/export/starexec/sandbox2/solver/bin/starexec_run_standard /export/starexec/sandbox2/benchmark/theBenchmark.hs /export/starexec/sandbox2/output/output_files


--------------------------------------------------------------------------------


YES
proof of /export/starexec/sandbox2/benchmark/theBenchmark.hs
# AProVE Commit ID: 794c25de1cacf0d048858bcd21c9a779e1221865 marcel 20200619 unpublished dirty


H-Termination with start terms of the given HASKELL could be proven:

(0) HASKELL
(1) IFR [EQUIVALENT, 0 ms]
(2) HASKELL
(3) BR [EQUIVALENT, 0 ms]
(4) HASKELL
(5) COR [EQUIVALENT, 0 ms]
(6) HASKELL
(7) NumRed [SOUND, 0 ms]
(8) HASKELL
(9) Narrow [SOUND, 0 ms]
(10) AND
    (11) QDP
        (12) QDPSizeChangeProof [EQUIVALENT, 0 ms]
        (13) YES
    (14) QDP
        (15) DependencyGraphProof [EQUIVALENT, 0 ms]
        (16) AND
            (17) QDP
                (18) MRRProof [EQUIVALENT, 7 ms]
                (19) QDP
                (20) PisEmptyProof [EQUIVALENT, 0 ms]
                (21) YES
            (22) QDP
                (23) QDPSizeChangeProof [EQUIVALENT, 18 ms]
                (24) YES
    (25) QDP
        (26) QDPSizeChangeProof [EQUIVALENT, 0 ms]
        (27) YES
    (28) QDP
        (29) QDPSizeChangeProof [EQUIVALENT, 0 ms]
        (30) YES
    (31) QDP
        (32) QDPSizeChangeProof [EQUIVALENT, 0 ms]
        (33) YES


----------------------------------------

(0)
Obligation:
mainModule Main 
module Main where {
import qualified Prelude;
}

----------------------------------------

(1) IFR (EQUIVALENT)
If Reductions:
The following If expression
"if primGEqNatS x y then Succ (primDivNatS (primMinusNatS x y) (Succ y)) else Zero"
is transformed to
"primDivNatS0 x y True = Succ (primDivNatS (primMinusNatS x y) (Succ y));
primDivNatS0 x y False = Zero;
"

----------------------------------------

(2)
Obligation:
mainModule Main 
module Main where {
import qualified Prelude;
}

----------------------------------------

(3) BR (EQUIVALENT)
Replaced joker patterns by fresh variables and removed binding patterns.

Binding Reductions:
The bind variable of the following binding Pattern
"frac@(Float vx vy)"
is replaced by the following term
"Float vx vy"

----------------------------------------

(4)
Obligation:
mainModule Main 
module Main where {
import qualified Prelude;
}

----------------------------------------

(5) COR (EQUIVALENT)
Cond Reductions:
The following Function with conditions
"undefined |Falseundefined;
"
is transformed to
"undefined  = undefined1;
"
"undefined0 True = undefined;
"
"undefined1  = undefined0 False;
"

----------------------------------------

(6)
Obligation:
mainModule Main 
module Main where {
import qualified Prelude;
}

----------------------------------------

(7) NumRed (SOUND)
Num Reduction:All numbers are transformed to their corresponding representation with Succ, Pred and Zero.
----------------------------------------

(8)
Obligation:
mainModule Main 
module Main where {
import qualified Prelude;
}

----------------------------------------

(9) Narrow (SOUND)
Haskell To QDPs

digraph dp_graph {
node [outthreshold=100, inthreshold=100];1[label="properFraction",fontsize=16,color="grey",shape="box"];1 -> 3[label="",style="dashed", color="grey", weight=3];
3[label="properFraction wv3",fontsize=16,color="black",shape="triangle"];3 -> 4[label="",style="solid", color="black", weight=3];
4[label="floatProperFractionFloat wv3",fontsize=16,color="burlywood",shape="box"];545[label="wv3/Float wv30 wv31",fontsize=10,color="white",style="solid",shape="box"];4 -> 545[label="",style="solid", color="burlywood", weight=9];
545 -> 5[label="",style="solid", color="burlywood", weight=3];
5[label="floatProperFractionFloat (Float wv30 wv31)",fontsize=16,color="black",shape="box"];5 -> 6[label="",style="solid", color="black", weight=3];
6[label="(fromInt (wv30 `quot` wv31),Float wv30 wv31 - fromInt (wv30 `quot` wv31))",fontsize=16,color="green",shape="box"];6 -> 7[label="",style="dashed", color="green", weight=3];
6 -> 8[label="",style="dashed", color="green", weight=3];
7[label="fromInt (wv30 `quot` wv31)",fontsize=16,color="black",shape="box"];7 -> 9[label="",style="solid", color="black", weight=3];
8[label="Float wv30 wv31 - fromInt (wv30 `quot` wv31)",fontsize=16,color="black",shape="box"];8 -> 10[label="",style="solid", color="black", weight=3];
9[label="wv30 `quot` wv31",fontsize=16,color="black",shape="triangle"];9 -> 11[label="",style="solid", color="black", weight=3];
10 -> 12[label="",style="dashed", color="red", weight=0];
10[label="primMinusFloat (Float wv30 wv31) (fromInt (wv30 `quot` wv31))",fontsize=16,color="magenta"];10 -> 13[label="",style="dashed", color="magenta", weight=3];
11[label="primQuotInt wv30 wv31",fontsize=16,color="burlywood",shape="box"];546[label="wv30/Pos wv300",fontsize=10,color="white",style="solid",shape="box"];11 -> 546[label="",style="solid", color="burlywood", weight=9];
546 -> 14[label="",style="solid", color="burlywood", weight=3];
547[label="wv30/Neg wv300",fontsize=10,color="white",style="solid",shape="box"];11 -> 547[label="",style="solid", color="burlywood", weight=9];
547 -> 15[label="",style="solid", color="burlywood", weight=3];
13 -> 9[label="",style="dashed", color="red", weight=0];
13[label="wv30 `quot` wv31",fontsize=16,color="magenta"];12[label="primMinusFloat (Float wv30 wv31) (fromInt wv4)",fontsize=16,color="black",shape="triangle"];12 -> 16[label="",style="solid", color="black", weight=3];
14[label="primQuotInt (Pos wv300) wv31",fontsize=16,color="burlywood",shape="box"];548[label="wv31/Pos wv310",fontsize=10,color="white",style="solid",shape="box"];14 -> 548[label="",style="solid", color="burlywood", weight=9];
548 -> 17[label="",style="solid", color="burlywood", weight=3];
549[label="wv31/Neg wv310",fontsize=10,color="white",style="solid",shape="box"];14 -> 549[label="",style="solid", color="burlywood", weight=9];
549 -> 18[label="",style="solid", color="burlywood", weight=3];
15[label="primQuotInt (Neg wv300) wv31",fontsize=16,color="burlywood",shape="box"];550[label="wv31/Pos wv310",fontsize=10,color="white",style="solid",shape="box"];15 -> 550[label="",style="solid", color="burlywood", weight=9];
550 -> 19[label="",style="solid", color="burlywood", weight=3];
551[label="wv31/Neg wv310",fontsize=10,color="white",style="solid",shape="box"];15 -> 551[label="",style="solid", color="burlywood", weight=9];
551 -> 20[label="",style="solid", color="burlywood", weight=3];
16[label="primMinusFloat (Float wv30 wv31) (primIntToFloat wv4)",fontsize=16,color="black",shape="box"];16 -> 21[label="",style="solid", color="black", weight=3];
17[label="primQuotInt (Pos wv300) (Pos wv310)",fontsize=16,color="burlywood",shape="box"];552[label="wv310/Succ wv3100",fontsize=10,color="white",style="solid",shape="box"];17 -> 552[label="",style="solid", color="burlywood", weight=9];
552 -> 22[label="",style="solid", color="burlywood", weight=3];
553[label="wv310/Zero",fontsize=10,color="white",style="solid",shape="box"];17 -> 553[label="",style="solid", color="burlywood", weight=9];
553 -> 23[label="",style="solid", color="burlywood", weight=3];
18[label="primQuotInt (Pos wv300) (Neg wv310)",fontsize=16,color="burlywood",shape="box"];554[label="wv310/Succ wv3100",fontsize=10,color="white",style="solid",shape="box"];18 -> 554[label="",style="solid", color="burlywood", weight=9];
554 -> 24[label="",style="solid", color="burlywood", weight=3];
555[label="wv310/Zero",fontsize=10,color="white",style="solid",shape="box"];18 -> 555[label="",style="solid", color="burlywood", weight=9];
555 -> 25[label="",style="solid", color="burlywood", weight=3];
19[label="primQuotInt (Neg wv300) (Pos wv310)",fontsize=16,color="burlywood",shape="box"];556[label="wv310/Succ wv3100",fontsize=10,color="white",style="solid",shape="box"];19 -> 556[label="",style="solid", color="burlywood", weight=9];
556 -> 26[label="",style="solid", color="burlywood", weight=3];
557[label="wv310/Zero",fontsize=10,color="white",style="solid",shape="box"];19 -> 557[label="",style="solid", color="burlywood", weight=9];
557 -> 27[label="",style="solid", color="burlywood", weight=3];
20[label="primQuotInt (Neg wv300) (Neg wv310)",fontsize=16,color="burlywood",shape="box"];558[label="wv310/Succ wv3100",fontsize=10,color="white",style="solid",shape="box"];20 -> 558[label="",style="solid", color="burlywood", weight=9];
558 -> 28[label="",style="solid", color="burlywood", weight=3];
559[label="wv310/Zero",fontsize=10,color="white",style="solid",shape="box"];20 -> 559[label="",style="solid", color="burlywood", weight=9];
559 -> 29[label="",style="solid", color="burlywood", weight=3];
21[label="primMinusFloat (Float wv30 wv31) (Float wv4 (Pos (Succ Zero)))",fontsize=16,color="black",shape="box"];21 -> 30[label="",style="solid", color="black", weight=3];
22[label="primQuotInt (Pos wv300) (Pos (Succ wv3100))",fontsize=16,color="black",shape="box"];22 -> 31[label="",style="solid", color="black", weight=3];
23[label="primQuotInt (Pos wv300) (Pos Zero)",fontsize=16,color="black",shape="box"];23 -> 32[label="",style="solid", color="black", weight=3];
24[label="primQuotInt (Pos wv300) (Neg (Succ wv3100))",fontsize=16,color="black",shape="box"];24 -> 33[label="",style="solid", color="black", weight=3];
25[label="primQuotInt (Pos wv300) (Neg Zero)",fontsize=16,color="black",shape="box"];25 -> 34[label="",style="solid", color="black", weight=3];
26[label="primQuotInt (Neg wv300) (Pos (Succ wv3100))",fontsize=16,color="black",shape="box"];26 -> 35[label="",style="solid", color="black", weight=3];
27[label="primQuotInt (Neg wv300) (Pos Zero)",fontsize=16,color="black",shape="box"];27 -> 36[label="",style="solid", color="black", weight=3];
28[label="primQuotInt (Neg wv300) (Neg (Succ wv3100))",fontsize=16,color="black",shape="box"];28 -> 37[label="",style="solid", color="black", weight=3];
29[label="primQuotInt (Neg wv300) (Neg Zero)",fontsize=16,color="black",shape="box"];29 -> 38[label="",style="solid", color="black", weight=3];
30[label="Float (wv30 * Pos (Succ Zero) - wv4 * wv31) (wv31 * Pos (Succ Zero))",fontsize=16,color="green",shape="box"];30 -> 39[label="",style="dashed", color="green", weight=3];
30 -> 40[label="",style="dashed", color="green", weight=3];
31[label="Pos (primDivNatS wv300 (Succ wv3100))",fontsize=16,color="green",shape="box"];31 -> 41[label="",style="dashed", color="green", weight=3];
32[label="error []",fontsize=16,color="black",shape="triangle"];32 -> 42[label="",style="solid", color="black", weight=3];
33[label="Neg (primDivNatS wv300 (Succ wv3100))",fontsize=16,color="green",shape="box"];33 -> 43[label="",style="dashed", color="green", weight=3];
34 -> 32[label="",style="dashed", color="red", weight=0];
34[label="error []",fontsize=16,color="magenta"];35[label="Neg (primDivNatS wv300 (Succ wv3100))",fontsize=16,color="green",shape="box"];35 -> 44[label="",style="dashed", color="green", weight=3];
36 -> 32[label="",style="dashed", color="red", weight=0];
36[label="error []",fontsize=16,color="magenta"];37[label="Pos (primDivNatS wv300 (Succ wv3100))",fontsize=16,color="green",shape="box"];37 -> 45[label="",style="dashed", color="green", weight=3];
38 -> 32[label="",style="dashed", color="red", weight=0];
38[label="error []",fontsize=16,color="magenta"];39[label="wv30 * Pos (Succ Zero) - wv4 * wv31",fontsize=16,color="black",shape="box"];39 -> 46[label="",style="solid", color="black", weight=3];
40[label="wv31 * Pos (Succ Zero)",fontsize=16,color="black",shape="triangle"];40 -> 47[label="",style="solid", color="black", weight=3];
41[label="primDivNatS wv300 (Succ wv3100)",fontsize=16,color="burlywood",shape="triangle"];560[label="wv300/Succ wv3000",fontsize=10,color="white",style="solid",shape="box"];41 -> 560[label="",style="solid", color="burlywood", weight=9];
560 -> 48[label="",style="solid", color="burlywood", weight=3];
561[label="wv300/Zero",fontsize=10,color="white",style="solid",shape="box"];41 -> 561[label="",style="solid", color="burlywood", weight=9];
561 -> 49[label="",style="solid", color="burlywood", weight=3];
42[label="error []",fontsize=16,color="red",shape="box"];43 -> 41[label="",style="dashed", color="red", weight=0];
43[label="primDivNatS wv300 (Succ wv3100)",fontsize=16,color="magenta"];43 -> 50[label="",style="dashed", color="magenta", weight=3];
44 -> 41[label="",style="dashed", color="red", weight=0];
44[label="primDivNatS wv300 (Succ wv3100)",fontsize=16,color="magenta"];44 -> 51[label="",style="dashed", color="magenta", weight=3];
45 -> 41[label="",style="dashed", color="red", weight=0];
45[label="primDivNatS wv300 (Succ wv3100)",fontsize=16,color="magenta"];45 -> 52[label="",style="dashed", color="magenta", weight=3];
45 -> 53[label="",style="dashed", color="magenta", weight=3];
46 -> 54[label="",style="dashed", color="red", weight=0];
46[label="primMinusInt (wv30 * Pos (Succ Zero)) (wv4 * wv31)",fontsize=16,color="magenta"];46 -> 55[label="",style="dashed", color="magenta", weight=3];
47[label="primMulInt wv31 (Pos (Succ Zero))",fontsize=16,color="burlywood",shape="box"];562[label="wv31/Pos wv310",fontsize=10,color="white",style="solid",shape="box"];47 -> 562[label="",style="solid", color="burlywood", weight=9];
562 -> 56[label="",style="solid", color="burlywood", weight=3];
563[label="wv31/Neg wv310",fontsize=10,color="white",style="solid",shape="box"];47 -> 563[label="",style="solid", color="burlywood", weight=9];
563 -> 57[label="",style="solid", color="burlywood", weight=3];
48[label="primDivNatS (Succ wv3000) (Succ wv3100)",fontsize=16,color="black",shape="box"];48 -> 58[label="",style="solid", color="black", weight=3];
49[label="primDivNatS Zero (Succ wv3100)",fontsize=16,color="black",shape="box"];49 -> 59[label="",style="solid", color="black", weight=3];
50[label="wv3100",fontsize=16,color="green",shape="box"];51[label="wv300",fontsize=16,color="green",shape="box"];52[label="wv300",fontsize=16,color="green",shape="box"];53[label="wv3100",fontsize=16,color="green",shape="box"];55 -> 40[label="",style="dashed", color="red", weight=0];
55[label="wv30 * Pos (Succ Zero)",fontsize=16,color="magenta"];55 -> 60[label="",style="dashed", color="magenta", weight=3];
54[label="primMinusInt wv5 (wv4 * wv31)",fontsize=16,color="burlywood",shape="triangle"];564[label="wv5/Pos wv50",fontsize=10,color="white",style="solid",shape="box"];54 -> 564[label="",style="solid", color="burlywood", weight=9];
564 -> 61[label="",style="solid", color="burlywood", weight=3];
565[label="wv5/Neg wv50",fontsize=10,color="white",style="solid",shape="box"];54 -> 565[label="",style="solid", color="burlywood", weight=9];
565 -> 62[label="",style="solid", color="burlywood", weight=3];
56[label="primMulInt (Pos wv310) (Pos (Succ Zero))",fontsize=16,color="black",shape="box"];56 -> 63[label="",style="solid", color="black", weight=3];
57[label="primMulInt (Neg wv310) (Pos (Succ Zero))",fontsize=16,color="black",shape="box"];57 -> 64[label="",style="solid", color="black", weight=3];
58[label="primDivNatS0 wv3000 wv3100 (primGEqNatS wv3000 wv3100)",fontsize=16,color="burlywood",shape="box"];566[label="wv3000/Succ wv30000",fontsize=10,color="white",style="solid",shape="box"];58 -> 566[label="",style="solid", color="burlywood", weight=9];
566 -> 65[label="",style="solid", color="burlywood", weight=3];
567[label="wv3000/Zero",fontsize=10,color="white",style="solid",shape="box"];58 -> 567[label="",style="solid", color="burlywood", weight=9];
567 -> 66[label="",style="solid", color="burlywood", weight=3];
59[label="Zero",fontsize=16,color="green",shape="box"];60[label="wv30",fontsize=16,color="green",shape="box"];61[label="primMinusInt (Pos wv50) (wv4 * wv31)",fontsize=16,color="black",shape="box"];61 -> 67[label="",style="solid", color="black", weight=3];
62[label="primMinusInt (Neg wv50) (wv4 * wv31)",fontsize=16,color="black",shape="box"];62 -> 68[label="",style="solid", color="black", weight=3];
63[label="Pos (primMulNat wv310 (Succ Zero))",fontsize=16,color="green",shape="box"];63 -> 69[label="",style="dashed", color="green", weight=3];
64[label="Neg (primMulNat wv310 (Succ Zero))",fontsize=16,color="green",shape="box"];64 -> 70[label="",style="dashed", color="green", weight=3];
65[label="primDivNatS0 (Succ wv30000) wv3100 (primGEqNatS (Succ wv30000) wv3100)",fontsize=16,color="burlywood",shape="box"];568[label="wv3100/Succ wv31000",fontsize=10,color="white",style="solid",shape="box"];65 -> 568[label="",style="solid", color="burlywood", weight=9];
568 -> 71[label="",style="solid", color="burlywood", weight=3];
569[label="wv3100/Zero",fontsize=10,color="white",style="solid",shape="box"];65 -> 569[label="",style="solid", color="burlywood", weight=9];
569 -> 72[label="",style="solid", color="burlywood", weight=3];
66[label="primDivNatS0 Zero wv3100 (primGEqNatS Zero wv3100)",fontsize=16,color="burlywood",shape="box"];570[label="wv3100/Succ wv31000",fontsize=10,color="white",style="solid",shape="box"];66 -> 570[label="",style="solid", color="burlywood", weight=9];
570 -> 73[label="",style="solid", color="burlywood", weight=3];
571[label="wv3100/Zero",fontsize=10,color="white",style="solid",shape="box"];66 -> 571[label="",style="solid", color="burlywood", weight=9];
571 -> 74[label="",style="solid", color="burlywood", weight=3];
67[label="primMinusInt (Pos wv50) (primMulInt wv4 wv31)",fontsize=16,color="burlywood",shape="box"];572[label="wv4/Pos wv40",fontsize=10,color="white",style="solid",shape="box"];67 -> 572[label="",style="solid", color="burlywood", weight=9];
572 -> 75[label="",style="solid", color="burlywood", weight=3];
573[label="wv4/Neg wv40",fontsize=10,color="white",style="solid",shape="box"];67 -> 573[label="",style="solid", color="burlywood", weight=9];
573 -> 76[label="",style="solid", color="burlywood", weight=3];
68[label="primMinusInt (Neg wv50) (primMulInt wv4 wv31)",fontsize=16,color="burlywood",shape="box"];574[label="wv4/Pos wv40",fontsize=10,color="white",style="solid",shape="box"];68 -> 574[label="",style="solid", color="burlywood", weight=9];
574 -> 77[label="",style="solid", color="burlywood", weight=3];
575[label="wv4/Neg wv40",fontsize=10,color="white",style="solid",shape="box"];68 -> 575[label="",style="solid", color="burlywood", weight=9];
575 -> 78[label="",style="solid", color="burlywood", weight=3];
69[label="primMulNat wv310 (Succ Zero)",fontsize=16,color="burlywood",shape="triangle"];576[label="wv310/Succ wv3100",fontsize=10,color="white",style="solid",shape="box"];69 -> 576[label="",style="solid", color="burlywood", weight=9];
576 -> 79[label="",style="solid", color="burlywood", weight=3];
577[label="wv310/Zero",fontsize=10,color="white",style="solid",shape="box"];69 -> 577[label="",style="solid", color="burlywood", weight=9];
577 -> 80[label="",style="solid", color="burlywood", weight=3];
70 -> 69[label="",style="dashed", color="red", weight=0];
70[label="primMulNat wv310 (Succ Zero)",fontsize=16,color="magenta"];70 -> 81[label="",style="dashed", color="magenta", weight=3];
71[label="primDivNatS0 (Succ wv30000) (Succ wv31000) (primGEqNatS (Succ wv30000) (Succ wv31000))",fontsize=16,color="black",shape="box"];71 -> 82[label="",style="solid", color="black", weight=3];
72[label="primDivNatS0 (Succ wv30000) Zero (primGEqNatS (Succ wv30000) Zero)",fontsize=16,color="black",shape="box"];72 -> 83[label="",style="solid", color="black", weight=3];
73[label="primDivNatS0 Zero (Succ wv31000) (primGEqNatS Zero (Succ wv31000))",fontsize=16,color="black",shape="box"];73 -> 84[label="",style="solid", color="black", weight=3];
74[label="primDivNatS0 Zero Zero (primGEqNatS Zero Zero)",fontsize=16,color="black",shape="box"];74 -> 85[label="",style="solid", color="black", weight=3];
75[label="primMinusInt (Pos wv50) (primMulInt (Pos wv40) wv31)",fontsize=16,color="burlywood",shape="box"];578[label="wv31/Pos wv310",fontsize=10,color="white",style="solid",shape="box"];75 -> 578[label="",style="solid", color="burlywood", weight=9];
578 -> 86[label="",style="solid", color="burlywood", weight=3];
579[label="wv31/Neg wv310",fontsize=10,color="white",style="solid",shape="box"];75 -> 579[label="",style="solid", color="burlywood", weight=9];
579 -> 87[label="",style="solid", color="burlywood", weight=3];
76[label="primMinusInt (Pos wv50) (primMulInt (Neg wv40) wv31)",fontsize=16,color="burlywood",shape="box"];580[label="wv31/Pos wv310",fontsize=10,color="white",style="solid",shape="box"];76 -> 580[label="",style="solid", color="burlywood", weight=9];
580 -> 88[label="",style="solid", color="burlywood", weight=3];
581[label="wv31/Neg wv310",fontsize=10,color="white",style="solid",shape="box"];76 -> 581[label="",style="solid", color="burlywood", weight=9];
581 -> 89[label="",style="solid", color="burlywood", weight=3];
77[label="primMinusInt (Neg wv50) (primMulInt (Pos wv40) wv31)",fontsize=16,color="burlywood",shape="box"];582[label="wv31/Pos wv310",fontsize=10,color="white",style="solid",shape="box"];77 -> 582[label="",style="solid", color="burlywood", weight=9];
582 -> 90[label="",style="solid", color="burlywood", weight=3];
583[label="wv31/Neg wv310",fontsize=10,color="white",style="solid",shape="box"];77 -> 583[label="",style="solid", color="burlywood", weight=9];
583 -> 91[label="",style="solid", color="burlywood", weight=3];
78[label="primMinusInt (Neg wv50) (primMulInt (Neg wv40) wv31)",fontsize=16,color="burlywood",shape="box"];584[label="wv31/Pos wv310",fontsize=10,color="white",style="solid",shape="box"];78 -> 584[label="",style="solid", color="burlywood", weight=9];
584 -> 92[label="",style="solid", color="burlywood", weight=3];
585[label="wv31/Neg wv310",fontsize=10,color="white",style="solid",shape="box"];78 -> 585[label="",style="solid", color="burlywood", weight=9];
585 -> 93[label="",style="solid", color="burlywood", weight=3];
79[label="primMulNat (Succ wv3100) (Succ Zero)",fontsize=16,color="black",shape="box"];79 -> 94[label="",style="solid", color="black", weight=3];
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85[label="primDivNatS0 Zero Zero True",fontsize=16,color="black",shape="box"];85 -> 100[label="",style="solid", color="black", weight=3];
86[label="primMinusInt (Pos wv50) (primMulInt (Pos wv40) (Pos wv310))",fontsize=16,color="black",shape="box"];86 -> 101[label="",style="solid", color="black", weight=3];
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94 -> 319[label="",style="dashed", color="red", weight=0];
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104 -> 122[label="",style="dashed", color="magenta", weight=3];
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320 -> 334[label="",style="dashed", color="magenta", weight=3];
321[label="Zero",fontsize=16,color="green",shape="box"];319[label="primPlusNat wv12 (Succ wv3100)",fontsize=16,color="burlywood",shape="triangle"];588[label="wv12/Succ wv120",fontsize=10,color="white",style="solid",shape="box"];319 -> 588[label="",style="solid", color="burlywood", weight=9];
588 -> 335[label="",style="solid", color="burlywood", weight=3];
589[label="wv12/Zero",fontsize=10,color="white",style="solid",shape="box"];319 -> 589[label="",style="solid", color="burlywood", weight=9];
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591[label="wv33/Zero",fontsize=10,color="white",style="solid",shape="box"];515 -> 591[label="",style="solid", color="burlywood", weight=9];
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596 -> 144[label="",style="solid", color="burlywood", weight=3];
597[label="wv40/Zero",fontsize=10,color="white",style="solid",shape="box"];124 -> 597[label="",style="solid", color="burlywood", weight=9];
597 -> 145[label="",style="solid", color="burlywood", weight=3];
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335[label="primPlusNat (Succ wv120) (Succ wv3100)",fontsize=16,color="black",shape="box"];335 -> 358[label="",style="solid", color="black", weight=3];
336[label="primPlusNat Zero (Succ wv3100)",fontsize=16,color="black",shape="box"];336 -> 359[label="",style="solid", color="black", weight=3];
517[label="primDivNatS0 (Succ wv30) (Succ wv31) (primGEqNatS (Succ wv320) (Succ wv330))",fontsize=16,color="black",shape="box"];517 -> 521[label="",style="solid", color="black", weight=3];
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520[label="primDivNatS0 (Succ wv30) (Succ wv31) (primGEqNatS Zero Zero)",fontsize=16,color="black",shape="box"];520 -> 524[label="",style="solid", color="black", weight=3];
136[label="primMinusNatS (Succ wv30000) Zero",fontsize=16,color="black",shape="triangle"];136 -> 153[label="",style="solid", color="black", weight=3];
137[label="Zero",fontsize=16,color="green",shape="box"];138[label="primMinusNatS Zero Zero",fontsize=16,color="black",shape="triangle"];138 -> 154[label="",style="solid", color="black", weight=3];
139[label="Zero",fontsize=16,color="green",shape="box"];140[label="primMinusNat (Succ wv500) (primMulNat wv40 wv310)",fontsize=16,color="burlywood",shape="box"];600[label="wv40/Succ wv400",fontsize=10,color="white",style="solid",shape="box"];140 -> 600[label="",style="solid", color="burlywood", weight=9];
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523[label="primDivNatS0 (Succ wv30) (Succ wv31) False",fontsize=16,color="black",shape="box"];523 -> 528[label="",style="solid", color="black", weight=3];
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613[label="wv310/Zero",fontsize=10,color="white",style="solid",shape="box"];156 -> 613[label="",style="solid", color="burlywood", weight=9];
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157[label="primMinusNat Zero (primMulNat (Succ wv400) wv310)",fontsize=16,color="burlywood",shape="box"];614[label="wv310/Succ wv3100",fontsize=10,color="white",style="solid",shape="box"];157 -> 614[label="",style="solid", color="burlywood", weight=9];
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617[label="wv310/Zero",fontsize=10,color="white",style="solid",shape="box"];158 -> 617[label="",style="solid", color="burlywood", weight=9];
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159[label="primPlusNat (Succ wv500) (primMulNat wv40 wv310)",fontsize=16,color="burlywood",shape="box"];618[label="wv40/Succ wv400",fontsize=10,color="white",style="solid",shape="box"];159 -> 618[label="",style="solid", color="burlywood", weight=9];
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619[label="wv40/Zero",fontsize=10,color="white",style="solid",shape="box"];159 -> 619[label="",style="solid", color="burlywood", weight=9];
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160[label="primPlusNat Zero (primMulNat wv40 wv310)",fontsize=16,color="burlywood",shape="box"];620[label="wv40/Succ wv400",fontsize=10,color="white",style="solid",shape="box"];160 -> 620[label="",style="solid", color="burlywood", weight=9];
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621[label="wv40/Zero",fontsize=10,color="white",style="solid",shape="box"];160 -> 621[label="",style="solid", color="burlywood", weight=9];
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165[label="primMinusNat (primMulNat Zero (Succ wv3100)) wv50",fontsize=16,color="black",shape="box"];165 -> 188[label="",style="solid", color="black", weight=3];
166[label="primMinusNat (primMulNat Zero Zero) wv50",fontsize=16,color="black",shape="box"];166 -> 189[label="",style="solid", color="black", weight=3];
292 -> 319[label="",style="dashed", color="red", weight=0];
292[label="primPlusNat (primMulNat wv4000 (Succ wv3100)) (Succ wv3100)",fontsize=16,color="magenta"];292 -> 329[label="",style="dashed", color="magenta", weight=3];
292 -> 330[label="",style="dashed", color="magenta", weight=3];
293[label="Zero",fontsize=16,color="green",shape="box"];375 -> 360[label="",style="dashed", color="red", weight=0];
375[label="primPlusNat wv120 wv3100",fontsize=16,color="magenta"];375 -> 395[label="",style="dashed", color="magenta", weight=3];
525[label="wv320",fontsize=16,color="green",shape="box"];526[label="wv330",fontsize=16,color="green",shape="box"];527[label="Succ (primDivNatS (primMinusNatS (Succ wv30) (Succ wv31)) (Succ (Succ wv31)))",fontsize=16,color="green",shape="box"];527 -> 529[label="",style="dashed", color="green", weight=3];
528[label="Zero",fontsize=16,color="green",shape="box"];174[label="primMinusNat (Succ wv500) (primMulNat (Succ wv400) (Succ wv3100))",fontsize=16,color="black",shape="box"];174 -> 200[label="",style="solid", color="black", weight=3];
175[label="primMinusNat (Succ wv500) (primMulNat (Succ wv400) Zero)",fontsize=16,color="black",shape="box"];175 -> 201[label="",style="solid", color="black", weight=3];
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177[label="primMinusNat (Succ wv500) (primMulNat Zero Zero)",fontsize=16,color="black",shape="box"];177 -> 203[label="",style="solid", color="black", weight=3];
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215[label="primPlusNat Zero (primMulNat Zero Zero)",fontsize=16,color="black",shape="box"];215 -> 243[label="",style="solid", color="black", weight=3];
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219[label="primMinusNat Zero Zero",fontsize=16,color="black",shape="box"];219 -> 247[label="",style="solid", color="black", weight=3];
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241 -> 264[label="",style="dashed", color="red", weight=0];
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242 -> 264[label="",style="dashed", color="red", weight=0];
242[label="primPlusNat Zero Zero",fontsize=16,color="magenta"];242 -> 267[label="",style="dashed", color="magenta", weight=3];
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537[label="primMinusNatS Zero (Succ wv310)",fontsize=16,color="black",shape="box"];537 -> 541[label="",style="solid", color="black", weight=3];
538[label="primMinusNatS Zero Zero",fontsize=16,color="black",shape="box"];538 -> 542[label="",style="solid", color="black", weight=3];
338[label="wv500",fontsize=16,color="green",shape="box"];339[label="Succ (Succ (primPlusNat wv100 wv3100))",fontsize=16,color="green",shape="box"];339 -> 360[label="",style="dashed", color="green", weight=3];
340[label="wv500",fontsize=16,color="green",shape="box"];341[label="Succ wv3100",fontsize=16,color="green",shape="box"];342[label="Succ (Succ (primPlusNat wv500 wv70))",fontsize=16,color="green",shape="box"];342 -> 361[label="",style="dashed", color="green", weight=3];
343[label="Succ wv500",fontsize=16,color="green",shape="box"];344[label="Succ wv80",fontsize=16,color="green",shape="box"];345[label="Zero",fontsize=16,color="green",shape="box"];347 -> 295[label="",style="dashed", color="red", weight=0];
347[label="primMinusNat (Succ (primPlusNat wv90 wv3100)) wv500",fontsize=16,color="magenta"];347 -> 362[label="",style="dashed", color="magenta", weight=3];
347 -> 363[label="",style="dashed", color="magenta", weight=3];
348[label="Pos (Succ (Succ (primPlusNat wv90 wv3100)))",fontsize=16,color="green",shape="box"];348 -> 364[label="",style="dashed", color="green", weight=3];
349[label="primMinusNat wv3100 wv500",fontsize=16,color="burlywood",shape="triangle"];656[label="wv3100/Succ wv31000",fontsize=10,color="white",style="solid",shape="box"];349 -> 656[label="",style="solid", color="burlywood", weight=9];
656 -> 365[label="",style="solid", color="burlywood", weight=3];
657[label="wv3100/Zero",fontsize=10,color="white",style="solid",shape="box"];349 -> 657[label="",style="solid", color="burlywood", weight=9];
657 -> 366[label="",style="solid", color="burlywood", weight=3];
350[label="Pos (Succ wv3100)",fontsize=16,color="green",shape="box"];430[label="wv1000",fontsize=16,color="green",shape="box"];431[label="wv31000",fontsize=16,color="green",shape="box"];539 -> 532[label="",style="dashed", color="red", weight=0];
539[label="primMinusNatS wv300 wv310",fontsize=16,color="magenta"];539 -> 543[label="",style="dashed", color="magenta", weight=3];
539 -> 544[label="",style="dashed", color="magenta", weight=3];
540[label="Succ wv300",fontsize=16,color="green",shape="box"];541[label="Zero",fontsize=16,color="green",shape="box"];542[label="Zero",fontsize=16,color="green",shape="box"];361 -> 360[label="",style="dashed", color="red", weight=0];
361[label="primPlusNat wv500 wv70",fontsize=16,color="magenta"];361 -> 378[label="",style="dashed", color="magenta", weight=3];
361 -> 379[label="",style="dashed", color="magenta", weight=3];
362 -> 360[label="",style="dashed", color="red", weight=0];
362[label="primPlusNat wv90 wv3100",fontsize=16,color="magenta"];362 -> 380[label="",style="dashed", color="magenta", weight=3];
362 -> 381[label="",style="dashed", color="magenta", weight=3];
363[label="wv500",fontsize=16,color="green",shape="box"];364 -> 360[label="",style="dashed", color="red", weight=0];
364[label="primPlusNat wv90 wv3100",fontsize=16,color="magenta"];364 -> 382[label="",style="dashed", color="magenta", weight=3];
364 -> 383[label="",style="dashed", color="magenta", weight=3];
365[label="primMinusNat (Succ wv31000) wv500",fontsize=16,color="burlywood",shape="box"];658[label="wv500/Succ wv5000",fontsize=10,color="white",style="solid",shape="box"];365 -> 658[label="",style="solid", color="burlywood", weight=9];
658 -> 384[label="",style="solid", color="burlywood", weight=3];
659[label="wv500/Zero",fontsize=10,color="white",style="solid",shape="box"];365 -> 659[label="",style="solid", color="burlywood", weight=9];
659 -> 385[label="",style="solid", color="burlywood", weight=3];
366[label="primMinusNat Zero wv500",fontsize=16,color="burlywood",shape="box"];660[label="wv500/Succ wv5000",fontsize=10,color="white",style="solid",shape="box"];366 -> 660[label="",style="solid", color="burlywood", weight=9];
660 -> 386[label="",style="solid", color="burlywood", weight=3];
661[label="wv500/Zero",fontsize=10,color="white",style="solid",shape="box"];366 -> 661[label="",style="solid", color="burlywood", weight=9];
661 -> 387[label="",style="solid", color="burlywood", weight=3];
543[label="wv310",fontsize=16,color="green",shape="box"];544[label="wv300",fontsize=16,color="green",shape="box"];378[label="wv500",fontsize=16,color="green",shape="box"];379[label="wv70",fontsize=16,color="green",shape="box"];380[label="wv90",fontsize=16,color="green",shape="box"];381[label="wv3100",fontsize=16,color="green",shape="box"];382[label="wv90",fontsize=16,color="green",shape="box"];383[label="wv3100",fontsize=16,color="green",shape="box"];384[label="primMinusNat (Succ wv31000) (Succ wv5000)",fontsize=16,color="black",shape="box"];384 -> 400[label="",style="solid", color="black", weight=3];
385[label="primMinusNat (Succ wv31000) Zero",fontsize=16,color="black",shape="box"];385 -> 401[label="",style="solid", color="black", weight=3];
386[label="primMinusNat Zero (Succ wv5000)",fontsize=16,color="black",shape="box"];386 -> 402[label="",style="solid", color="black", weight=3];
387[label="primMinusNat Zero Zero",fontsize=16,color="black",shape="box"];387 -> 403[label="",style="solid", color="black", weight=3];
400 -> 349[label="",style="dashed", color="red", weight=0];
400[label="primMinusNat wv31000 wv5000",fontsize=16,color="magenta"];400 -> 415[label="",style="dashed", color="magenta", weight=3];
400 -> 416[label="",style="dashed", color="magenta", weight=3];
401[label="Pos (Succ wv31000)",fontsize=16,color="green",shape="box"];402[label="Neg (Succ wv5000)",fontsize=16,color="green",shape="box"];403[label="Pos Zero",fontsize=16,color="green",shape="box"];415[label="wv31000",fontsize=16,color="green",shape="box"];416[label="wv5000",fontsize=16,color="green",shape="box"];}

----------------------------------------

(10)
Complex Obligation (AND)

----------------------------------------

(11)
Obligation:
Q DP problem:
The TRS P consists of the following rules:

   new_primMulNat(Succ(wv4000), wv3100) -> new_primMulNat(wv4000, wv3100)

R is empty.
Q is empty.
We have to consider all minimal (P,Q,R)-chains.
----------------------------------------

(12) QDPSizeChangeProof (EQUIVALENT)
By using the subterm criterion [SUBTERM_CRITERION] together with the size-change analysis [AAECC05] we have proven that there are no infinite chains for this DP problem. 

From the DPs we obtained the following set of size-change graphs:
*new_primMulNat(Succ(wv4000), wv3100) -> new_primMulNat(wv4000, wv3100)
The graph contains the following edges 1 > 1, 2 >= 2


----------------------------------------

(13)
YES

----------------------------------------

(14)
Obligation:
Q DP problem:
The TRS P consists of the following rules:

   new_primDivNatS(Succ(Succ(wv30000)), Succ(wv31000)) -> new_primDivNatS0(wv30000, wv31000, wv30000, wv31000)
   new_primDivNatS0(wv30, wv31, Succ(wv320), Zero) -> new_primDivNatS(new_primMinusNatS0(wv30, wv31), Succ(wv31))
   new_primDivNatS0(wv30, wv31, Zero, Zero) -> new_primDivNatS00(wv30, wv31)
   new_primDivNatS0(wv30, wv31, Succ(wv320), Succ(wv330)) -> new_primDivNatS0(wv30, wv31, wv320, wv330)
   new_primDivNatS(Succ(Zero), Zero) -> new_primDivNatS(new_primMinusNatS2, Zero)
   new_primDivNatS(Succ(Succ(wv30000)), Zero) -> new_primDivNatS(new_primMinusNatS1(wv30000), Zero)
   new_primDivNatS00(wv30, wv31) -> new_primDivNatS(new_primMinusNatS0(wv30, wv31), Succ(wv31))

The TRS R consists of the following rules:

   new_primMinusNatS0(Zero, Succ(wv310)) -> Zero
   new_primMinusNatS0(Zero, Zero) -> Zero
   new_primMinusNatS1(wv30000) -> Succ(wv30000)
   new_primMinusNatS2 -> Zero
   new_primMinusNatS0(Succ(wv300), Succ(wv310)) -> new_primMinusNatS0(wv300, wv310)
   new_primMinusNatS0(Succ(wv300), Zero) -> Succ(wv300)

The set Q consists of the following terms:

   new_primMinusNatS0(Zero, Zero)
   new_primMinusNatS2
   new_primMinusNatS1(x0)
   new_primMinusNatS0(Succ(x0), Zero)
   new_primMinusNatS0(Zero, Succ(x0))
   new_primMinusNatS0(Succ(x0), Succ(x1))

We have to consider all minimal (P,Q,R)-chains.
----------------------------------------

(15) DependencyGraphProof (EQUIVALENT)
The approximation of the Dependency Graph [LPAR04,FROCOS05,EDGSTAR] contains 2 SCCs with 1 less node.
----------------------------------------

(16)
Complex Obligation (AND)

----------------------------------------

(17)
Obligation:
Q DP problem:
The TRS P consists of the following rules:

   new_primDivNatS(Succ(Succ(wv30000)), Zero) -> new_primDivNatS(new_primMinusNatS1(wv30000), Zero)

The TRS R consists of the following rules:

   new_primMinusNatS0(Zero, Succ(wv310)) -> Zero
   new_primMinusNatS0(Zero, Zero) -> Zero
   new_primMinusNatS1(wv30000) -> Succ(wv30000)
   new_primMinusNatS2 -> Zero
   new_primMinusNatS0(Succ(wv300), Succ(wv310)) -> new_primMinusNatS0(wv300, wv310)
   new_primMinusNatS0(Succ(wv300), Zero) -> Succ(wv300)

The set Q consists of the following terms:

   new_primMinusNatS0(Zero, Zero)
   new_primMinusNatS2
   new_primMinusNatS1(x0)
   new_primMinusNatS0(Succ(x0), Zero)
   new_primMinusNatS0(Zero, Succ(x0))
   new_primMinusNatS0(Succ(x0), Succ(x1))

We have to consider all minimal (P,Q,R)-chains.
----------------------------------------

(18) MRRProof (EQUIVALENT)
By using the rule removal processor [LPAR04] with the following ordering, at least one Dependency Pair or term rewrite system rule of this QDP problem can be strictly oriented.

Strictly oriented dependency pairs:

   new_primDivNatS(Succ(Succ(wv30000)), Zero) -> new_primDivNatS(new_primMinusNatS1(wv30000), Zero)

Strictly oriented rules of the TRS R:

   new_primMinusNatS0(Zero, Succ(wv310)) -> Zero
   new_primMinusNatS0(Zero, Zero) -> Zero
   new_primMinusNatS1(wv30000) -> Succ(wv30000)
   new_primMinusNatS2 -> Zero
   new_primMinusNatS0(Succ(wv300), Succ(wv310)) -> new_primMinusNatS0(wv300, wv310)
   new_primMinusNatS0(Succ(wv300), Zero) -> Succ(wv300)

Used ordering: Polynomial interpretation [POLO]:

   POL(Succ(x_1)) = 1 + 2*x_1
   POL(Zero) = 1
   POL(new_primDivNatS(x_1, x_2)) = x_1 + x_2
   POL(new_primMinusNatS0(x_1, x_2)) = x_1 + x_2
   POL(new_primMinusNatS1(x_1)) = 2 + 2*x_1
   POL(new_primMinusNatS2) = 2


----------------------------------------

(19)
Obligation:
Q DP problem:
P is empty.
R is empty.
The set Q consists of the following terms:

   new_primMinusNatS0(Zero, Zero)
   new_primMinusNatS2
   new_primMinusNatS1(x0)
   new_primMinusNatS0(Succ(x0), Zero)
   new_primMinusNatS0(Zero, Succ(x0))
   new_primMinusNatS0(Succ(x0), Succ(x1))

We have to consider all minimal (P,Q,R)-chains.
----------------------------------------

(20) PisEmptyProof (EQUIVALENT)
The TRS P is empty. Hence, there is no (P,Q,R) chain.
----------------------------------------

(21)
YES

----------------------------------------

(22)
Obligation:
Q DP problem:
The TRS P consists of the following rules:

   new_primDivNatS0(wv30, wv31, Succ(wv320), Zero) -> new_primDivNatS(new_primMinusNatS0(wv30, wv31), Succ(wv31))
   new_primDivNatS(Succ(Succ(wv30000)), Succ(wv31000)) -> new_primDivNatS0(wv30000, wv31000, wv30000, wv31000)
   new_primDivNatS0(wv30, wv31, Zero, Zero) -> new_primDivNatS00(wv30, wv31)
   new_primDivNatS00(wv30, wv31) -> new_primDivNatS(new_primMinusNatS0(wv30, wv31), Succ(wv31))
   new_primDivNatS0(wv30, wv31, Succ(wv320), Succ(wv330)) -> new_primDivNatS0(wv30, wv31, wv320, wv330)

The TRS R consists of the following rules:

   new_primMinusNatS0(Zero, Succ(wv310)) -> Zero
   new_primMinusNatS0(Zero, Zero) -> Zero
   new_primMinusNatS1(wv30000) -> Succ(wv30000)
   new_primMinusNatS2 -> Zero
   new_primMinusNatS0(Succ(wv300), Succ(wv310)) -> new_primMinusNatS0(wv300, wv310)
   new_primMinusNatS0(Succ(wv300), Zero) -> Succ(wv300)

The set Q consists of the following terms:

   new_primMinusNatS0(Zero, Zero)
   new_primMinusNatS2
   new_primMinusNatS1(x0)
   new_primMinusNatS0(Succ(x0), Zero)
   new_primMinusNatS0(Zero, Succ(x0))
   new_primMinusNatS0(Succ(x0), Succ(x1))

We have to consider all minimal (P,Q,R)-chains.
----------------------------------------

(23) QDPSizeChangeProof (EQUIVALENT)
We used the following order together with the size-change analysis [AAECC05] to show that there are no infinite chains for this DP problem. 

Order:Polynomial interpretation [POLO]:

   POL(Succ(x_1)) = 1 + x_1
   POL(Zero) = 1
   POL(new_primMinusNatS0(x_1, x_2)) = x_1




From the DPs we obtained the following set of size-change graphs:
*new_primDivNatS(Succ(Succ(wv30000)), Succ(wv31000)) -> new_primDivNatS0(wv30000, wv31000, wv30000, wv31000) (allowed arguments on rhs = {1, 2, 3, 4})
The graph contains the following edges 1 > 1, 2 > 2, 1 > 3, 2 > 4


*new_primDivNatS0(wv30, wv31, Succ(wv320), Succ(wv330)) -> new_primDivNatS0(wv30, wv31, wv320, wv330) (allowed arguments on rhs = {1, 2, 3, 4})
The graph contains the following edges 1 >= 1, 2 >= 2, 3 > 3, 4 > 4


*new_primDivNatS0(wv30, wv31, Succ(wv320), Zero) -> new_primDivNatS(new_primMinusNatS0(wv30, wv31), Succ(wv31)) (allowed arguments on rhs = {1, 2})
The graph contains the following edges 1 >= 1


*new_primDivNatS0(wv30, wv31, Zero, Zero) -> new_primDivNatS00(wv30, wv31) (allowed arguments on rhs = {1, 2})
The graph contains the following edges 1 >= 1, 2 >= 2


*new_primDivNatS00(wv30, wv31) -> new_primDivNatS(new_primMinusNatS0(wv30, wv31), Succ(wv31)) (allowed arguments on rhs = {1, 2})
The graph contains the following edges 1 >= 1



We oriented the following set of usable rules [AAECC05,FROCOS05].

   new_primMinusNatS0(Zero, Zero) -> Zero
   new_primMinusNatS0(Zero, Succ(wv310)) -> Zero
   new_primMinusNatS0(Succ(wv300), Zero) -> Succ(wv300)
   new_primMinusNatS0(Succ(wv300), Succ(wv310)) -> new_primMinusNatS0(wv300, wv310)

----------------------------------------

(24)
YES

----------------------------------------

(25)
Obligation:
Q DP problem:
The TRS P consists of the following rules:

   new_primMinusNatS(Succ(wv300), Succ(wv310)) -> new_primMinusNatS(wv300, wv310)

R is empty.
Q is empty.
We have to consider all minimal (P,Q,R)-chains.
----------------------------------------

(26) QDPSizeChangeProof (EQUIVALENT)
By using the subterm criterion [SUBTERM_CRITERION] together with the size-change analysis [AAECC05] we have proven that there are no infinite chains for this DP problem. 

From the DPs we obtained the following set of size-change graphs:
*new_primMinusNatS(Succ(wv300), Succ(wv310)) -> new_primMinusNatS(wv300, wv310)
The graph contains the following edges 1 > 1, 2 > 2


----------------------------------------

(27)
YES

----------------------------------------

(28)
Obligation:
Q DP problem:
The TRS P consists of the following rules:

   new_primPlusNat(Succ(wv1000), Succ(wv31000)) -> new_primPlusNat(wv1000, wv31000)

R is empty.
Q is empty.
We have to consider all minimal (P,Q,R)-chains.
----------------------------------------

(29) QDPSizeChangeProof (EQUIVALENT)
By using the subterm criterion [SUBTERM_CRITERION] together with the size-change analysis [AAECC05] we have proven that there are no infinite chains for this DP problem. 

From the DPs we obtained the following set of size-change graphs:
*new_primPlusNat(Succ(wv1000), Succ(wv31000)) -> new_primPlusNat(wv1000, wv31000)
The graph contains the following edges 1 > 1, 2 > 2


----------------------------------------

(30)
YES

----------------------------------------

(31)
Obligation:
Q DP problem:
The TRS P consists of the following rules:

   new_primMinusNat(Succ(wv31000), Succ(wv5000)) -> new_primMinusNat(wv31000, wv5000)

R is empty.
Q is empty.
We have to consider all minimal (P,Q,R)-chains.
----------------------------------------

(32) QDPSizeChangeProof (EQUIVALENT)
By using the subterm criterion [SUBTERM_CRITERION] together with the size-change analysis [AAECC05] we have proven that there are no infinite chains for this DP problem. 

From the DPs we obtained the following set of size-change graphs:
*new_primMinusNat(Succ(wv31000), Succ(wv5000)) -> new_primMinusNat(wv31000, wv5000)
The graph contains the following edges 1 > 1, 2 > 2


----------------------------------------

(33)
YES