28.07/7.12 YES 28.07/7.12 property Termination 28.07/7.12 has value True 28.07/7.12 for SRS ( [a] -> [b], [a, b] -> [b, a, c, a], [b] -> [c], [c, c] -> []) 28.07/7.12 reason 28.07/7.12 remap for 4 rules 28.07/7.12 property Termination 28.07/7.12 has value True 28.07/7.12 for SRS ( [0] -> [1], [0, 1] -> [1, 0, 2, 0], [1] -> [2], [2, 2] -> []) 28.07/7.12 reason 28.07/7.12 DP transform 28.07/7.12 property Termination 28.07/7.12 has value True 28.07/7.13 for SRS ( [0] ->= [1], [0, 1] ->= [1, 0, 2, 0], [1] ->= [2], [2, 2] ->= [], [0#] |-> [1#], [0#, 1] |-> [1#, 0, 2, 0], [0#, 1] |-> [0#, 2, 0], [0#, 1] |-> [2#, 0], [0#, 1] |-> [0#], [1#] |-> [2#]) 28.07/7.13 reason 28.07/7.13 remap for 10 rules 28.07/7.13 property Termination 28.07/7.13 has value True 28.07/7.13 for SRS ( [0] ->= [1], [0, 1] ->= [1, 0, 2, 0], [1] ->= [2], [2, 2] ->= [], [3] |-> [4], [3, 1] |-> [4, 0, 2, 0], [3, 1] |-> [3, 2, 0], [3, 1] |-> [5, 0], [3, 1] |-> [3], [4] |-> [5]) 28.07/7.13 reason 28.07/7.14 weights 28.07/7.14 Map [(3, 2/1), (4, 1/1)] 28.07/7.14 28.07/7.14 property Termination 28.07/7.14 has value True 28.07/7.14 for SRS ( [0] ->= [1], [0, 1] ->= [1, 0, 2, 0], [1] ->= [2], [2, 2] ->= [], [3, 1] |-> [3, 2, 0], [3, 1] |-> [3]) 28.07/7.14 reason 28.07/7.14 EDG has 1 SCCs 28.07/7.14 property Termination 28.07/7.14 has value True 28.07/7.14 for SRS ( [3, 1] |-> [3, 2, 0], [3, 1] |-> [3], [0] ->= [1], [0, 1] ->= [1, 0, 2, 0], [1] ->= [2], [2, 2] ->= []) 28.07/7.14 reason 28.07/7.14 Matrix { monotone = Weak, domain = Arctic, bits = 3, dim = 4, solver = Minisatapi, verbose = False, tracing = False} 28.07/7.14 interpretation 28.07/7.14 0 Wk / - 0A 0A 0A \ 28.07/7.14 | 0A 2A 2A 4A | 28.07/7.14 | 0A 2A 2A 3A | 28.07/7.14 \ - - - 0A / 28.07/7.15 1 Wk / - 0A 0A 0A \ 28.07/7.15 | 0A 2A 0A 4A | 28.07/7.15 | 0A 2A 2A 3A | 28.07/7.15 \ - - - 0A / 28.07/7.16 2 Wk / - 0A 0A 0A \ 28.07/7.16 | 0A - - 2A | 28.07/7.16 | 0A - - 2A | 28.07/7.16 \ - - - 0A / 28.07/7.16 3 Wk / - - 1A 1A \ 28.07/7.16 | - - - - | 28.07/7.16 | - 3A 3A 5A | 28.07/7.16 \ - - - 0A / 28.07/7.16 [3, 1] |-> [3, 2, 0] 28.36/7.18 lhs rhs ge gt 28.36/7.18 Wk / 1A 3A 3A 4A \ Wk / - 1A 1A 3A \ True True 28.36/7.18 | - - - - | | - - - - | 28.36/7.18 | 3A 5A 5A 7A | | - 3A 3A 5A | 28.36/7.18 \ - - - 0A / \ - - - 0A / 28.36/7.18 [3, 1] |-> [3] 28.36/7.18 lhs rhs ge gt 28.36/7.18 Wk / 1A 3A 3A 4A \ Wk / - - 1A 1A \ True True 28.36/7.18 | - - - - | | - - - - | 28.36/7.18 | 3A 5A 5A 7A | | - 3A 3A 5A | 28.36/7.18 \ - - - 0A / \ - - - 0A / 28.36/7.18 [0] ->= [1] 28.36/7.19 lhs rhs ge gt 28.36/7.19 Wk / - 0A 0A 0A \ Wk / - 0A 0A 0A \ True False 28.36/7.19 | 0A 2A 2A 4A | | 0A 2A 0A 4A | 28.36/7.19 | 0A 2A 2A 3A | | 0A 2A 2A 3A | 28.36/7.19 \ - - - 0A / \ - - - 0A / 28.36/7.19 [0, 1] ->= [1, 0, 2, 0] 28.36/7.19 lhs rhs ge gt 28.36/7.19 Wk / 0A 2A 2A 4A \ Wk / 0A 2A 2A 4A \ True False 28.36/7.19 | 2A 4A 4A 6A | | 2A 4A 4A 6A | 28.36/7.19 | 2A 4A 4A 6A | | 2A 4A 4A 6A | 28.36/7.19 \ - - - 0A / \ - - - 0A / 28.36/7.19 [1] ->= [2] 28.36/7.20 lhs rhs ge gt 28.36/7.20 Wk / - 0A 0A 0A \ Wk / - 0A 0A 0A \ True False 28.36/7.20 | 0A 2A 0A 4A | | 0A - - 2A | 28.36/7.20 | 0A 2A 2A 3A | | 0A - - 2A | 28.36/7.20 \ - - - 0A / \ - - - 0A / 28.36/7.20 [2, 2] ->= [] 28.36/7.20 lhs rhs ge gt 28.36/7.20 Wk / 0A - - 2A \ Wk / 0A - - - \ True False 28.36/7.20 | - 0A 0A 2A | | - 0A - - | 28.36/7.20 | - 0A 0A 2A | | - - 0A - | 28.36/7.20 \ - - - 0A / \ - - - 0A / 28.36/7.20 property Termination 28.36/7.20 has value True 28.36/7.20 for SRS ( [0] ->= [1], [0, 1] ->= [1, 0, 2, 0], [1] ->= [2], [2, 2] ->= []) 28.36/7.20 reason 28.36/7.21 EDG has 0 SCCs 28.36/7.21 28.36/7.21 ************************************************** 28.36/7.21 summary 28.36/7.21 ************************************************** 28.36/7.21 SRS with 4 rules on 3 letters Remap { tracing = False} 28.36/7.21 SRS with 4 rules on 3 letters DP transform 28.36/7.21 SRS with 10 rules on 6 letters Remap { tracing = False} 28.36/7.21 SRS with 10 rules on 6 letters weights 28.36/7.21 SRS with 6 rules on 4 letters EDG 28.36/7.21 SRS with 6 rules on 4 letters Matrix { monotone = Weak, domain = Arctic, bits = 3, dim = 4, solver = Minisatapi, verbose = False, tracing = False} 28.36/7.21 SRS with 4 rules on 3 letters EDG 28.36/7.21 28.36/7.21 ************************************************** 28.50/7.21 (4, 3)\Deepee(10, 6)\Weight(6, 4)\Matrix{\Arctic}{4}(4, 3)\EDG[] 28.50/7.21 ************************************************** 28.62/7.25 let { done = Worker No_Strict_Rules;mo = Pre (Or_Else Count (IfSizeLeq 10000 GLPK Fail));wop = Or_Else (Worker (Weight { modus = mo})) Pass;weighted = \ m -> And_Then m wop;tiling = \ m w -> weighted (And_Then (Worker (Tiling { method = m,width = w})) (Worker Remap));when_small = \ m -> And_Then (Worker (SizeAtmost 100)) m;when_medium = \ m -> And_Then (Worker (SizeAtmost 10000)) m;solver = Minisatapi;qpi = \ dim bits -> weighted (when_small (Worker (QPI { tracing = True,dim = dim,bits = bits,solver = solver})));matrix = \ dom dim bits -> weighted (when_small (Worker (Matrix { monotone = Weak,domain = dom,dim = dim,bits = bits,tracing = False,solver = solver})));kbo = \ b -> weighted (when_small (Worker (KBO { bits = b,solver = solver})));mb = Worker (Matchbound { method = RFC,max_size = 100000});remove = First_Of ([ Worker (Weight { modus = mo})] <> ([ Seq [ qpi 2 4, qpi 3 4, qpi 4 4], Seq [ qpi 5 4, qpi 6 3, qpi 7 3]] <> ([ matrix Arctic 4 3, matrix Natural 4 3] <> [ kbo 1, And_Then (Worker Mirror) (kbo 1)])));remove_tile = Seq [ remove, tiling Overlap 3];dp = As_Transformer (Apply (And_Then (Worker (DP { tracing = False})) (Worker Remap)) (Apply wop (Branch (Worker (EDG { tracing = False})) remove_tile)));noh = [ Timeout 10 (Worker (Enumerate { closure = Forward})), Timeout 10 (Worker (Enumerate { closure = Backward}))];yeah = Tree_Search_Preemptive 0 done [ Worker (Weight { modus = mo}), mb, And_Then (Worker Mirror) mb, dp, And_Then (Worker Mirror) dp]} 28.62/7.25 in Apply (Worker Remap) (First_Of ([ yeah] <> noh)) 28.81/7.36 EOF