, I910, I911) 144.34/144.26 305) f72#(I912, I913, I914) -> f73#(I912, I913, I914) 144.34/144.26 306) f70#(I915, I916, I917) -> f71#(I915, -1 * I915 + I916, I916 + I917) [-1 <= I916] 144.34/144.26 307) f70#(I918, I919, I920) -> f69#(I918, 9, I920) [I919 <= -2] 144.34/144.26 308) f68#(I921, I922, I923) -> f69#(I921, -1 * I921 + I922, I922 + I923) [-2 <= I922] 144.34/144.26 309) f68#(I924, I925, I926) -> f67#(I924, 9, I926) [1 + I925 <= -2] 144.34/144.26 310) f66#(I927, I928, I929) -> f67#(I927, -1 * I927 + I928, I928 + I929) [-1 <= I928] 144.34/144.26 311) f66#(I930, I931, I932) -> f63#(I930, 9, I932) [I931 <= -2] 144.34/144.26 312) f64#(I933, I934, I935) -> f65#(I933, I934, I935) 144.34/144.26 313) f62#(I936, I937, I938) -> f63#(I936, -1 * I936 + I937, I937 + I938) [-2 <= I937] 144.34/144.26 314) f62#(I939, I940, I941) -> f59#(I939, 0, I941) [1 + I940 <= -2] 144.34/144.26 315) f60#(I942, I943, I944) -> f61#(I942, I943, I944) 144.34/144.26 316) f58#(I945, I946, I947) -> f59#(I945, -1 * I945 + I946, I946 + I947) [-2 <= I946] 144.34/144.26 317) f58#(I948, I949, I950) -> f57#(I948, 0, I950) [I949 <= -3] 144.34/144.26 318) f56#(I951, I952, I953) -> f57#(I951, -1 * I951 + I952, I952 + I953) [-3 <= I952] 144.34/144.26 319) f56#(I954, I955, I956) -> f53#(I954, 0, I956) [1 + I955 <= -3] 144.34/144.26 320) f54#(I957, I958, I959) -> f55#(I957, I958, I959) 144.34/144.26 321) f52#(I960, I961, I962) -> f53#(I960, -1 * I960 + I961, I961 + I962) [-2 <= I961] 144.34/144.26 322) f52#(I963, I964, I965) -> f51#(I963, 0, I965) [I964 <= -3] 144.34/144.26 323) f50#(I966, I967, I968) -> f51#(I966, -1 * I966 + I967, I967 + I968) [-3 <= I967] 144.34/144.26 324) f50#(I969, I970, I971) -> f47#(I969, -1, I971) [1 + I970 <= -3] 144.34/144.26 325) f48#(I972, I973, I974) -> f49#(I972, I973, I974) 144.34/144.26 326) f46#(I975, I976, I977) -> f47#(I975, -1 * I975 + I976, I976 + I977) [-4 <= I976] 144.34/144.26 327) f46#(I978, I979, I980) -> f45#(I978, -1, I980) [I979 <= -5] 144.34/144.26 328) f44#(I981, I982, I983) -> f45#(I981, -1 * I981 + I982, I982 + I983) [-5 <= I982] 144.34/144.26 329) f44#(I984, I985, I986) -> f43#(I984, -1, I986) [1 + I985 <= -5] 144.34/144.26 330) f42#(I987, I988, I989) -> f43#(I987, -1 * I987 + I988, I988 + I989) [-4 <= I988] 144.34/144.26 331) f42#(I990, I991, I992) -> f39#(I990, -1, I992) [I991 <= -5] 144.34/144.26 332) f40#(I993, I994, I995) -> f41#(I993, I994, I995) 144.34/144.26 333) f38#(I996, I997, I998) -> f39#(I996, -1 * I996 + I997, I997 + I998) [-5 <= I997] 144.34/144.26 334) f38#(I999, I1000, I1001) -> f35#(I999, -2, I1001) [1 + I1000 <= -5] 144.34/144.26 335) f36#(I1002, I1003, I1004) -> f37#(I1002, I1003, I1004) 144.34/144.26 336) f34#(I1005, I1006, I1007) -> f35#(I1005, -1 * I1005 + I1006, I1006 + I1007) [-6 <= I1006] 144.34/144.26 337) f34#(I1008, I1009, I1010) -> f28#(I1008, -2, I1010) [I1009 <= -7] 144.34/144.26 338) f29#(I1011, I1012, I1013) -> f28#(I1011, -1 * I1011 + I1012, I1012 + I1013) [-7 <= I1012] 144.34/144.26 339) f29#(I1014, I1015, I1016) -> f31#(I1014, -2, I1016) [1 + I1015 <= -7] 144.34/144.26 340) f32#(I1017, I1018, I1019) -> f33#(I1017, I1018, I1019) 144.34/144.26 341) f30#(I1020, I1021, I1022) -> f31#(I1020, -1 * I1020 + I1021, I1021 + I1022) [-6 <= I1021] 144.34/144.26 342) f30#(I1023, I1024, I1025) -> f25#(I1023, -2, I1025) [I1024 <= -7] 144.34/144.26 343) f28#(I1026, I1027, I1028) -> f29#(I1026, I1027, I1028) 144.34/144.26 344) f26#(I1029, I1030, I1031) -> f27#(I1029, I1030, I1031) 144.34/144.26 345) f24#(I1032, I1033, I1034) -> f25#(I1032, -1 * I1032 + I1033, I1033 + I1034) [-7 <= I1033] 144.34/144.26 346) f24#(I1035, I1036, I1037) -> f23#(I1035, 16, I1037) [1 + I1036 <= -7] 144.34/144.26 347) f22#(I1038, I1039, I1040) -> f23#(I1038, -1 * I1038 + I1039, I1039 + I1040) [-7 <= I1039] 144.34/144.26 348) f22#(I1041, I1042, I1043) -> f21#(I1041, 16, I1043) [I1042 <= -8] 144.34/144.26 349) f20#(I1044, I1045, I1046) -> f21#(I1044, -1 * I1044 + I1045, I1045 + I1046) [-8 <= I1045] 144.34/144.26 350) f20#(I1047, I1048, I1049) -> f17#(I1047, 16, I1049) [1 + I1048 <= -8] 144.34/144.26 351) f18#(I1050, I1051, I1052) -> f19#(I1050, I1051, I1052) 144.34/144.26 352) f16#(I1053, I1054, I1055) -> f17#(I1053, -1 * I1053 + I1054, I1054 + I1055) [-7 <= I1054] 144.34/144.26 353) f16#(I1056, I1057, I1058) -> f15#(I1056, 16, I1058) [I1057 <= -8] 144.34/144.26 354) f13#(I1059, I1060, I1061) -> f15#(I1059, -1 * I1059 + I1060, I1060 + I1061) [-8 <= I1060] 144.34/144.26 355) f11#(I1065, I1066, I1067) -> f12#(I1065, I1066, I1067) 144.34/144.26 356) f9#(I1068, I1069, I1070) -> f10#(I1068, I1069, I1070) 144.34/144.26 357) f7#(I1071, I1072, I1073) -> f8#(I1071, I1072, I1073) 144.34/144.26 358) f5#(I1074, I1075, I1076) -> f6#(I1074, I1075, I1076) 144.34/144.26 359) f3#(I1077, I1078, I1079) -> f4#(I1077, I1078, I1079) 144.34/144.26 360) f1#(I1080, I1081, I1082) -> f2#(I1080, I1081, I1082) 144.34/144.26 144.34/144.26 We have the following SCCs. 144.34/144.26 { 47, 48 } 144.34/144.26 { 45, 50 } 144.34/144.26 { 44, 52 } 144.34/144.26 { 43, 55 } 144.34/144.26 { 42, 58 } 144.34/144.26 { 41, 60 } 144.34/144.26 { 40, 63 } 144.34/144.26 { 39, 65 } 144.34/144.26 { 38, 69 } 144.34/144.26 { 36, 71 } 144.34/144.26 { 35, 73 } 144.34/144.26 { 34, 76 } 144.34/144.26 { 33, 79 } 144.34/144.26 { 32, 81 } 144.34/144.26 { 31, 84 } 144.34/144.26 { 30, 87 } 144.34/144.26 { 29, 89 } 144.34/144.26 { 27, 91 } 144.34/144.26 { 26, 94 } 144.34/144.26 { 25, 96 } 144.34/144.26 { 24, 99 } 144.34/144.26 { 23, 102 } 144.34/144.26 { 22, 104 } 144.34/144.26 { 21, 108 } 144.34/144.26 { 20, 110 } 144.34/144.26 { 18, 112 } 144.34/144.26 { 17, 115 } 144.34/144.26 { 16, 117 } 144.34/144.26 { 15, 120 } 144.34/144.26 { 14, 123 } 144.34/144.26 { 13, 125 } 144.34/144.26 { 12, 128 } 144.34/144.26 { 11, 130 } 144.34/144.26 { 10, 132 } 144.34/144.26 { 9, 135 } 144.34/144.26 { 8, 138 } 144.34/144.26 { 7, 140 } 144.34/144.26 { 6, 143 } 144.34/144.26 { 5, 147 } 144.34/144.26 { 4, 149 } 144.34/144.26 { 3, 151 } 144.34/144.26 { 154, 360 } 144.34/144.26 { 156, 359 } 144.34/144.26 { 159, 358 } 144.34/144.26 { 162, 357 } 144.34/144.26 { 164, 356 } 144.34/144.26 { 167, 355 } 144.34/144.26 { 169, 351 } 144.34/144.26 { 171, 344 } 144.34/144.26 { 174, 340 } 144.34/144.26 { 176, 335 } 144.34/144.26 { 179, 332 } 144.34/144.26 { 182, 325 } 144.34/144.26 { 184, 320 } 144.34/144.26 { 188, 315 } 144.34/144.26 { 190, 312 } 144.34/144.26 { 192, 305 } 144.34/144.26 { 195, 299 } 144.34/144.26 { 198, 296 } 144.34/144.26 { 200, 291 } 144.34/144.26 { 203, 284 } 144.34/144.26 { 206, 281 } 144.34/144.26 { 208, 276 } 144.34/144.26 { 210, 273 } 144.34/144.26 { 213, 264 } 144.34/144.26 { 215, 260 } 144.34/144.26 { 218, 255 } 144.34/144.26 { 220, 252 } 144.34/144.26 { 223, 245 } 144.34/144.26 { 226, 240 } 144.34/144.26 { 228, 237 } 144.34/144.26 { 230, 232 } 144.34/144.26 { 225, 233 } 144.34/144.26 { 222, 235 } 144.34/144.26 { 217, 238 } 144.34/144.26 { 212, 241 } 144.34/144.26 { 205, 243 } 144.34/144.26 { 202, 246 } 144.34/144.26 { 197, 248 } 144.34/144.26 { 194, 250 } 144.34/144.26 { 187, 253 } 144.34/144.26 { 181, 256 } 144.34/144.26 { 178, 258 } 144.34/144.26 { 173, 261 } 144.34/144.26 { 166, 265 } 144.34/144.26 { 161, 267 } 144.34/144.26 { 158, 269 } 144.34/144.26 { 153, 271 } 144.34/144.26 { 146, 274 } 144.34/144.26 { 142, 277 } 144.34/144.26 { 137, 279 } 144.34/144.26 { 134, 282 } 144.34/144.26 { 127, 285 } 144.34/144.26 { 122, 287 } 144.34/144.26 { 119, 289 } 144.34/144.26 { 114, 292 } 144.34/144.26 { 107, 294 } 144.34/144.26 { 101, 297 } 144.34/144.26 { 98, 300 } 144.34/144.26 { 93, 302 } 144.34/144.26 { 86, 306 } 144.34/144.26 { 83, 308 } 144.34/144.26 { 78, 310 } 144.34/144.26 { 75, 313 } 144.34/144.26 { 68, 316 } 144.34/144.26 { 62, 318 } 144.34/144.26 { 57, 321 } 144.34/144.26 { 54, 323 } 144.34/144.26 { 46, 326 } 144.34/144.26 { 37, 328 } 144.34/144.26 { 28, 330 } 144.34/144.26 { 19, 333 } 144.34/144.26 { 2, 336 } 144.34/144.26 { 338, 343 } 144.34/144.26 { 304, 341 } 144.34/144.26 { 263, 345 } 144.34/144.26 { 186, 347 } 144.34/144.26 { 145, 349 } 144.34/144.26 { 106, 352 } 144.34/144.26 { 67, 354 } 144.34/144.26 144.34/144.26 DP problem for innermost termination. 144.34/144.26 P = 144.34/144.26 f15#(I198, I199, I200) -> f13#(I198, I199, I200) 144.34/144.26 f13#(I1059, I1060, I1061) -> f15#(I1059, -1 * I1059 + I1060, I1060 + I1061) [-8 <= I1060] 144.34/144.26 R = 144.34/144.26 f243(x1, x2, x3) -> f242(x1, x2, x3) 144.34/144.26 f242(I0, I1, I2) -> f241(2, 0, 0) 144.34/144.26 f35(I3, I4, I5) -> f34(I3, I4, I5) 144.34/144.26 f161(I6, I7, I8) -> f160(I6, I7, I8) 144.34/144.26 f163(I9, I10, I11) -> f162(I9, I10, I11) 144.34/144.26 f165(I12, I13, I14) -> f164(I12, I13, I14) 144.34/144.26 f167(I15, I16, I17) -> f166(I15, I16, I17) 144.34/144.26 f169(I18, I19, I20) -> f168(I18, I19, I20) 144.34/144.26 f171(I21, I22, I23) -> f170(I21, I22, I23) 144.34/144.26 f173(I24, I25, I26) -> f172(I24, I25, I26) 144.34/144.26 f175(I27, I28, I29) -> f174(I27, I28, I29) 144.34/144.26 f177(I30, I31, I32) -> f176(I30, I31, I32) 144.34/144.26 f179(I33, I34, I35) -> f178(I33, I34, I35) 144.34/144.26 f181(I36, I37, I38) -> f180(I36, I37, I38) 144.34/144.26 f183(I39, I40, I41) -> f182(I39, I40, I41) 144.34/144.26 f185(I42, I43, I44) -> f184(I42, I43, I44) 144.34/144.26 f187(I45, I46, I47) -> f186(I45, I46, I47) 144.34/144.26 f189(I48, I49, I50) -> f188(I48, I49, I50) 144.34/144.26 f191(I51, I52, I53) -> f190(I51, I52, I53) 144.34/144.26 f39(I54, I55, I56) -> f38(I54, I55, I56) 144.34/144.26 f193(I57, I58, I59) -> f192(I57, I58, I59) 144.34/144.26 f195(I60, I61, I62) -> f194(I60, I61, I62) 144.34/144.26 f197(I63, I64, I65) -> f196(I63, I64, I65) 144.34/144.26 f199(I66, I67, I68) -> f198(I66, I67, I68) 144.34/144.26 f201(I69, I70, I71) -> f200(I69, I70, I71) 144.34/144.26 f203(I72, I73, I74) -> f202(I72, I73, I74) 144.34/144.26 f205(I75, I76, I77) -> f204(I75, I76, I77) 144.34/144.26 f207(I78, I79, I80) -> f206(I78, I79, I80) 144.34/144.26 f43(I81, I82, I83) -> f42(I81, I82, I83) 144.34/144.26 f209(I84, I85, I86) -> f208(I84, I85, I86) 144.34/144.26 f211(I87, I88, I89) -> f210(I87, I88, I89) 144.34/144.26 f213(I90, I91, I92) -> f212(I90, I91, I92) 144.34/144.26 f215(I93, I94, I95) -> f214(I93, I94, I95) 144.34/144.26 f217(I96, I97, I98) -> f216(I96, I97, I98) 144.34/144.26 f219(I99, I100, I101) -> f218(I99, I100, I101) 144.34/144.26 f221(I102, I103, I104) -> f220(I102, I103, I104) 144.34/144.26 f223(I105, I106, I107) -> f222(I105, I106, I107) 144.34/144.26 f45(I108, I109, I110) -> f44(I108, I109, I110) 144.34/144.26 f225(I111, I112, I113) -> f224(I111, I112, I113) 144.34/144.26 f227(I114, I115, I116) -> f226(I114, I115, I116) 144.34/144.26 f229(I117, I118, I119) -> f228(I117, I118, I119) 144.34/144.26 f231(I120, I121, I122) -> f230(I120, I121, I122) 144.34/144.26 f233(I123, I124, I125) -> f232(I123, I124, I125) 144.34/144.26 f235(I126, I127, I128) -> f234(I126, I127, I128) 144.34/144.26 f237(I129, I130, I131) -> f236(I129, I130, I131) 144.34/144.26 f239(I132, I133, I134) -> f238(I132, I133, I134) 144.34/144.26 f47(I135, I136, I137) -> f46(I135, I136, I137) 144.34/144.26 f241(I138, I139, I140) -> f240(I138, I139, I140) 144.34/144.26 f240(I141, I142, I143) -> f241(I141, 1 + I142, I142 + I143) [1 + I142 <= 3] 144.34/144.26 f240(I144, I145, I146) -> f239(I144, 0, I146) [3 <= I145] 144.34/144.26 f238(I147, I148, I149) -> f239(I147, 1 + I148, I148 + I149) [I148 <= 3] 144.34/144.26 f238(I150, I151, I152) -> f237(I150, 0, I152) [4 <= I151] 144.34/144.26 f236(I153, I154, I155) -> f237(I153, 1 + I154, I154 + I155) [1 + I154 <= 3] 144.34/144.26 f236(I156, I157, I158) -> f235(I156, 0, I158) [3 <= I157] 144.34/144.26 f51(I159, I160, I161) -> f50(I159, I160, I161) 144.34/144.26 f234(I162, I163, I164) -> f235(I162, 1 + I163, I163 + I164) [I163 <= 3] 144.34/144.26 f234(I165, I166, I167) -> f233(I165, 1, I167) [4 <= I166] 144.34/144.26 f53(I168, I169, I170) -> f52(I168, I169, I170) 144.34/144.26 f232(I171, I172, I173) -> f233(I171, 1 + I172, I172 + I173) [1 + I172 <= 2] 144.34/144.26 f232(I174, I175, I176) -> f231(I174, 1, I176) [2 <= I175] 144.34/144.26 f230(I177, I178, I179) -> f231(I177, 1 + I178, I178 + I179) [I178 <= 2] 144.34/144.26 f230(I180, I181, I182) -> f229(I180, 1, I182) [3 <= I181] 144.34/144.26 f57(I183, I184, I185) -> f56(I183, I184, I185) 144.34/144.26 f228(I186, I187, I188) -> f229(I186, 1 + I187, I187 + I188) [1 + I187 <= 2] 144.34/144.26 f228(I189, I190, I191) -> f227(I189, 1, I191) [2 <= I190] 144.34/144.26 f226(I192, I193, I194) -> f227(I192, 1 + I193, I193 + I194) [I193 <= 2] 144.34/144.26 f226(I195, I196, I197) -> f225(I195, -3, I197) [3 <= I196] 144.34/144.26 f15(I198, I199, I200) -> f13(I198, I199, I200) 144.34/144.26 f59(I201, I202, I203) -> f58(I201, I202, I203) 144.34/144.26 f224(I204, I205, I206) -> f225(I204, 1 + I205, I205 + I206) [1 + I205 <= -2] 144.34/144.26 f224(I207, I208, I209) -> f223(I207, -3, I209) [-2 <= I208] 144.34/144.26 f222(I210, I211, I212) -> f223(I210, 1 + I211, I211 + I212) [I211 <= -2] 144.34/144.26 f222(I213, I214, I215) -> f221(I213, -3, I215) [-1 <= I214] 144.34/144.26 f220(I216, I217, I218) -> f221(I216, 1 + I217, I217 + I218) [1 + I217 <= -2] 144.34/144.26 f220(I219, I220, I221) -> f219(I219, -3, I221) [-2 <= I220] 144.34/144.26 f63(I222, I223, I224) -> f62(I222, I223, I224) 144.34/144.26 f218(I225, I226, I227) -> f219(I225, 1 + I226, I226 + I227) [I226 <= -2] 144.34/144.26 f218(I228, I229, I230) -> f217(I228, -4, I230) [-1 <= I229] 144.34/144.26 f67(I231, I232, I233) -> f66(I231, I232, I233) 144.34/144.26 f216(I234, I235, I236) -> f217(I234, 1 + I235, I235 + I236) [1 + I235 <= -1] 144.34/144.26 f216(I237, I238, I239) -> f215(I237, -4, I239) [-1 <= I238] 144.34/144.26 f214(I240, I241, I242) -> f215(I240, 1 + I241, I241 + I242) [I241 <= -1] 144.34/144.26 f214(I243, I244, I245) -> f213(I243, -4, I245) [0 <= I244] 144.34/144.26 f69(I246, I247, I248) -> f68(I246, I247, I248) 144.34/144.26 f212(I249, I250, I251) -> f213(I249, 1 + I250, I250 + I251) [1 + I250 <= -1] 144.34/144.26 f212(I252, I253, I254) -> f211(I252, -4, I254) [-1 <= I253] 144.34/144.26 f71(I255, I256, I257) -> f70(I255, I256, I257) 144.34/144.26 f210(I258, I259, I260) -> f211(I258, 1 + I259, I259 + I260) [I259 <= -1] 144.34/144.26 f210(I261, I262, I263) -> f209(I261, -5, I263) [0 <= I262] 144.34/144.26 f208(I264, I265, I266) -> f209(I264, 1 + I265, I265 + I266) [1 + I265 <= 0] 144.34/144.26 f208(I267, I268, I269) -> f207(I267, -5, I269) [0 <= I268] 144.34/144.26 f206(I270, I271, I272) -> f207(I270, 1 + I271, I271 + I272) [I271 <= 0] 144.34/144.26 f206(I273, I274, I275) -> f205(I273, -5, I275) [1 <= I274] 144.34/144.26 f75(I276, I277, I278) -> f74(I276, I277, I278) 144.34/144.26 f204(I279, I280, I281) -> f205(I279, 1 + I280, I280 + I281) [1 + I280 <= 0] 144.34/144.26 f204(I282, I283, I284) -> f203(I282, -5, I284) [0 <= I283] 144.34/144.26 f202(I285, I286, I287) -> f203(I285, 1 + I286, I286 + I287) [I286 <= 0] 144.34/144.26 f202(I288, I289, I290) -> f201(I288, -6, I290) [1 <= I289] 144.34/144.26 f77(I291, I292, I293) -> f76(I291, I292, I293) 144.34/144.26 f200(I294, I295, I296) -> f201(I294, 1 + I295, I295 + I296) [1 + I295 <= 4] 144.34/144.26 f200(I297, I298, I299) -> f199(I297, -6, I299) [4 <= I298] 144.34/144.26 f81(I300, I301, I302) -> f80(I300, I301, I302) 144.34/144.26 f198(I303, I304, I305) -> f199(I303, 1 + I304, I304 + I305) [I304 <= 4] 144.34/144.26 f198(I306, I307, I308) -> f197(I306, -6, I308) [5 <= I307] 144.34/144.26 f196(I309, I310, I311) -> f197(I309, 1 + I310, I310 + I311) [1 + I310 <= 4] 144.34/144.26 f196(I312, I313, I314) -> f195(I312, -6, I314) [4 <= I313] 144.34/144.26 f17(I315, I316, I317) -> f16(I315, I316, I317) 144.34/144.26 f85(I318, I319, I320) -> f84(I318, I319, I320) 144.34/144.26 f194(I321, I322, I323) -> f195(I321, 1 + I322, I322 + I323) [I322 <= 4] 144.34/144.26 f194(I324, I325, I326) -> f193(I324, 0, I326) [5 <= I325] 144.34/144.26 f192(I327, I328, I329) -> f193(I327, I327 + I328, I328 + I329) [1 + I328 <= 3] 144.34/144.26 f192(I330, I331, I332) -> f191(I330, 0, I332) [3 <= I331] 144.34/144.26 f190(I333, I334, I335) -> f191(I333, I333 + I334, I334 + I335) [I334 <= 3] 144.34/144.26 f190(I336, I337, I338) -> f189(I336, 0, I338) [4 <= I337] 144.34/144.26 f87(I339, I340, I341) -> f86(I339, I340, I341) 144.34/144.26 f188(I342, I343, I344) -> f189(I342, I342 + I343, I343 + I344) [1 + I343 <= 3] 144.34/144.26 f188(I345, I346, I347) -> f187(I345, 0, I347) [3 <= I346] 144.34/144.26 f186(I348, I349, I350) -> f187(I348, I348 + I349, I349 + I350) [I349 <= 3] 144.34/144.26 f186(I351, I352, I353) -> f185(I351, 1, I353) [4 <= I352] 144.34/144.26 f91(I354, I355, I356) -> f90(I354, I355, I356) 144.34/144.26 f184(I357, I358, I359) -> f185(I357, I357 + I358, I358 + I359) [1 + I358 <= 2] 144.34/144.26 f184(I360, I361, I362) -> f183(I360, 1, I362) [2 <= I361] 144.34/144.26 f93(I363, I364, I365) -> f92(I363, I364, I365) 144.34/144.26 f182(I366, I367, I368) -> f183(I366, I366 + I367, I367 + I368) [I367 <= 2] 144.34/144.26 f182(I369, I370, I371) -> f181(I369, 1, I371) [3 <= I370] 144.34/144.26 f180(I372, I373, I374) -> f181(I372, I372 + I373, I373 + I374) [1 + I373 <= 2] 144.34/144.26 f180(I375, I376, I377) -> f179(I375, 1, I377) [2 <= I376] 144.34/144.26 f95(I378, I379, I380) -> f94(I378, I379, I380) 144.34/144.26 f178(I381, I382, I383) -> f179(I381, I381 + I382, I382 + I383) [I382 <= 2] 144.34/144.26 f178(I384, I385, I386) -> f177(I384, -3, I386) [3 <= I385] 144.34/144.26 f176(I387, I388, I389) -> f177(I387, I387 + I388, I388 + I389) [1 + I388 <= -2] 144.34/144.26 f176(I390, I391, I392) -> f175(I390, -3, I392) [-2 <= I391] 144.34/144.26 f174(I393, I394, I395) -> f175(I393, I393 + I394, I394 + I395) [I394 <= -2] 144.34/144.26 f174(I396, I397, I398) -> f173(I396, -3, I398) [-1 <= I397] 144.34/144.26 f99(I399, I400, I401) -> f98(I399, I400, I401) 144.34/144.26 f172(I402, I403, I404) -> f173(I402, I402 + I403, I403 + I404) [1 + I403 <= -2] 144.34/144.26 f172(I405, I406, I407) -> f171(I405, -3, I407) [-2 <= I406] 144.34/144.26 f103(I408, I409, I410) -> f102(I408, I409, I410) 144.34/144.26 f170(I411, I412, I413) -> f171(I411, I411 + I412, I412 + I413) [I412 <= -2] 144.34/144.26 f170(I414, I415, I416) -> f169(I414, -4, I416) [-1 <= I415] 144.34/144.26 f168(I417, I418, I419) -> f169(I417, I417 + I418, I418 + I419) [1 + I418 <= -1] 144.34/144.26 f168(I420, I421, I422) -> f167(I420, -4, I422) [-1 <= I421] 144.34/144.26 f105(I423, I424, I425) -> f104(I423, I424, I425) 144.34/144.26 f166(I426, I427, I428) -> f167(I426, I426 + I427, I427 + I428) [I427 <= -1] 144.34/144.26 f166(I429, I430, I431) -> f165(I429, -4, I431) [0 <= I430] 144.34/144.26 f21(I432, I433, I434) -> f20(I432, I433, I434) 144.34/144.26 f109(I435, I436, I437) -> f108(I435, I436, I437) 144.34/144.26 f164(I438, I439, I440) -> f165(I438, I438 + I439, I439 + I440) [1 + I439 <= -1] 144.34/144.26 f164(I441, I442, I443) -> f163(I441, -4, I443) [-1 <= I442] 144.34/144.26 f162(I444, I445, I446) -> f163(I444, I444 + I445, I445 + I446) [I445 <= -1] 144.34/144.26 f162(I447, I448, I449) -> f161(I447, -5, I449) [0 <= I448] 144.34/144.26 f160(I450, I451, I452) -> f161(I450, I450 + I451, I451 + I452) [1 + I451 <= 0] 144.34/144.26 f160(I453, I454, I455) -> f1(I453, -5, I455) [0 <= I454] 144.34/144.26 f113(I456, I457, I458) -> f112(I456, I457, I458) 144.34/144.26 f2(I459, I460, I461) -> f1(I459, I459 + I460, I460 + I461) [I460 <= 0] 144.34/144.26 f2(I462, I463, I464) -> f3(I462, -5, I464) [1 <= I463] 144.34/144.26 f4(I465, I466, I467) -> f3(I465, I465 + I466, I466 + I467) [1 + I466 <= 0] 144.34/144.26 f4(I468, I469, I470) -> f5(I468, -5, I470) [0 <= I469] 144.34/144.26 f115(I471, I472, I473) -> f114(I471, I472, I473) 144.34/144.26 f6(I474, I475, I476) -> f5(I474, I474 + I475, I475 + I476) [I475 <= 0] 144.34/144.26 f6(I477, I478, I479) -> f7(I477, -6, I479) [1 <= I478] 144.34/144.26 f117(I480, I481, I482) -> f116(I480, I481, I482) 144.34/144.26 f8(I483, I484, I485) -> f7(I483, I483 + I484, I484 + I485) [1 + I484 <= 4] 144.34/144.26 f8(I486, I487, I488) -> f9(I486, -6, I488) [4 <= I487] 144.34/144.26 f10(I489, I490, I491) -> f9(I489, I489 + I490, I490 + I491) [I490 <= 4] 144.34/144.26 f10(I492, I493, I494) -> f11(I492, -6, I494) [5 <= I493] 144.34/144.26 f119(I495, I496, I497) -> f118(I495, I496, I497) 144.34/144.26 f12(I498, I499, I500) -> f11(I498, I498 + I499, I499 + I500) [1 + I499 <= 4] 144.34/144.26 f12(I501, I502, I503) -> f18(I501, -6, I503) [4 <= I502] 144.34/144.26 f19(I504, I505, I506) -> f18(I504, I504 + I505, I505 + I506) [I505 <= 4] 144.34/144.26 f19(I507, I508, I509) -> f26(I507, 5, I509) [5 <= I508] 144.34/144.26 f27(I510, I511, I512) -> f26(I510, -1 + I511, I511 + I512) [3 <= I511] 144.34/144.26 f27(I513, I514, I515) -> f32(I513, 5, I515) [I514 <= 2] 144.34/144.26 f123(I516, I517, I518) -> f122(I516, I517, I518) 144.34/144.26 f33(I519, I520, I521) -> f32(I519, -1 + I520, I520 + I521) [2 <= I520] 144.34/144.26 f33(I522, I523, I524) -> f36(I522, 5, I524) [1 + I523 <= 2] 144.34/144.26 f37(I525, I526, I527) -> f36(I525, -1 + I526, I526 + I527) [3 <= I526] 144.34/144.26 f37(I528, I529, I530) -> f40(I528, 5, I530) [I529 <= 2] 144.34/144.26 f127(I531, I532, I533) -> f126(I531, I532, I533) 144.34/144.26 f41(I534, I535, I536) -> f40(I534, -1 + I535, I535 + I536) [2 <= I535] 144.34/144.26 f41(I537, I538, I539) -> f48(I537, 6, I539) [1 + I538 <= 2] 144.34/144.26 f129(I540, I541, I542) -> f128(I540, I541, I542) 144.34/144.26 f49(I543, I544, I545) -> f48(I543, -1 + I544, I544 + I545) [2 <= I544] 144.34/144.26 f49(I546, I547, I548) -> f54(I546, 6, I548) [I547 <= 1] 144.34/144.26 f55(I549, I550, I551) -> f54(I549, -1 + I550, I550 + I551) [1 <= I550] 144.34/144.26 f55(I552, I553, I554) -> f60(I552, 6, I554) [1 + I553 <= 1] 144.34/144.26 f23(I555, I556, I557) -> f22(I555, I556, I557) 144.34/144.26 f133(I558, I559, I560) -> f132(I558, I559, I560) 144.34/144.26 f61(I561, I562, I563) -> f60(I561, -1 + I562, I562 + I563) [2 <= I562] 144.34/144.26 f61(I564, I565, I566) -> f64(I564, 6, I566) [I565 <= 1] 144.34/144.26 f65(I567, I568, I569) -> f64(I567, -1 + I568, I568 + I569) [1 <= I568] 144.34/144.26 f65(I570, I571, I572) -> f72(I570, 7, I572) [1 + I571 <= 1] 144.34/144.26 f73(I573, I574, I575) -> f72(I573, -1 + I574, I574 + I575) [1 <= I574] 144.34/144.26 f73(I576, I577, I578) -> f78(I576, 7, I578) [I577 <= 0] 144.34/144.26 f137(I579, I580, I581) -> f136(I579, I580, I581) 144.34/144.26 f79(I582, I583, I584) -> f78(I582, -1 + I583, I583 + I584) [0 <= I583] 144.34/144.26 f79(I585, I586, I587) -> f82(I585, 7, I587) [1 + I586 <= 0] 144.34/144.26 f139(I588, I589, I590) -> f138(I588, I589, I590) 144.34/144.26 f83(I591, I592, I593) -> f82(I591, -1 + I592, I592 + I593) [1 <= I592] 144.34/144.26 f83(I594, I595, I596) -> f88(I594, 7, I596) [I595 <= 0] 144.34/144.26 f89(I597, I598, I599) -> f88(I597, -1 + I598, I598 + I599) [0 <= I598] 144.34/144.26 f89(I600, I601, I602) -> f96(I600, 8, I602) [1 + I601 <= 0] 144.34/144.26 f141(I603, I604, I605) -> f140(I603, I604, I605) 144.34/144.26 f97(I606, I607, I608) -> f96(I606, -1 + I607, I607 + I608) [0 <= I607] 144.34/144.26 f97(I609, I610, I611) -> f100(I609, 8, I611) [I610 <= -1] 144.34/144.26 f145(I612, I613, I614) -> f144(I612, I613, I614) 144.34/144.26 f101(I615, I616, I617) -> f100(I615, -1 + I616, I616 + I617) [-1 <= I616] 144.34/144.26 f101(I618, I619, I620) -> f106(I618, 8, I620) [1 + I619 <= -1] 144.34/144.26 f107(I621, I622, I623) -> f106(I621, -1 + I622, I622 + I623) [0 <= I622] 144.34/144.26 f107(I624, I625, I626) -> f110(I624, 8, I626) [I625 <= -1] 144.34/144.26 f111(I627, I628, I629) -> f110(I627, -1 + I628, I628 + I629) [-1 <= I628] 144.34/144.26 f111(I630, I631, I632) -> f120(I630, 9, I632) [1 + I631 <= -1] 144.34/144.26 f147(I633, I634, I635) -> f146(I633, I634, I635) 144.34/144.26 f121(I636, I637, I638) -> f120(I636, -1 + I637, I637 + I638) [-1 <= I637] 144.34/144.26 f121(I639, I640, I641) -> f124(I639, 9, I641) [I640 <= -2] 144.34/144.26 f125(I642, I643, I644) -> f124(I642, -1 + I643, I643 + I644) [-2 <= I643] 144.34/144.26 f125(I645, I646, I647) -> f130(I645, 9, I647) [1 + I646 <= -2] 144.34/144.26 f151(I648, I649, I650) -> f150(I648, I649, I650) 144.34/144.26 f131(I651, I652, I653) -> f130(I651, -1 + I652, I652 + I653) [-1 <= I652] 144.34/144.26 f131(I654, I655, I656) -> f134(I654, 9, I656) [I655 <= -2] 144.34/144.26 f135(I657, I658, I659) -> f134(I657, -1 + I658, I658 + I659) [-2 <= I658] 144.34/144.26 f135(I660, I661, I662) -> f142(I660, 0, I662) [1 + I661 <= -2] 144.34/144.26 f155(I663, I664, I665) -> f154(I663, I664, I665) 144.34/144.26 f143(I666, I667, I668) -> f142(I666, -1 + I667, I667 + I668) [-2 <= I667] 144.34/144.26 f143(I669, I670, I671) -> f148(I669, 0, I671) [I670 <= -3] 144.34/144.26 f157(I672, I673, I674) -> f156(I672, I673, I674) 144.34/144.26 f149(I675, I676, I677) -> f148(I675, -1 + I676, I676 + I677) [-3 <= I676] 144.34/144.26 f149(I678, I679, I680) -> f152(I678, 0, I680) [1 + I679 <= -3] 144.34/144.26 f153(I681, I682, I683) -> f152(I681, -1 + I682, I682 + I683) [-2 <= I682] 144.34/144.26 f153(I684, I685, I686) -> f158(I684, 0, I686) [I685 <= -3] 144.34/144.26 f159(I687, I688, I689) -> f158(I687, -1 + I688, I688 + I689) [-3 <= I688] 144.34/144.26 f159(I690, I691, I692) -> f157(I690, -1, I692) [1 + I691 <= -3] 144.34/144.26 f158(I693, I694, I695) -> f159(I693, I694, I695) 144.34/144.26 f156(I696, I697, I698) -> f157(I696, -1 + I697, I697 + I698) [-4 <= I697] 144.34/144.26 f156(I699, I700, I701) -> f155(I699, -1, I701) [I700 <= -5] 144.34/144.26 f154(I702, I703, I704) -> f155(I702, -1 + I703, I703 + I704) [-5 <= I703] 144.34/144.26 f154(I705, I706, I707) -> f151(I705, -1, I707) [1 + I706 <= -5] 144.34/144.26 f152(I708, I709, I710) -> f153(I708, I709, I710) 144.34/144.26 f150(I711, I712, I713) -> f151(I711, -1 + I712, I712 + I713) [-4 <= I712] 144.34/144.26 f150(I714, I715, I716) -> f147(I714, -1, I716) [I715 <= -5] 144.34/144.26 f148(I717, I718, I719) -> f149(I717, I718, I719) 144.34/144.26 f146(I720, I721, I722) -> f147(I720, -1 + I721, I721 + I722) [-5 <= I721] 144.34/144.26 f146(I723, I724, I725) -> f145(I723, -2, I725) [1 + I724 <= -5] 144.34/144.26 f144(I726, I727, I728) -> f145(I726, -1 + I727, I727 + I728) [-6 <= I727] 144.34/144.26 f144(I729, I730, I731) -> f141(I729, -2, I731) [I730 <= -7] 144.34/144.26 f142(I732, I733, I734) -> f143(I732, I733, I734) 144.34/144.26 f140(I735, I736, I737) -> f141(I735, -1 + I736, I736 + I737) [-7 <= I736] 144.34/144.26 f140(I738, I739, I740) -> f139(I738, -2, I740) [1 + I739 <= -7] 144.34/144.26 f138(I741, I742, I743) -> f139(I741, -1 + I742, I742 + I743) [-6 <= I742] 144.34/144.26 f138(I744, I745, I746) -> f137(I744, -2, I746) [I745 <= -7] 144.34/144.26 f136(I747, I748, I749) -> f137(I747, -1 + I748, I748 + I749) [-7 <= I748] 144.34/144.26 f136(I750, I751, I752) -> f133(I750, 16, I752) [1 + I751 <= -7] 144.34/144.26 f134(I753, I754, I755) -> f135(I753, I754, I755) 144.34/144.26 f132(I756, I757, I758) -> f133(I756, -1 + I757, I757 + I758) [-7 <= I757] 144.34/144.26 f132(I759, I760, I761) -> f129(I759, 16, I761) [I760 <= -8] 144.34/144.26 f130(I762, I763, I764) -> f131(I762, I763, I764) 144.34/144.26 f128(I765, I766, I767) -> f129(I765, -1 + I766, I766 + I767) [-8 <= I766] 144.34/144.26 f128(I768, I769, I770) -> f127(I768, 16, I770) [1 + I769 <= -8] 144.34/144.26 f126(I771, I772, I773) -> f127(I771, -1 + I772, I772 + I773) [-7 <= I772] 144.34/144.26 f126(I774, I775, I776) -> f123(I774, 16, I776) [I775 <= -8] 144.34/144.26 f124(I777, I778, I779) -> f125(I777, I778, I779) 144.34/144.26 f122(I780, I781, I782) -> f123(I780, -1 + I781, I781 + I782) [-8 <= I781] 144.34/144.26 f122(I783, I784, I785) -> f119(I783, 5, I785) [1 + I784 <= -8] 144.34/144.26 f25(I786, I787, I788) -> f24(I786, I787, I788) 144.34/144.26 f120(I789, I790, I791) -> f121(I789, I790, I791) 144.34/144.26 f118(I792, I793, I794) -> f119(I792, -1 * I792 + I793, I793 + I794) [3 <= I793] 144.34/144.26 f118(I795, I796, I797) -> f117(I795, 5, I797) [I796 <= 2] 144.34/144.26 f116(I798, I799, I800) -> f117(I798, -1 * I798 + I799, I799 + I800) [2 <= I799] 144.34/144.26 f116(I801, I802, I803) -> f115(I801, 5, I803) [1 + I802 <= 2] 144.34/144.26 f114(I804, I805, I806) -> f115(I804, -1 * I804 + I805, I805 + I806) [3 <= I805] 144.34/144.26 f114(I807, I808, I809) -> f113(I807, 5, I809) [I808 <= 2] 144.34/144.26 f112(I810, I811, I812) -> f113(I810, -1 * I810 + I811, I811 + I812) [2 <= I811] 144.34/144.26 f112(I813, I814, I815) -> f109(I813, 6, I815) [1 + I814 <= 2] 144.34/144.26 f110(I816, I817, I818) -> f111(I816, I817, I818) 144.34/144.26 f108(I819, I820, I821) -> f109(I819, -1 * I819 + I820, I820 + I821) [2 <= I820] 144.34/144.26 f108(I822, I823, I824) -> f105(I822, 6, I824) [I823 <= 1] 144.34/144.26 f106(I825, I826, I827) -> f107(I825, I826, I827) 144.34/144.26 f104(I828, I829, I830) -> f105(I828, -1 * I828 + I829, I829 + I830) [1 <= I829] 144.34/144.26 f104(I831, I832, I833) -> f103(I831, 6, I833) [1 + I832 <= 1] 144.34/144.26 f102(I834, I835, I836) -> f103(I834, -1 * I834 + I835, I835 + I836) [2 <= I835] 144.34/144.26 f102(I837, I838, I839) -> f99(I837, 6, I839) [I838 <= 1] 144.34/144.26 f100(I840, I841, I842) -> f101(I840, I841, I842) 144.34/144.26 f98(I843, I844, I845) -> f99(I843, -1 * I843 + I844, I844 + I845) [1 <= I844] 144.34/144.26 f98(I846, I847, I848) -> f95(I846, 7, I848) [1 + I847 <= 1] 144.34/144.26 f96(I849, I850, I851) -> f97(I849, I850, I851) 144.34/144.26 f94(I852, I853, I854) -> f95(I852, -1 * I852 + I853, I853 + I854) [1 <= I853] 144.34/144.26 f94(I855, I856, I857) -> f93(I855, 7, I857) [I856 <= 0] 144.34/144.26 f92(I858, I859, I860) -> f93(I858, -1 * I858 + I859, I859 + I860) [0 <= I859] 144.34/144.26 f92(I861, I862, I863) -> f91(I861, 7, I863) [1 + I862 <= 0] 144.34/144.26 f90(I864, I865, I866) -> f91(I864, -1 * I864 + I865, I865 + I866) [1 <= I865] 144.34/144.26 f90(I867, I868, I869) -> f87(I867, 7, I869) [I868 <= 0] 144.34/144.26 f88(I870, I871, I872) -> f89(I870, I871, I872) 144.34/144.26 f86(I873, I874, I875) -> f87(I873, -1 * I873 + I874, I874 + I875) [0 <= I874] 144.34/144.26 f86(I876, I877, I878) -> f85(I876, 8, I878) [1 + I877 <= 0] 144.34/144.26 f84(I879, I880, I881) -> f85(I879, -1 * I879 + I880, I880 + I881) [0 <= I880] 144.34/144.26 f84(I882, I883, I884) -> f81(I882, 8, I884) [I883 <= -1] 144.34/144.26 f82(I885, I886, I887) -> f83(I885, I886, I887) 144.34/144.26 f80(I888, I889, I890) -> f81(I888, -1 * I888 + I889, I889 + I890) [-1 <= I889] 144.34/144.26 f80(I891, I892, I893) -> f77(I891, 8, I893) [1 + I892 <= -1] 144.34/144.26 f78(I894, I895, I896) -> f79(I894, I895, I896) 144.34/144.26 f76(I897, I898, I899) -> f77(I897, -1 * I897 + I898, I898 + I899) [0 <= I898] 144.34/144.26 f76(I900, I901, I902) -> f75(I900, 8, I902) [I901 <= -1] 144.34/144.26 f74(I903, I904, I905) -> f75(I903, -1 * I903 + I904, I904 + I905) [-1 <= I904] 144.34/144.26 f74(I906, I907, I908) -> f71(I906, 9, I908) [1 + I907 <= -1] 144.34/144.26 f31(I909, I910, I911) -> f30(I909, I910, I911) 144.34/144.26 f72(I912, I913, I914) -> f73(I912, I913, I914) 144.34/144.26 f70(I915, I916, I917) -> f71(I915, -1 * I915 + I916, I916 + I917) [-1 <= I916] 144.34/144.26 f70(I918, I919, I920) -> f69(I918, 9, I920) [I919 <= -2] 144.34/144.26 f68(I921, I922, I923) -> f69(I921, -1 * I921 + I922, I922 + I923) [-2 <= I922] 144.34/144.26 f68(I924, I925, I926) -> f67(I924, 9, I926) [1 + I925 <= -2] 144.34/144.26 f66(I927, I928, I929) -> f67(I927, -1 * I927 + I928, I928 + I929) [-1 <= I928] 144.34/144.26 f66(I930, I931, I932) -> f63(I930, 9, I932) [I931 <= -2] 144.34/144.26 f64(I933, I934, I935) -> f65(I933, I934, I935) 144.34/144.26 f62(I936, I937, I938) -> f63(I936, -1 * I936 + I937, I937 + I938) [-2 <= I937] 144.34/144.26 f62(I939, I940, I941) -> f59(I939, 0, I941) [1 + I940 <= -2] 144.34/144.26 f60(I942, I943, I944) -> f61(I942, I943, I944) 144.34/144.26 f58(I945, I946, I947) -> f59(I945, -1 * I945 + I946, I946 + I947) [-2 <= I946] 144.34/144.26 f58(I948, I949, I950) -> f57(I948, 0, I950) [I949 <= -3] 144.34/144.26 f56(I951, I952, I953) -> f57(I951, -1 * I951 + I952, I952 + I953) [-3 <= I952] 144.34/144.26 f56(I954, I955, I956) -> f53(I954, 0, I956) [1 + I955 <= -3] 144.34/144.26 f54(I957, I958, I959) -> f55(I957, I958, I959) 144.34/144.26 f52(I960, I961, I962) -> f53(I960, -1 * I960 + I961, I961 + I962) [-2 <= I961] 144.34/144.26 f52(I963, I964, I965) -> f51(I963, 0, I965) [I964 <= -3] 144.34/144.26 f50(I966, I967, I968) -> f51(I966, -1 * I966 + I967, I967 + I968) [-3 <= I967] 144.34/144.26 f50(I969, I970, I971) -> f47(I969, -1, I971) [1 + I970 <= -3] 144.34/144.26 f48(I972, I973, I974) -> f49(I972, I973, I974) 144.34/144.26 f46(I975, I976, I977) -> f47(I975, -1 * I975 + I976, I976 + I977) [-4 <= I976] 144.34/144.26 f46(I978, I979, I980) -> f45(I978, -1, I980) [I979 <= -5] 144.34/144.26 f44(I981, I982, I983) -> f45(I981, -1 * I981 + I982, I982 + I983) [-5 <= I982] 144.34/144.26 f44(I984, I985, I986) -> f43(I984, -1, I986) [1 + I985 <= -5] 144.34/144.26 f42(I987, I988, I989) -> f43(I987, -1 * I987 + I988, I988 + I989) [-4 <= I988] 144.34/144.26 f42(I990, I991, I992) -> f39(I990, -1, I992) [I991 <= -5] 144.34/144.26 f40(I993, I994, I995) -> f41(I993, I994, I995) 144.34/144.26 f38(I996, I997, I998) -> f39(I996, -1 * I996 + I997, I997 + I998) [-5 <= I997] 144.34/144.26 f38(I999, I1000, I1001) -> f35(I999, -2, I1001) [1 + I1000 <= -5] 144.34/144.26 f36(I1002, I1003, I1004) -> f37(I1002, I1003, I1004) 144.34/144.26 f34(I1005, I1006, I1007) -> f35(I1005, -1 * I1005 + I1006, I1006 + I1007) [-6 <= I1006] 144.34/144.26 f34(I1008, I1009, I1010) -> f28(I1008, -2, I1010) [I1009 <= -7] 144.34/144.26 f29(I1011, I1012, I1013) -> f28(I1011, -1 * I1011 + I1012, I1012 + I1013) [-7 <= I1012] 144.34/144.26 f29(I1014, I1015, I1016) -> f31(I1014, -2, I1016) [1 + I1015 <= -7] 144.34/144.26 f32(I1017, I1018, I1019) -> f33(I1017, I1018, I1019) 144.34/144.26 f30(I1020, I1021, I1022) -> f31(I1020, -1 * I1020 + I1021, I1021 + I1022) [-6 <= I1021] 144.34/144.26 f30(I1023, I1024, I1025) -> f25(I1023, -2, I1025) [I1024 <= -7] 144.34/144.26 f28(I1026, I1027, I1028) -> f29(I1026, I1027, I1028) 144.34/144.26 f26(I1029, I1030, I1031) -> f27(I1029, I1030, I1031) 144.34/144.26 f24(I1032, I1033, I1034) -> f25(I1032, -1 * I1032 + I1033, I1033 + I1034) [-7 <= I1033] 144.34/144.26 f24(I1035, I1036, I1037) -> f23(I1035, 16, I1037) [1 + I1036 <= -7] 144.34/144.26 f22(I1038, I1039, I1040) -> f23(I1038, -1 * I1038 + I1039, I1039 + I1040) [-7 <= I1039] 144.34/144.26 f22(I1041, I1042, I1043) -> f21(I1041, 16, I1043) [I1042 <= -8] 144.34/144.26 f20(I1044, I1045, I1046) -> f21(I1044, -1 * I1044 + I1045, I1045 + I1046) [-8 <= I1045] 144.34/144.26 f20(I1047, I1048, I1049) -> f17(I1047, 16, I1049) [1 + I1048 <= -8] 144.34/144.26 f18(I1050, I1051, I1052) -> f19(I1050, I1051, I1052) 144.34/144.26 f16(I1053, I1054, I1055) -> f17(I1053, -1 * I1053 + I1054, I1054 + I1055) [-7 <= I1054] 144.34/144.26 f16(I1056, I1057, I1058) -> f15(I1056, 16, I1058) [I1057 <= -8] 144.34/144.26 f13(I1059, I1060, I1061) -> f15(I1059, -1 * I1059 + I1060, I1060 + I1061) [-8 <= I1060] 144.34/144.26 f13(I1062, I1063, I1064) -> f14(I1062, I1063, I1064) [1 + I1063 <= -8] 144.34/144.26 f11(I1065, I1066, I1067) -> f12(I1065, I1066, I1067) 144.34/144.26 f9(I1068, I1069, I1070) -> f10(I1068, I1069, I1070) 144.34/144.26 f7(I1071, I1072, I1073) -> f8(I1071, I1072, I1073) 144.34/144.26 f5(I1074, I1075, I1076) -> f6(I1074, I1075, I1076) 144.34/144.26 f3(I1077, I1078, I1079) -> f4(I1077, I1078, I1079) 144.34/144.26 f1(I1080, I1081, I1082) -> f2(I1080, I1081, I1082) 144.34/144.26 144.34/147.23 EOF