/export/starexec/sandbox/solver/bin/starexec_run_tc21-9.sh /export/starexec/sandbox/benchmark/theBenchmark.xml /export/starexec/sandbox/output/output_files -------------------------------------------------------------------------------- YES ************************************************** summary ************************************************** SRS with 8 rules on 5 letters weights SRS with 7 rules on 5 letters DP SRS with 16 strict rules and 7 weak rules on 9 letters weights SRS with 6 strict rules and 7 weak rules on 9 letters EDG 4 sub-proofs 1 SRS with 1 strict rules and 1 weak rules on 3 letters Usable SRS with 1 strict rules and 1 weak rules on 3 letters weights SRS with 0 rules on 0 letters no strict rules 2 SRS with 1 strict rules and 1 weak rules on 3 letters Usable SRS with 1 strict rules and 1 weak rules on 3 letters weights SRS with 0 rules on 0 letters no strict rules 3 SRS with 1 strict rules and 6 weak rules on 5 letters Usable SRS with 1 strict rules and 6 weak rules on 5 letters Matrix { monotone = Weak, domain = Arctic, shape = Full, bits = 8, encoding = Ersatz_Binary, dim = 4, solver = Minisatapi, verbose = True, tracing = False} SRS with 0 strict rules and 6 weak rules on 4 letters weights SRS with 0 strict rules and 5 weak rules on 4 letters EDG 4 SRS with 3 strict rules and 6 weak rules on 5 letters Usable SRS with 3 strict rules and 6 weak rules on 5 letters weights SRS with 2 strict rules and 5 weak rules on 5 letters tile all, by Config { method = Overlap,width = 2,unlabel = True} SRS with 10 strict rules and 78 weak rules on 18 letters weights SRS with 0 strict rules and 49 weak rules on 13 letters no strict rules ************************************************** proof ************************************************** property Termination has value Just True for SRS [log, s] -> [s, log, half, s] {- Input 0 -} [half, 0] -> [0, s, s, half] {- Input 1 -} [half, s, 0] -> [0] {- Input 2 -} [half, s, s] -> [s, half, p, s, s] {- Input 3 -} [half, half, s, s, s, s] -> [s, s, half, half] {- Input 4 -} [p, s, s, s] -> [s, p, s, s] {- Input 5 -} [s, s, p, s] -> [s, s] {- Input 6 -} [0] -> [] {- Input 7 -} reason (0, 1/1) property Termination has value Just True for SRS [log, s] -> [s, log, half, s] {- Input 0 -} [half, 0] -> [0, s, s, half] {- Input 1 -} [half, s, 0] -> [0] {- Input 2 -} [half, s, s] -> [s, half, p, s, s] {- Input 3 -} [half, half, s, s, s, s] -> [s, s, half, half] {- Input 4 -} [p, s, s, s] -> [s, p, s, s] {- Input 5 -} [s, s, p, s] -> [s, s] {- Input 6 -} reason DP property Termination has value Just True for SRS [log, s] ->= [s, log, half, s] {- DP Nontop (Input 0) -} [half, 0] ->= [0, s, s, half] {- DP Nontop (Input 1) -} [half, s, 0] ->= [0] {- DP Nontop (Input 2) -} [half, s, s] ->= [s, half, p, s, s] {- DP Nontop (Input 3) -} [half, half, s, s, s, s] ->= [s, s, half, half] {- DP Nontop (Input 4) -} [p, s, s, s] ->= [s, p, s, s] {- DP Nontop (Input 5) -} [s, s, p, s] ->= [s, s] {- DP Nontop (Input 6) -} [log#, s] |-> [log#, half, s] {- DP (Top 1) (Input 0) -} [log#, s] |-> [s#, log, half, s] {- DP (Top 0) (Input 0) -} [log#, s] |-> [half#, s] {- DP (Top 2) (Input 0) -} [s#, s, p, s] |-> [s#, s] {- DP (Top 0) (Input 6) -} [half#, s, s] |-> [s#, half, p, s, s] {- DP (Top 0) (Input 3) -} [half#, s, s] |-> [half#, p, s, s] {- DP (Top 1) (Input 3) -} [half#, s, s] |-> [p#, s, s] {- DP (Top 2) (Input 3) -} [half#, half, s, s, s, s] |-> [s#, s, half, half] {- DP (Top 0) (Input 4) -} [half#, half, s, s, s, s] |-> [s#, half, half] {- DP (Top 1) (Input 4) -} [half#, half, s, s, s, s] |-> [half#] {- DP (Top 3) (Input 4) -} [half#, half, s, s, s, s] |-> [half#, half] {- DP (Top 2) (Input 4) -} [half#, 0] |-> [s#, s, half] {- DP (Top 1) (Input 1) -} [half#, 0] |-> [s#, half] {- DP (Top 2) (Input 1) -} [half#, 0] |-> [half#] {- DP (Top 3) (Input 1) -} [p#, s, s, s] |-> [s#, p, s, s] {- DP (Top 0) (Input 5) -} [p#, s, s, s] |-> [p#, s, s] {- DP (Top 1) (Input 5) -} reason (0, 9/2) (log#, 3/1) (half#, 2/1) (p#, 1/1) property Termination has value Just True for SRS [log, s] ->= [s, log, half, s] {- DP Nontop (Input 0) -} [half, 0] ->= [0, s, s, half] {- DP Nontop (Input 1) -} [half, s, 0] ->= [0] {- DP Nontop (Input 2) -} [half, s, s] ->= [s, half, p, s, s] {- DP Nontop (Input 3) -} [half, half, s, s, s, s] ->= [s, s, half, half] {- DP Nontop (Input 4) -} [p, s, s, s] ->= [s, p, s, s] {- DP Nontop (Input 5) -} [s, s, p, s] ->= [s, s] {- DP Nontop (Input 6) -} [log#, s] |-> [log#, half, s] {- DP (Top 1) (Input 0) -} [s#, s, p, s] |-> [s#, s] {- DP (Top 0) (Input 6) -} [half#, s, s] |-> [half#, p, s, s] {- DP (Top 1) (Input 3) -} [half#, half, s, s, s, s] |-> [half#] {- DP (Top 3) (Input 4) -} [half#, half, s, s, s, s] |-> [half#, half] {- DP (Top 2) (Input 4) -} [p#, s, s, s] |-> [p#, s, s] {- DP (Top 1) (Input 5) -} reason EDG property Termination has value Just True for SRS [s#, s, p, s] |-> [s#, s] {- DP (Top 0) (Input 6) -} [s, s, p, s] ->= [s, s] {- DP Nontop (Input 6) -} reason Usable property Termination has value Just True for SRS [s#, s, p, s] |-> [s#, s] {- DP (Top 0) (Input 6) -} [s, s, p, s] ->= [s, s] {- DP Nontop (Input 6) -} reason (s, 1/1) (p, 1/1) property Termination has value Just True for SRS reason no strict rules property Termination has value Just True for SRS [p#, s, s, s] |-> [p#, s, s] {- DP (Top 1) (Input 5) -} [s, s, p, s] ->= [s, s] {- DP Nontop (Input 6) -} reason Usable property Termination has value Just True for SRS [p#, s, s, s] |-> [p#, s, s] {- DP (Top 1) (Input 5) -} [s, s, p, s] ->= [s, s] {- DP Nontop (Input 6) -} reason (s, 2/1) (p, 1/1) property Termination has value Just True for SRS reason no strict rules property Termination has value Just True for SRS [log#, s] |-> [log#, half, s] {- DP (Top 1) (Input 0) -} [half, 0] ->= [0, s, s, half] {- DP Nontop (Input 1) -} [half, s, 0] ->= [0] {- DP Nontop (Input 2) -} [half, s, s] ->= [s, half, p, s, s] {- DP Nontop (Input 3) -} [half, half, s, s, s, s] ->= [s, s, half, half] {- DP Nontop (Input 4) -} [p, s, s, s] ->= [s, p, s, s] {- DP Nontop (Input 5) -} [s, s, p, s] ->= [s, s] {- DP Nontop (Input 6) -} reason Usable property Termination has value Just True for SRS [log#, s] |-> [log#, half, s] {- DP (Top 1) (Input 0) -} [half, 0] ->= [0, s, s, half] {- DP Nontop (Input 1) -} [half, s, 0] ->= [0] {- DP Nontop (Input 2) -} [half, s, s] ->= [s, half, p, s, s] {- DP Nontop (Input 3) -} [half, half, s, s, s, s] ->= [s, s, half, half] {- DP Nontop (Input 4) -} [p, s, s, s] ->= [s, p, s, s] {- DP Nontop (Input 5) -} [s, s, p, s] ->= [s, s] {- DP Nontop (Input 6) -} reason ( s , Wk / 0A - 0A 0A \ | 2A 2A 2A 5A | | 0A 0A 0A 2A | \ - - - 0A / ) ( half , Wk / 0A - 0A - \ | 0A - 0A 2A | | 0A - - - | \ - - - 0A / ) ( 0 , Wk / - - - 0A \ | - - - - | | - - - 0A | \ - - - 0A / ) ( p , Wk / 0A - - 2A \ | 1A - 0A 0A | | 0A - - 1A | \ - - - 0A / ) ( log# , Wk / 2A 3A 4A 5A \ | - - - - | | - - - - | \ - - - 0A / ) property Termination has value Just True for SRS [half, 0] ->= [0, s, s, half] {- DP Nontop (Input 1) -} [half, s, 0] ->= [0] {- DP Nontop (Input 2) -} [half, s, s] ->= [s, half, p, s, s] {- DP Nontop (Input 3) -} [half, half, s, s, s, s] ->= [s, s, half, half] {- DP Nontop (Input 4) -} [p, s, s, s] ->= [s, p, s, s] {- DP Nontop (Input 5) -} [s, s, p, s] ->= [s, s] {- DP Nontop (Input 6) -} reason (half, 1/1) property Termination has value Just True for SRS [half, 0] ->= [0, s, s, half] {- DP Nontop (Input 1) -} [half, s, s] ->= [s, half, p, s, s] {- DP Nontop (Input 3) -} [half, half, s, s, s, s] ->= [s, s, half, half] {- DP Nontop (Input 4) -} [p, s, s, s] ->= [s, p, s, s] {- DP Nontop (Input 5) -} [s, s, p, s] ->= [s, s] {- DP Nontop (Input 6) -} reason EDG property Termination has value Just True for SRS [half#, s, s] |-> [half#, p, s, s] {- DP (Top 1) (Input 3) -} [half#, half, s, s, s, s] |-> [half#, half] {- DP (Top 2) (Input 4) -} [half#, half, s, s, s, s] |-> [half#] {- DP (Top 3) (Input 4) -} [half, 0] ->= [0, s, s, half] {- DP Nontop (Input 1) -} [half, s, 0] ->= [0] {- DP Nontop (Input 2) -} [half, s, s] ->= [s, half, p, s, s] {- DP Nontop (Input 3) -} [half, half, s, s, s, s] ->= [s, s, half, half] {- DP Nontop (Input 4) -} [p, s, s, s] ->= [s, p, s, s] {- DP Nontop (Input 5) -} [s, s, p, s] ->= [s, s] {- DP Nontop (Input 6) -} reason Usable property Termination has value Just True for SRS [half#, s, s] |-> [half#, p, s, s] {- DP (Top 1) (Input 3) -} [half#, half, s, s, s, s] |-> [half#, half] {- DP (Top 2) (Input 4) -} [half#, half, s, s, s, s] |-> [half#] {- DP (Top 3) (Input 4) -} [half, 0] ->= [0, s, s, half] {- DP Nontop (Input 1) -} [half, s, 0] ->= [0] {- DP Nontop (Input 2) -} [half, s, s] ->= [s, half, p, s, s] {- DP Nontop (Input 3) -} [half, half, s, s, s, s] ->= [s, s, half, half] {- DP Nontop (Input 4) -} [p, s, s, s] ->= [s, p, s, s] {- DP Nontop (Input 5) -} [s, s, p, s] ->= [s, s] {- DP Nontop (Input 6) -} reason (half, 2/1) property Termination has value Just True for SRS [half#, s, s] |-> [half#, p, s, s] {- DP (Top 1) (Input 3) -} [half#, half, s, s, s, s] |-> [half#, half] {- DP (Top 2) (Input 4) -} [half, 0] ->= [0, s, s, half] {- DP Nontop (Input 1) -} [half, s, s] ->= [s, half, p, s, s] {- DP Nontop (Input 3) -} [half, half, s, s, s, s] ->= [s, s, half, half] {- DP Nontop (Input 4) -} [p, s, s, s] ->= [s, p, s, s] {- DP Nontop (Input 5) -} [s, s, p, s] ->= [s, s] {- DP Nontop (Input 6) -} reason Tiling { method = Overlap, width = 2, state_type = Bit64, map_type = Enum, unlabel = True, print_completion_steps = False, print_tiles = False, max_num_tiles = Just 1000, max_num_rules = Just 100000, verbose = False, tracing = False} steps 1 using 19 tiles tile all rules steps: 1 property Termination has value Just True for SRS [[<, half#], [half#, s], [s, s], [s, >]] |-> [ [<, half#] , [half#, p] , [p, s] , [s, s] , [ s , > ] ] {- Semlab 0 (Concon 0 (DP (Top 1) (Input 3))) -} [[<, half#], [half#, s], [s, s], [s, s]] |-> [ [<, half#] , [half#, p] , [p, s] , [s, s] , [ s , s ] ] {- Semlab 0 (Concon 1 (DP (Top 1) (Input 3))) -} [[<, half#], [half#, s], [s, s], [s, half]] |-> [ [<, half#] , [half#, p] , [p, s] , [s, s] , [ s , half ] ] {- Semlab 0 (Concon 2 (DP (Top 1) (Input 3))) -} [[<, half#], [half#, s], [s, s], [s, 0]] |-> [ [<, half#] , [half#, p] , [p, s] , [s, s] , [ s , 0 ] ] {- Semlab 0 (Concon 3 (DP (Top 1) (Input 3))) -} [[<, half#], [half#, s], [s, s], [s, p]] |-> [ [<, half#] , [half#, p] , [p, s] , [s, s] , [ s , p ] ] {- Semlab 0 (Concon 4 (DP (Top 1) (Input 3))) -} [[<, half#], [half#, half], [half, s], [s, s], [s, s], [s, s], [s, >]] |-> [ [ < , half# ] , [ half# , half ] , [ half , > ] ] {- Semlab 0 (Concon 0 (DP (Top 2) (Input 4))) -} [[<, half#], [half#, half], [half, s], [s, s], [s, s], [s, s], [s, s]] |-> [ [ < , half# ] , [ half# , half ] , [ half , s ] ] {- Semlab 0 (Concon 1 (DP (Top 2) (Input 4))) -} [ [<, half#] , [half#, half] , [half, s] , [s, s] , [s, s] , [s, s] , [s, half] ] |-> [ [<, half#] , [half#, half] , [ half , half ] ] {- Semlab 0 (Concon 2 (DP (Top 2) (Input 4))) -} [[<, half#], [half#, half], [half, s], [s, s], [s, s], [s, s], [s, 0]] |-> [ [ < , half# ] , [ half# , half ] , [ half , 0 ] ] {- Semlab 0 (Concon 3 (DP (Top 2) (Input 4))) -} [[<, half#], [half#, half], [half, s], [s, s], [s, s], [s, s], [s, p]] |-> [ [ < , half# ] , [ half# , half ] , [ half , p ] ] {- Semlab 0 (Concon 4 (DP (Top 2) (Input 4))) -} [[s, half], [half, 0], [0, s]] ->= [ [s, 0] , [0, s] , [s, s] , [s, half] , [ half , s ] ] {- Semlab 0 (Concon 0 (DP Nontop (Input 1))) -} [[half, half], [half, 0], [0, s]] ->= [ [half, 0] , [0, s] , [s, s] , [s, half] , [ half , s ] ] {- Semlab 1 (Concon 0 (DP Nontop (Input 1))) -} [[half#, half], [half, 0], [0, s]] ->= [ [half#, 0] , [0, s] , [s, s] , [s, half] , [ half , s ] ] {- Semlab 2 (Concon 0 (DP Nontop (Input 1))) -} [[s, half], [half, s], [s, s], [s, >]] ->= [ [s, s] , [s, half] , [half, p] , [p, s] , [s, s] , [ s , > ] ] {- Semlab 0 (Concon 0 (DP Nontop (Input 3))) -} [[s, half], [half, s], [s, s], [s, s]] ->= [ [s, s] , [s, half] , [half, p] , [p, s] , [s, s] , [ s , s ] ] {- Semlab 0 (Concon 1 (DP Nontop (Input 3))) -} [[s, half], [half, s], [s, s], [s, half]] ->= [ [s, s] , [s, half] , [half, p] , [p, s] , [s, s] , [ s , half ] ] {- Semlab 0 (Concon 2 (DP Nontop (Input 3))) -} [[s, half], [half, s], [s, s], [s, 0]] ->= [ [s, s] , [s, half] , [half, p] , [p, s] , [s, s] , [ s , 0 ] ] {- Semlab 0 (Concon 3 (DP Nontop (Input 3))) -} [[s, half], [half, s], [s, s], [s, p]] ->= [ [s, s] , [s, half] , [half, p] , [p, s] , [s, s] , [ s , p ] ] {- Semlab 0 (Concon 4 (DP Nontop (Input 3))) -} [[half, half], [half, s], [s, s], [s, >]] ->= [ [half, s] , [s, half] , [half, p] , [p, s] , [s, s] , [ s , > ] ] {- Semlab 1 (Concon 0 (DP Nontop (Input 3))) -} [[half, half], [half, s], [s, s], [s, s]] ->= [ [half, s] , [s, half] , [half, p] , [p, s] , [s, s] , [ s , s ] ] {- Semlab 1 (Concon 1 (DP Nontop (Input 3))) -} [[half, half], [half, s], [s, s], [s, half]] ->= [ [half, s] , [s, half] , [half, p] , [p, s] , [s, s] , [ s , half ] ] {- Semlab 1 (Concon 2 (DP Nontop (Input 3))) -} [[half, half], [half, s], [s, s], [s, 0]] ->= [ [half, s] , [s, half] , [half, p] , [p, s] , [s, s] , [ s , 0 ] ] {- Semlab 1 (Concon 3 (DP Nontop (Input 3))) -} [[half, half], [half, s], [s, s], [s, p]] ->= [ [half, s] , [s, half] , [half, p] , [p, s] , [s, s] , [ s , p ] ] {- Semlab 1 (Concon 4 (DP Nontop (Input 3))) -} [[half#, half], [half, s], [s, s], [s, >]] ->= [ [half#, s] , [s, half] , [half, p] , [p, s] , [s, s] , [ s , > ] ] {- Semlab 2 (Concon 0 (DP Nontop (Input 3))) -} [[half#, half], [half, s], [s, s], [s, s]] ->= [ [half#, s] , [s, half] , [half, p] , [p, s] , [s, s] , [ s , s ] ] {- Semlab 2 (Concon 1 (DP Nontop (Input 3))) -} [[half#, half], [half, s], [s, s], [s, half]] ->= [ [half#, s] , [s, half] , [half, p] , [p, s] , [s, s] , [ s , half ] ] {- Semlab 2 (Concon 2 (DP Nontop (Input 3))) -} [[half#, half], [half, s], [s, s], [s, 0]] ->= [ [half#, s] , [s, half] , [half, p] , [p, s] , [s, s] , [ s , 0 ] ] {- Semlab 2 (Concon 3 (DP Nontop (Input 3))) -} [[half#, half], [half, s], [s, s], [s, p]] ->= [ [half#, s] , [s, half] , [half, p] , [p, s] , [s, s] , [ s , p ] ] {- Semlab 2 (Concon 4 (DP Nontop (Input 3))) -} [[s, half], [half, half], [half, s], [s, s], [s, s], [s, s], [s, >]] ->= [ [ s , s ] , [ s , s ] , [ s , half ] , [ half , half ] , [ half , > ] ] {- Semlab 0 (Concon 0 (DP Nontop (Input 4))) -} [[s, half], [half, half], [half, s], [s, s], [s, s], [s, s], [s, s]] ->= [ [ s , s ] , [ s , s ] , [ s , half ] , [ half , half ] , [ half , s ] ] {- Semlab 0 (Concon 1 (DP Nontop (Input 4))) -} [ [s, half] , [half, half] , [half, s] , [s, s] , [s, s] , [s, s] , [s, half] ] ->= [ [s, s] , [s, s] , [s, half] , [half, half] , [ half , half ] ] {- Semlab 0 (Concon 2 (DP Nontop (Input 4))) -} [[s, half], [half, half], [half, s], [s, s], [s, s], [s, s], [s, 0]] ->= [ [ s , s ] , [ s , s ] , [ s , half ] , [ half , half ] , [ half , 0 ] ] {- Semlab 0 (Concon 3 (DP Nontop (Input 4))) -} [[s, half], [half, half], [half, s], [s, s], [s, s], [s, s], [s, p]] ->= [ [ s , s ] , [ s , s ] , [ s , half ] , [ half , half ] , [ half , p ] ] {- Semlab 0 (Concon 4 (DP Nontop (Input 4))) -} [ [half, half] , [half, half] , [half, s] , [s, s] , [s, s] , [s, s] , [s, >] ] ->= [ [half, s] , [s, s] , [s, half] , [half, half] , [half, >] ] {- Semlab 1 (Concon 0 (DP Nontop (Input 4))) -} [ [half, half] , [half, half] , [half, s] , [s, s] , [s, s] , [s, s] , [s, s] ] ->= [ [half, s] , [s, s] , [s, half] , [half, half] , [half, s] ] {- Semlab 1 (Concon 1 (DP Nontop (Input 4))) -} [ [half, half] , [half, half] , [half, s] , [s, s] , [s, s] , [s, s] , [s, half] ] ->= [ [half, s] , [s, s] , [s, half] , [half, half] , [ half , half ] ] {- Semlab 1 (Concon 2 (DP Nontop (Input 4))) -} [ [half, half] , [half, half] , [half, s] , [s, s] , [s, s] , [s, s] , [s, 0] ] ->= [ [half, s] , [s, s] , [s, half] , [half, half] , [half, 0] ] {- Semlab 1 (Concon 3 (DP Nontop (Input 4))) -} [ [half, half] , [half, half] , [half, s] , [s, s] , [s, s] , [s, s] , [s, p] ] ->= [ [half, s] , [s, s] , [s, half] , [half, half] , [half, p] ] {- Semlab 1 (Concon 4 (DP Nontop (Input 4))) -} [ [half#, half] , [half, half] , [half, s] , [s, s] , [s, s] , [s, s] , [s, >] ] ->= [ [half#, s] , [s, s] , [s, half] , [half, half] , [half, >] ] {- Semlab 2 (Concon 0 (DP Nontop (Input 4))) -} [ [half#, half] , [half, half] , [half, s] , [s, s] , [s, s] , [s, s] , [s, s] ] ->= [ [half#, s] , [s, s] , [s, half] , [half, half] , [half, s] ] {- Semlab 2 (Concon 1 (DP Nontop (Input 4))) -} [ [half#, half] , [half, half] , [half, s] , [s, s] , [s, s] , [s, s] , [s, half] ] ->= [ [half#, s] , [s, s] , [s, half] , [half, half] , [ half , half ] ] {- Semlab 2 (Concon 2 (DP Nontop (Input 4))) -} [ [half#, half] , [half, half] , [half, s] , [s, s] , [s, s] , [s, s] , [s, 0] ] ->= [ [half#, s] , [s, s] , [s, half] , [half, half] , [half, 0] ] {- Semlab 2 (Concon 3 (DP Nontop (Input 4))) -} [ [half#, half] , [half, half] , [half, s] , [s, s] , [s, s] , [s, s] , [s, p] ] ->= [ [half#, s] , [s, s] , [s, half] , [half, half] , [half, p] ] {- Semlab 2 (Concon 4 (DP Nontop (Input 4))) -} [[s, p], [p, s], [s, s], [s, s], [s, >]] ->= [ [s, s] , [s, p] , [p, s] , [s, s] , [ s , > ] ] {- Semlab 0 (Concon 0 (DP Nontop (Input 5))) -} [[s, p], [p, s], [s, s], [s, s], [s, s]] ->= [ [s, s] , [s, p] , [p, s] , [s, s] , [ s , s ] ] {- Semlab 0 (Concon 1 (DP Nontop (Input 5))) -} [[s, p], [p, s], [s, s], [s, s], [s, half]] ->= [ [s, s] , [s, p] , [p, s] , [s, s] , [ s , half ] ] {- Semlab 0 (Concon 2 (DP Nontop (Input 5))) -} [[s, p], [p, s], [s, s], [s, s], [s, 0]] ->= [ [s, s] , [s, p] , [p, s] , [s, s] , [ s , 0 ] ] {- Semlab 0 (Concon 3 (DP Nontop (Input 5))) -} [[s, p], [p, s], [s, s], [s, s], [s, p]] ->= [ [s, s] , [s, p] , [p, s] , [s, s] , [ s , p ] ] {- Semlab 0 (Concon 4 (DP Nontop (Input 5))) -} [[half, p], [p, s], [s, s], [s, s], [s, >]] ->= [ [half, s] , [s, p] , [p, s] , [s, s] , [ s , > ] ] {- Semlab 1 (Concon 0 (DP Nontop (Input 5))) -} [[half, p], [p, s], [s, s], [s, s], [s, s]] ->= [ [half, s] , [s, p] , [p, s] , [s, s] , [ s , s ] ] {- Semlab 1 (Concon 1 (DP Nontop (Input 5))) -} [[half, p], [p, s], [s, s], [s, s], [s, half]] ->= [ [half, s] , [s, p] , [p, s] , [s, s] , [ s , half ] ] {- Semlab 1 (Concon 2 (DP Nontop (Input 5))) -} [[half, p], [p, s], [s, s], [s, s], [s, 0]] ->= [ [half, s] , [s, p] , [p, s] , [s, s] , [ s , 0 ] ] {- Semlab 1 (Concon 3 (DP Nontop (Input 5))) -} [[half, p], [p, s], [s, s], [s, s], [s, p]] ->= [ [half, s] , [s, p] , [p, s] , [s, s] , [ s , p ] ] {- Semlab 1 (Concon 4 (DP Nontop (Input 5))) -} [[half#, p], [p, s], [s, s], [s, s], [s, >]] ->= [ [half#, s] , [s, p] , [p, s] , [s, s] , [ s , > ] ] {- Semlab 2 (Concon 0 (DP Nontop (Input 5))) -} [[half#, p], [p, s], [s, s], [s, s], [s, s]] ->= [ [half#, s] , [s, p] , [p, s] , [s, s] , [ s , s ] ] {- Semlab 2 (Concon 1 (DP Nontop (Input 5))) -} [[half#, p], [p, s], [s, s], [s, s], [s, half]] ->= [ [half#, s] , [s, p] , [p, s] , [s, s] , [ s , half ] ] {- Semlab 2 (Concon 2 (DP Nontop (Input 5))) -} [[half#, p], [p, s], [s, s], [s, s], [s, 0]] ->= [ [half#, s] , [s, p] , [p, s] , [s, s] , [ s , 0 ] ] {- Semlab 2 (Concon 3 (DP Nontop (Input 5))) -} [[half#, p], [p, s], [s, s], [s, s], [s, p]] ->= [ [half#, s] , [s, p] , [p, s] , [s, s] , [ s , p ] ] {- Semlab 2 (Concon 4 (DP Nontop (Input 5))) -} [[<, s], [s, s], [s, p], [p, s], [s, >]] ->= [ [<, s] , [s, s] , [ s , > ] ] {- Semlab 0 (Concon 0 (DP Nontop (Input 6))) -} [[<, s], [s, s], [s, p], [p, s], [s, s]] ->= [ [<, s] , [s, s] , [ s , s ] ] {- Semlab 0 (Concon 1 (DP Nontop (Input 6))) -} [[<, s], [s, s], [s, p], [p, s], [s, half]] ->= [ [<, s] , [s, s] , [ s , half ] ] {- Semlab 0 (Concon 2 (DP Nontop (Input 6))) -} [[<, s], [s, s], [s, p], [p, s], [s, 0]] ->= [ [<, s] , [s, s] , [ s , 0 ] ] {- Semlab 0 (Concon 3 (DP Nontop (Input 6))) -} [[<, s], [s, s], [s, p], [p, s], [s, p]] ->= [ [<, s] , [s, s] , [ s , p ] ] {- Semlab 0 (Concon 4 (DP Nontop (Input 6))) -} [[s, s], [s, s], [s, p], [p, s], [s, >]] ->= [ [s, s] , [s, s] , [ s , > ] ] {- Semlab 1 (Concon 0 (DP Nontop (Input 6))) -} [[s, s], [s, s], [s, p], [p, s], [s, s]] ->= [ [s, s] , [s, s] , [ s , s ] ] {- Semlab 1 (Concon 1 (DP Nontop (Input 6))) -} [[s, s], [s, s], [s, p], [p, s], [s, half]] ->= [ [s, s] , [s, s] , [ s , half ] ] {- Semlab 1 (Concon 2 (DP Nontop (Input 6))) -} [[s, s], [s, s], [s, p], [p, s], [s, 0]] ->= [ [s, s] , [s, s] , [ s , 0 ] ] {- Semlab 1 (Concon 3 (DP Nontop (Input 6))) -} [[s, s], [s, s], [s, p], [p, s], [s, p]] ->= [ [s, s] , [s, s] , [ s , p ] ] {- Semlab 1 (Concon 4 (DP Nontop (Input 6))) -} [[half, s], [s, s], [s, p], [p, s], [s, >]] ->= [ [half, s] , [s, s] , [ s , > ] ] {- Semlab 2 (Concon 0 (DP Nontop (Input 6))) -} [[half, s], [s, s], [s, p], [p, s], [s, s]] ->= [ [half, s] , [s, s] , [ s , s ] ] {- Semlab 2 (Concon 1 (DP Nontop (Input 6))) -} [[half, s], [s, s], [s, p], [p, s], [s, half]] ->= [ [half, s] , [s, s] , [ s , half ] ] {- Semlab 2 (Concon 2 (DP Nontop (Input 6))) -} [[half, s], [s, s], [s, p], [p, s], [s, 0]] ->= [ [half, s] , [s, s] , [ s , 0 ] ] {- Semlab 2 (Concon 3 (DP Nontop (Input 6))) -} [[half, s], [s, s], [s, p], [p, s], [s, p]] ->= [ [half, s] , [s, s] , [ s , p ] ] {- Semlab 2 (Concon 4 (DP Nontop (Input 6))) -} [[0, s], [s, s], [s, p], [p, s], [s, >]] ->= [ [0, s] , [s, s] , [ s , > ] ] {- Semlab 3 (Concon 0 (DP Nontop (Input 6))) -} [[0, s], [s, s], [s, p], [p, s], [s, s]] ->= [ [0, s] , [s, s] , [ s , s ] ] {- Semlab 3 (Concon 1 (DP Nontop (Input 6))) -} [[0, s], [s, s], [s, p], [p, s], [s, half]] ->= [ [0, s] , [s, s] , [ s , half ] ] {- Semlab 3 (Concon 2 (DP Nontop (Input 6))) -} [[0, s], [s, s], [s, p], [p, s], [s, 0]] ->= [ [0, s] , [s, s] , [ s , 0 ] ] {- Semlab 3 (Concon 3 (DP Nontop (Input 6))) -} [[0, s], [s, s], [s, p], [p, s], [s, p]] ->= [ [0, s] , [s, s] , [ s , p ] ] {- Semlab 3 (Concon 4 (DP Nontop (Input 6))) -} [[p, s], [s, s], [s, p], [p, s], [s, >]] ->= [ [p, s] , [s, s] , [ s , > ] ] {- Semlab 4 (Concon 0 (DP Nontop (Input 6))) -} [[p, s], [s, s], [s, p], [p, s], [s, s]] ->= [ [p, s] , [s, s] , [ s , s ] ] {- Semlab 4 (Concon 1 (DP Nontop (Input 6))) -} [[p, s], [s, s], [s, p], [p, s], [s, half]] ->= [ [p, s] , [s, s] , [ s , half ] ] {- Semlab 4 (Concon 2 (DP Nontop (Input 6))) -} [[p, s], [s, s], [s, p], [p, s], [s, 0]] ->= [ [p, s] , [s, s] , [ s , 0 ] ] {- Semlab 4 (Concon 3 (DP Nontop (Input 6))) -} [[p, s], [s, s], [s, p], [p, s], [s, p]] ->= [ [p, s] , [s, s] , [ s , p ] ] {- Semlab 4 (Concon 4 (DP Nontop (Input 6))) -} [[half#, s], [s, s], [s, p], [p, s], [s, >]] ->= [ [half#, s] , [s, s] , [ s , > ] ] {- Semlab 5 (Concon 0 (DP Nontop (Input 6))) -} [[half#, s], [s, s], [s, p], [p, s], [s, s]] ->= [ [half#, s] , [s, s] , [ s , s ] ] {- Semlab 5 (Concon 1 (DP Nontop (Input 6))) -} [[half#, s], [s, s], [s, p], [p, s], [s, half]] ->= [ [half#, s] , [s, s] , [ s , half ] ] {- Semlab 5 (Concon 2 (DP Nontop (Input 6))) -} [[half#, s], [s, s], [s, p], [p, s], [s, 0]] ->= [ [half#, s] , [s, s] , [ s , 0 ] ] {- Semlab 5 (Concon 3 (DP Nontop (Input 6))) -} [[half#, s], [s, s], [s, p], [p, s], [s, p]] ->= [ [half#, s] , [s, s] , [ s , p ] ] {- Semlab 5 (Concon 4 (DP Nontop (Input 6))) -} reason ([half#, s], 1/1) ([s, s], 2/1) ([s, >], 1/1) ([half#, half], 7/4) ([half, s], 2/1) ([half, half], 4/1) ([half, 0], 4/1) property Termination has value Just True for SRS [[s, half], [half, 0], [0, s]] ->= [ [s, 0] , [0, s] , [s, s] , [s, half] , [ half , s ] ] {- Semlab 0 (Concon 0 (DP Nontop (Input 1))) -} [[half, half], [half, 0], [0, s]] ->= [ [half, 0] , [0, s] , [s, s] , [s, half] , [ half , s ] ] {- Semlab 1 (Concon 0 (DP Nontop (Input 1))) -} [[s, half], [half, s], [s, s], [s, >]] ->= [ [s, s] , [s, half] , [half, p] , [p, s] , [s, s] , [ s , > ] ] {- Semlab 0 (Concon 0 (DP Nontop (Input 3))) -} [[s, half], [half, s], [s, s], [s, s]] ->= [ [s, s] , [s, half] , [half, p] , [p, s] , [s, s] , [ s , s ] ] {- Semlab 0 (Concon 1 (DP Nontop (Input 3))) -} [[s, half], [half, s], [s, s], [s, half]] ->= [ [s, s] , [s, half] , [half, p] , [p, s] , [s, s] , [ s , half ] ] {- Semlab 0 (Concon 2 (DP Nontop (Input 3))) -} [[s, half], [half, s], [s, s], [s, 0]] ->= [ [s, s] , [s, half] , [half, p] , [p, s] , [s, s] , [ s , 0 ] ] {- Semlab 0 (Concon 3 (DP Nontop (Input 3))) -} [[s, half], [half, s], [s, s], [s, p]] ->= [ [s, s] , [s, half] , [half, p] , [p, s] , [s, s] , [ s , p ] ] {- Semlab 0 (Concon 4 (DP Nontop (Input 3))) -} [ [s, half] , [half, half] , [half, s] , [s, s] , [s, s] , [s, s] , [s, half] ] ->= [ [s, s] , [s, s] , [s, half] , [half, half] , [ half , half ] ] {- Semlab 0 (Concon 2 (DP Nontop (Input 4))) -} [[s, half], [half, half], [half, s], [s, s], [s, s], [s, s], [s, 0]] ->= [ [ s , s ] , [ s , s ] , [ s , half ] , [ half , half ] , [ half , 0 ] ] {- Semlab 0 (Concon 3 (DP Nontop (Input 4))) -} [[s, p], [p, s], [s, s], [s, s], [s, >]] ->= [ [s, s] , [s, p] , [p, s] , [s, s] , [ s , > ] ] {- Semlab 0 (Concon 0 (DP Nontop (Input 5))) -} [[s, p], [p, s], [s, s], [s, s], [s, s]] ->= [ [s, s] , [s, p] , [p, s] , [s, s] , [ s , s ] ] {- Semlab 0 (Concon 1 (DP Nontop (Input 5))) -} [[s, p], [p, s], [s, s], [s, s], [s, half]] ->= [ [s, s] , [s, p] , [p, s] , [s, s] , [ s , half ] ] {- Semlab 0 (Concon 2 (DP Nontop (Input 5))) -} [[s, p], [p, s], [s, s], [s, s], [s, 0]] ->= [ [s, s] , [s, p] , [p, s] , [s, s] , [ s , 0 ] ] {- Semlab 0 (Concon 3 (DP Nontop (Input 5))) -} [[s, p], [p, s], [s, s], [s, s], [s, p]] ->= [ [s, s] , [s, p] , [p, s] , [s, s] , [ s , p ] ] {- Semlab 0 (Concon 4 (DP Nontop (Input 5))) -} [[half, p], [p, s], [s, s], [s, s], [s, >]] ->= [ [half, s] , [s, p] , [p, s] , [s, s] , [ s , > ] ] {- Semlab 1 (Concon 0 (DP Nontop (Input 5))) -} [[half, p], [p, s], [s, s], [s, s], [s, s]] ->= [ [half, s] , [s, p] , [p, s] , [s, s] , [ s , s ] ] {- Semlab 1 (Concon 1 (DP Nontop (Input 5))) -} [[half, p], [p, s], [s, s], [s, s], [s, half]] ->= [ [half, s] , [s, p] , [p, s] , [s, s] , [ s , half ] ] {- Semlab 1 (Concon 2 (DP Nontop (Input 5))) -} [[half, p], [p, s], [s, s], [s, s], [s, 0]] ->= [ [half, s] , [s, p] , [p, s] , [s, s] , [ s , 0 ] ] {- Semlab 1 (Concon 3 (DP Nontop (Input 5))) -} [[half, p], [p, s], [s, s], [s, s], [s, p]] ->= [ [half, s] , [s, p] , [p, s] , [s, s] , [ s , p ] ] {- Semlab 1 (Concon 4 (DP Nontop (Input 5))) -} [[<, s], [s, s], [s, p], [p, s], [s, >]] ->= [ [<, s] , [s, s] , [ s , > ] ] {- Semlab 0 (Concon 0 (DP Nontop (Input 6))) -} [[<, s], [s, s], [s, p], [p, s], [s, s]] ->= [ [<, s] , [s, s] , [ s , s ] ] {- Semlab 0 (Concon 1 (DP Nontop (Input 6))) -} [[<, s], [s, s], [s, p], [p, s], [s, half]] ->= [ [<, s] , [s, s] , [ s , half ] ] {- Semlab 0 (Concon 2 (DP Nontop (Input 6))) -} [[<, s], [s, s], [s, p], [p, s], [s, 0]] ->= [ [<, s] , [s, s] , [ s , 0 ] ] {- Semlab 0 (Concon 3 (DP Nontop (Input 6))) -} [[<, s], [s, s], [s, p], [p, s], [s, p]] ->= [ [<, s] , [s, s] , [ s , p ] ] {- Semlab 0 (Concon 4 (DP Nontop (Input 6))) -} [[s, s], [s, s], [s, p], [p, s], [s, >]] ->= [ [s, s] , [s, s] , [ s , > ] ] {- Semlab 1 (Concon 0 (DP Nontop (Input 6))) -} [[s, s], [s, s], [s, p], [p, s], [s, s]] ->= [ [s, s] , [s, s] , [ s , s ] ] {- Semlab 1 (Concon 1 (DP Nontop (Input 6))) -} [[s, s], [s, s], [s, p], [p, s], [s, half]] ->= [ [s, s] , [s, s] , [ s , half ] ] {- Semlab 1 (Concon 2 (DP Nontop (Input 6))) -} [[s, s], [s, s], [s, p], [p, s], [s, 0]] ->= [ [s, s] , [s, s] , [ s , 0 ] ] {- Semlab 1 (Concon 3 (DP Nontop (Input 6))) -} [[s, s], [s, s], [s, p], [p, s], [s, p]] ->= [ [s, s] , [s, s] , [ s , p ] ] {- Semlab 1 (Concon 4 (DP Nontop (Input 6))) -} [[half, s], [s, s], [s, p], [p, s], [s, >]] ->= [ [half, s] , [s, s] , [ s , > ] ] {- Semlab 2 (Concon 0 (DP Nontop (Input 6))) -} [[half, s], [s, s], [s, p], [p, s], [s, s]] ->= [ [half, s] , [s, s] , [ s , s ] ] {- Semlab 2 (Concon 1 (DP Nontop (Input 6))) -} [[half, s], [s, s], [s, p], [p, s], [s, half]] ->= [ [half, s] , [s, s] , [ s , half ] ] {- Semlab 2 (Concon 2 (DP Nontop (Input 6))) -} [[half, s], [s, s], [s, p], [p, s], [s, 0]] ->= [ [half, s] , [s, s] , [ s , 0 ] ] {- Semlab 2 (Concon 3 (DP Nontop (Input 6))) -} [[half, s], [s, s], [s, p], [p, s], [s, p]] ->= [ [half, s] , [s, s] , [ s , p ] ] {- Semlab 2 (Concon 4 (DP Nontop (Input 6))) -} [[0, s], [s, s], [s, p], [p, s], [s, >]] ->= [ [0, s] , [s, s] , [ s , > ] ] {- Semlab 3 (Concon 0 (DP Nontop (Input 6))) -} [[0, s], [s, s], [s, p], [p, s], [s, s]] ->= [ [0, s] , [s, s] , [ s , s ] ] {- Semlab 3 (Concon 1 (DP Nontop (Input 6))) -} [[0, s], [s, s], [s, p], [p, s], [s, half]] ->= [ [0, s] , [s, s] , [ s , half ] ] {- Semlab 3 (Concon 2 (DP Nontop (Input 6))) -} [[0, s], [s, s], [s, p], [p, s], [s, 0]] ->= [ [0, s] , [s, s] , [ s , 0 ] ] {- Semlab 3 (Concon 3 (DP Nontop (Input 6))) -} [[0, s], [s, s], [s, p], [p, s], [s, p]] ->= [ [0, s] , [s, s] , [ s , p ] ] {- Semlab 3 (Concon 4 (DP Nontop (Input 6))) -} [[p, s], [s, s], [s, p], [p, s], [s, >]] ->= [ [p, s] , [s, s] , [ s , > ] ] {- Semlab 4 (Concon 0 (DP Nontop (Input 6))) -} [[p, s], [s, s], [s, p], [p, s], [s, s]] ->= [ [p, s] , [s, s] , [ s , s ] ] {- Semlab 4 (Concon 1 (DP Nontop (Input 6))) -} [[p, s], [s, s], [s, p], [p, s], [s, half]] ->= [ [p, s] , [s, s] , [ s , half ] ] {- Semlab 4 (Concon 2 (DP Nontop (Input 6))) -} [[p, s], [s, s], [s, p], [p, s], [s, 0]] ->= [ [p, s] , [s, s] , [ s , 0 ] ] {- Semlab 4 (Concon 3 (DP Nontop (Input 6))) -} [[p, s], [s, s], [s, p], [p, s], [s, p]] ->= [ [p, s] , [s, s] , [ s , p ] ] {- Semlab 4 (Concon 4 (DP Nontop (Input 6))) -} [[half#, s], [s, s], [s, p], [p, s], [s, >]] ->= [ [half#, s] , [s, s] , [ s , > ] ] {- Semlab 5 (Concon 0 (DP Nontop (Input 6))) -} [[half#, s], [s, s], [s, p], [p, s], [s, s]] ->= [ [half#, s] , [s, s] , [ s , s ] ] {- Semlab 5 (Concon 1 (DP Nontop (Input 6))) -} [[half#, s], [s, s], [s, p], [p, s], [s, half]] ->= [ [half#, s] , [s, s] , [ s , half ] ] {- Semlab 5 (Concon 2 (DP Nontop (Input 6))) -} [[half#, s], [s, s], [s, p], [p, s], [s, 0]] ->= [ [half#, s] , [s, s] , [ s , 0 ] ] {- Semlab 5 (Concon 3 (DP Nontop (Input 6))) -} [[half#, s], [s, s], [s, p], [p, s], [s, p]] ->= [ [half#, s] , [s, s] , [ s , p ] ] {- Semlab 5 (Concon 4 (DP Nontop (Input 6))) -} reason no strict rules ************************************************** skeleton: (8,5)\Weight(7,5)\Deepee(16/7,9)\Weight(6/7,9)\EDG[\Usable(1/1,3)\Weight(0,0)[],\Usable(1/1,3)\Weight(0,0)[],\Usable(1/6,5)\Matrix{\Arctic}{4}(0/6,4)\Weight(0/5,4)\EDG[],\Usable(3/6,5)\Weight(2/5,5)\TileAllROC{2}(10/78,18)\Weight(0/49,13)[]] ************************************************** let {} in let {trac ?= False;loop_cap = 1;match_cap = 2;tile_cap = 3;matrix_cap = 4;mo = Pre (Or_Else Count (IfSizeLeq 100000 (Simplex Sparse) Fail));wop = Or_Else (Worker (Weight {modus = mo})) Pass;weighted = \ m -> And_Then m wop;done = Worker No_Strict_Rules;dont = \ p -> Fail;tiling = \ m w -> On tile_cap (weighted (And_Then (Worker (Tiling {method = m,width = w,map_type = Enum,max_num_tiles = Just 1000,max_num_rules = Just 100000})) (Worker Remap)));tile_roc = Tree_Search_Preemptive 0 done let {ws = [ 2, 4, 8, 12]}in (for ws (\ w -> tiling Overlap w)) <> [ Worker Unlabel];mb = \ size -> On match_cap (Apply (Worker (Matchbound {method = RFC,max_size = Just size})) done);mbs = \ size -> First_Of [ mb size, Apply (Worker Mirror) (mb size)];tile_rfc = Tree_Search_Preemptive 0 done let {ws = [ 2, 4, 8, 12]}in (for ws (\ w -> tiling Forward w)) <> ((for ws (\ w -> tiling Backward w)) <> [ Worker Unlabel]);solver = Minisatapi;qpi = \ dim bits -> On matrix_cap (weighted (Worker (QPI {tracing = trac,dim = dim,bits = bits,solver = solver})));qpis = Seq [ Timeout 10 (qpi 2 3), Timeout 30 (qpi 4 3), Timeout 50 (qpi 6 3), qpi 8 3];kbo = \ b -> On matrix_cap (weighted (Worker (KBO {bits = b,solver = solver})));matrix = \ dom dim bits -> On matrix_cap (weighted (Worker (Matrix {monotone = Weak,domain = dom,dim = dim,bits = bits,encoding = Ersatz_Binary,tracing = trac,verbose = True,solver = solver})));arctics = Seq [ Timeout 10 (matrix Arctic 2 16), Timeout 30 (matrix Arctic 4 8), Timeout 50 (matrix Arctic 6 4), matrix Arctic 8 2];naturals = Seq [ Timeout 10 (matrix Natural 2 4), Timeout 30 (matrix Natural 4 3), Timeout 50 (matrix Natural 6 2), matrix Natural 8 1];remove = First_Of [ qpis, arctics, naturals, As_Transformer tile_roc];remove_wop = And_Then wop (Or_Else (As_Transformer (Worker No_Strict_Rules)) remove);deepee = Apply (And_Then (Worker DP) (Worker Remap)) (Apply wop (Branch (Worker (EDG {tracing = False,usable = True})) remove_wop));when_small = \ m -> Apply (Worker (SizeAtmost 1000)) m;yeah = First_Of [ when_small (First_Of [ deepee, Apply (Worker Mirror) deepee]), tile_rfc, mbs 100000];noh_for = \ side -> Worker (Simple (Config {closure = side,max_closure_width = Nothing,intermediates = All,priority = Linear [ ( 1, Log2 Steps), ( -1, Width_lhs), ( -2, Log2 Width_rhs)]}));noh = First_Of [ On loop_cap (noh_for Forward), On loop_cap (noh_for Backward), On loop_cap (Worker Transport)]} in Apply (Worker Remap) (Apply wop (Seq [ Worker KKST01, First_Of [ yeah, noh]])) ************************************************** statistics on proof search (nodes types that (together) took more than 1.000000000000) ************************************************** Fail : Matrix { monotone = Weak , domain = Arctic , shape = Full , bits = 16 , encoding = Ersatz_Binary , dim = 2 , solver = Minisatapi , verbose = True , tracing = False} total number 2 max duration 5.359515661000 min duration 4.207055214000 total durat. 9.566570875000 Info { what = Matrix { monotone = Weak , domain = Arctic , shape = Full , bits = 16 , encoding = Ersatz_Binary , dim = 2 , solver = Minisatapi , verbose = True , tracing = False} , input_size = Size { num_rules = 7 , num_strict_rules = 1 , num_top_rules = 1 , num_weak_rules = 6 , alphabet_size = 5 , total_length = 47} , self = 135 , parent = Just 19 , duration = 4.207055214000 , status = Fail , start = 2021-07-13 11:51:06.803182784 UTC , finish = 2021-07-13 11:51:11.010237998 UTC , thread_cap_info = ( [ 'T' , 'h' , 'r' , 'e' , 'a' , 'd' , 'I' , 'd' , ' ' , '1' , '4' , '1' ] , 0 , True )} Info { what = Matrix { monotone = Weak , domain = Arctic , shape = Full , bits = 16 , encoding = Ersatz_Binary , dim = 2 , solver = Minisatapi , verbose = True , tracing = False} , input_size = Size { num_rules = 8 , num_strict_rules = 3 , num_top_rules = 3 , num_weak_rules = 5 , alphabet_size = 5 , total_length = 55} , self = 145 , parent = Just 82 , duration = 5.359515661000 , status = Fail , start = 2021-07-13 11:51:07.861898593 UTC , finish = 2021-07-13 11:51:13.221414254 UTC , thread_cap_info = ( [ 'T' , 'h' , 'r' , 'e' , 'a' , 'd' , 'I' , 'd' , ' ' , '3' , '2' , '6' ] , 0 , True )} Except [ 'A' , 's' , 'y' , 'n' , 'c' , 'C' , 'a' , 'n' , 'c' , 'e' , 'l' , 'l' , 'e' , 'd' ] : Matrix { monotone = Weak , domain = Arctic , shape = Full , bits = 16 , encoding = Ersatz_Binary , dim = 2 , solver = Minisatapi , verbose = True , tracing = False} total number 2 max duration 3.390597444000 min duration 1.054056858000 total durat. 4.444654302000 Info { what = Matrix { monotone = Weak , domain = Arctic , shape = Full , bits = 16 , encoding = Ersatz_Binary , dim = 2 , solver = Minisatapi , verbose = True , tracing = False} , input_size = Size { num_rules = 10 , num_strict_rules = 5 , num_top_rules = 5 , num_weak_rules = 5 , alphabet_size = 5 , total_length = 70} , self = 81 , parent = Just 15 , duration = 1.054056858000 , status = Except [ 'A' , 's' , 'y' , 'n' , 'c' , 'C' , 'a' , 'n' , 'c' , 'e' , 'l' , 'l' , 'e' , 'd' ] , start = 2021-07-13 11:51:06.802603136 UTC , finish = 2021-07-13 11:51:07.856659994 UTC , thread_cap_info = ( [ 'T' , 'h' , 'r' , 'e' , 'a' , 'd' , 'I' , 'd' , ' ' , '1' , '1' , '5' ] , 0 , True )} Info { what = Matrix { monotone = Weak , domain = Arctic , shape = Full , bits = 16 , encoding = Ersatz_Binary , dim = 2 , solver = Minisatapi , verbose = True , tracing = False} , input_size = Size { num_rules = 7 , num_strict_rules = 2 , num_top_rules = 2 , num_weak_rules = 5 , alphabet_size = 5 , total_length = 53} , self = 225 , parent = Just 195 , duration = 3.390597444000 , status = Except [ 'A' , 's' , 'y' , 'n' , 'c' , 'C' , 'a' , 'n' , 'c' , 'e' , 'l' , 'l' , 'e' , 'd' ] , start = 2021-07-13 11:51:39.473703578 UTC , finish = 2021-07-13 11:51:42.864301022 UTC , thread_cap_info = ( [ 'T' , 'h' , 'r' , 'e' , 'a' , 'd' , 'I' , 'd' , ' ' , '5' , '0' , '5' ] , 0 , True )} Success : Matrix { monotone = Weak , domain = Arctic , shape = Full , bits = 8 , encoding = Ersatz_Binary , dim = 4 , solver = Minisatapi , verbose = True , tracing = False} total number 1 max duration 28.441132549000 min duration 28.441132549000 total durat. 28.441132549000 Info { what = Matrix { monotone = Weak , domain = Arctic , shape = Full , bits = 8 , encoding = Ersatz_Binary , dim = 4 , solver = Minisatapi , verbose = True , tracing = False} , input_size = Size { num_rules = 7 , num_strict_rules = 1 , num_top_rules = 1 , num_weak_rules = 6 , alphabet_size = 5 , total_length = 47} , self = 190 , parent = Just 19 , duration = 28.441132549000 , status = Success , start = 2021-07-13 11:51:11.013722902 UTC , finish = 2021-07-13 11:51:39.454855451 UTC , thread_cap_info = ( [ 'T' , 'h' , 'r' , 'e' , 'a' , 'd' , 'I' , 'd' , ' ' , '4' , '0' , '5' ] , 0 , True )} Except [ 'A' , 's' , 'y' , 'n' , 'c' , 'C' , 'a' , 'n' , 'c' , 'e' , 'l' , 'l' , 'e' , 'd' ] : Matrix { monotone = Weak , domain = Natural , shape = Full , bits = 2 , encoding = Ersatz_Binary , dim = 6 , solver = Minisatapi , verbose = True , tracing = False} total number 1 max duration 1.818884646000 min duration 1.818884646000 total durat. 1.818884646000 Info { what = Matrix { monotone = Weak , domain = Natural , shape = Full , bits = 2 , encoding = Ersatz_Binary , dim = 6 , solver = Minisatapi , verbose = True , tracing = False} , input_size = Size { num_rules = 7 , num_strict_rules = 1 , num_top_rules = 1 , num_weak_rules = 6 , alphabet_size = 5 , total_length = 47} , self = 194 , parent = Just 19 , duration = 1.818884646000 , status = Except [ 'A' , 's' , 'y' , 'n' , 'c' , 'C' , 'a' , 'n' , 'c' , 'e' , 'l' , 'l' , 'e' , 'd' ] , start = 2021-07-13 11:51:37.648763493 UTC , finish = 2021-07-13 11:51:39.467648139 UTC , thread_cap_info = ( [ 'T' , 'h' , 'r' , 'e' , 'a' , 'd' , 'I' , 'd' , ' ' , '4' , '7' , '7' ] , 0 , True )} Except [ 'A' , 's' , 'y' , 'n' , 'c' , 'C' , 'a' , 'n' , 'c' , 'e' , 'l' , 'l' , 'e' , 'd' ] : Matrix { monotone = Weak , domain = Natural , shape = Full , bits = 3 , encoding = Ersatz_Binary , dim = 4 , solver = Minisatapi , verbose = True , tracing = False} total number 3 max duration 30.025297129000 min duration 0.072088998000 total durat. 60.118010919000 Info { what = Matrix { monotone = Weak , domain = Natural , shape = Full , bits = 3 , encoding = Ersatz_Binary , dim = 4 , solver = Minisatapi , verbose = True , tracing = False} , input_size = Size { num_rules = 8 , num_strict_rules = 3 , num_top_rules = 3 , num_weak_rules = 5 , alphabet_size = 5 , total_length = 55} , self = 188 , parent = Just 82 , duration = 30.020624792000 , status = Except [ 'A' , 's' , 'y' , 'n' , 'c' , 'C' , 'a' , 'n' , 'c' , 'e' , 'l' , 'l' , 'e' , 'd' ] , start = 2021-07-13 11:51:08.922442223 UTC , finish = 2021-07-13 11:51:38.943067015 UTC , thread_cap_info = ( [ 'T' , 'h' , 'r' , 'e' , 'a' , 'd' , 'I' , 'd' , ' ' , '3' , '7' , '3' ] , 0 , True )} Info { what = Matrix { monotone = Weak , domain = Natural , shape = Full , bits = 3 , encoding = Ersatz_Binary , dim = 4 , solver = Minisatapi , verbose = True , tracing = False} , input_size = Size { num_rules = 7 , num_strict_rules = 1 , num_top_rules = 1 , num_weak_rules = 6 , alphabet_size = 5 , total_length = 47} , self = 187 , parent = Just 19 , duration = 30.025297129000 , status = Except [ 'A' , 's' , 'y' , 'n' , 'c' , 'C' , 'a' , 'n' , 'c' , 'e' , 'l' , 'l' , 'e' , 'd' ] , start = 2021-07-13 11:51:07.617182039 UTC , finish = 2021-07-13 11:51:37.642479168 UTC , thread_cap_info = ( [ 'T' , 'h' , 'r' , 'e' , 'a' , 'd' , 'I' , 'd' , ' ' , '2' , '4' , '0' ] , 0 , True )} Fail : Matrix { monotone = Weak , domain = Natural , shape = Full , bits = 4 , encoding = Ersatz_Binary , dim = 2 , solver = Minisatapi , verbose = True , tracing = False} total number 3 max duration 3.318391549000 min duration 0.813848672000 total durat. 5.192595067000 Info { what = Matrix { monotone = Weak , domain = Natural , shape = Full , bits = 4 , encoding = Ersatz_Binary , dim = 2 , solver = Minisatapi , verbose = True , tracing = False} , input_size = Size { num_rules = 8 , num_strict_rules = 3 , num_top_rules = 3 , num_weak_rules = 5 , alphabet_size = 5 , total_length = 55} , self = 108 , parent = Just 82 , duration = 1.060354846000 , status = Fail , start = 2021-07-13 11:51:07.861908118 UTC , finish = 2021-07-13 11:51:08.922262964 UTC , thread_cap_info = ( [ 'T' , 'h' , 'r' , 'e' , 'a' , 'd' , 'I' , 'd' , ' ' , '3' , '2' , '8' ] , 0 , True )} Info { what = Matrix { monotone = Weak , domain = Natural , shape = Full , bits = 4 , encoding = Ersatz_Binary , dim = 2 , solver = Minisatapi , verbose = True , tracing = False} , input_size = Size { num_rules = 7 , num_strict_rules = 2 , num_top_rules = 2 , num_weak_rules = 5 , alphabet_size = 5 , total_length = 53} , self = 221 , parent = Just 195 , duration = 3.318391549000 , status = Fail , start = 2021-07-13 11:51:39.473716104 UTC , finish = 2021-07-13 11:51:42.792107653 UTC , thread_cap_info = ( [ 'T' , 'h' , 'r' , 'e' , 'a' , 'd' , 'I' , 'd' , ' ' , '5' , '0' , '7' ] , 0 , True )} Except [ 'A' , 's' , 'y' , 'n' , 'c' , 'C' , 'a' , 'n' , 'c' , 'e' , 'l' , 'l' , 'e' , 'd' ] : Matrix { monotone = Weak , domain = Natural , shape = Full , bits = 4 , encoding = Ersatz_Binary , dim = 2 , solver = Minisatapi , verbose = True , tracing = False} total number 1 max duration 1.066184691000 min duration 1.066184691000 total durat. 1.066184691000 Info { what = Matrix { monotone = Weak , domain = Natural , shape = Full , bits = 4 , encoding = Ersatz_Binary , dim = 2 , solver = Minisatapi , verbose = True , tracing = False} , input_size = Size { num_rules = 10 , num_strict_rules = 5 , num_top_rules = 5 , num_weak_rules = 5 , alphabet_size = 5 , total_length = 70} , self = 86 , parent = Just 15 , duration = 1.066184691000 , status = Except [ 'A' , 's' , 'y' , 'n' , 'c' , 'C' , 'a' , 'n' , 'c' , 'e' , 'l' , 'l' , 'e' , 'd' ] , start = 2021-07-13 11:51:06.802706942 UTC , finish = 2021-07-13 11:51:07.868891633 UTC , thread_cap_info = ( [ 'T' , 'h' , 'r' , 'e' , 'a' , 'd' , 'I' , 'd' , ' ' , '1' , '2' , '0' ] , 0 , True )} Success : QPI { dim = 2, bits = 3, solver = Minisatapi, tracing = False, verbose = False} total number 1 max duration 1.050934006000 min duration 1.050934006000 total durat. 1.050934006000 Info { what = QPI { dim = 2 , bits = 3 , solver = Minisatapi , tracing = False , verbose = False} , input_size = Size { num_rules = 10 , num_strict_rules = 5 , num_top_rules = 5 , num_weak_rules = 5 , alphabet_size = 5 , total_length = 70} , self = 77 , parent = Just 15 , duration = 1.050934006000 , status = Success , start = 2021-07-13 11:51:06.802628749 UTC , finish = 2021-07-13 11:51:07.853562755 UTC , thread_cap_info = ( [ 'T' , 'h' , 'r' , 'e' , 'a' , 'd' , 'I' , 'd' , ' ' , '1' , '1' , '7' ] , 0 , True )} Fail : QPI { dim = 2, bits = 3, solver = Minisatapi, tracing = False, verbose = False} total number 3 max duration 3.154282196000 min duration 0.675880082000 total durat. 4.833420793000 Info { what = QPI { dim = 2 , bits = 3 , solver = Minisatapi , tracing = False , verbose = False} , input_size = Size { num_rules = 8 , num_strict_rules = 3 , num_top_rules = 3 , num_weak_rules = 5 , alphabet_size = 5 , total_length = 55} , self = 107 , parent = Just 82 , duration = 1.003258515000 , status = Fail , start = 2021-07-13 11:51:07.861812545 UTC , finish = 2021-07-13 11:51:08.86507106 UTC , thread_cap_info = ( [ 'T' , 'h' , 'r' , 'e' , 'a' , 'd' , 'I' , 'd' , ' ' , '3' , '1' , '8' ] , 0 , True )} Info { what = QPI { dim = 2 , bits = 3 , solver = Minisatapi , tracing = False , verbose = False} , input_size = Size { num_rules = 7 , num_strict_rules = 2 , num_top_rules = 2 , num_weak_rules = 5 , alphabet_size = 5 , total_length = 53} , self = 216 , parent = Just 195 , duration = 3.154282196000 , status = Fail , start = 2021-07-13 11:51:39.473615279 UTC , finish = 2021-07-13 11:51:42.627897475 UTC , thread_cap_info = ( [ 'T' , 'h' , 'r' , 'e' , 'a' , 'd' , 'I' , 'd' , ' ' , '4' , '9' , '7' ] , 0 , True )} Fail : QPI { dim = 4, bits = 3, solver = Minisatapi, tracing = False, verbose = False} total number 3 max duration 4.973937469000 min duration 0.235616053000 total durat. 8.743899673000 Info { what = QPI { dim = 4 , bits = 3 , solver = Minisatapi , tracing = False , verbose = False} , input_size = Size { num_rules = 7 , num_strict_rules = 1 , num_top_rules = 1 , num_weak_rules = 6 , alphabet_size = 5 , total_length = 47} , self = 136 , parent = Just 19 , duration = 3.534346151000 , status = Fail , start = 2021-07-13 11:51:07.47922944 UTC , finish = 2021-07-13 11:51:11.013575591 UTC , thread_cap_info = ( [ 'T' , 'h' , 'r' , 'e' , 'a' , 'd' , 'I' , 'd' , ' ' , '2' , '3' , '4' ] , 0 , True )} Info { what = QPI { dim = 4 , bits = 3 , solver = Minisatapi , tracing = False , verbose = False} , input_size = Size { num_rules = 8 , num_strict_rules = 3 , num_top_rules = 3 , num_weak_rules = 5 , alphabet_size = 5 , total_length = 55} , self = 146 , parent = Just 82 , duration = 4.973937469000 , status = Fail , start = 2021-07-13 11:51:08.865269513 UTC , finish = 2021-07-13 11:51:13.839206982 UTC , thread_cap_info = ( [ 'T' , 'h' , 'r' , 'e' , 'a' , 'd' , 'I' , 'd' , ' ' , '3' , '7' , '0' ] , 0 , True )} Fail : QPI { dim = 6, bits = 3, solver = Minisatapi, tracing = False, verbose = False} total number 2 max duration 22.642461848000 min duration 18.146042383000 total durat. 40.788504231000 Info { what = QPI { dim = 6 , bits = 3 , solver = Minisatapi , tracing = False , verbose = False} , input_size = Size { num_rules = 7 , num_strict_rules = 1 , num_top_rules = 1 , num_weak_rules = 6 , alphabet_size = 5 , total_length = 47} , self = 180 , parent = Just 19 , duration = 18.146042383000 , status = Fail , start = 2021-07-13 11:51:11.013804241 UTC , finish = 2021-07-13 11:51:29.159846624 UTC , thread_cap_info = ( [ 'T' , 'h' , 'r' , 'e' , 'a' , 'd' , 'I' , 'd' , ' ' , '4' , '0' , '8' ] , 0 , True )} Info { what = QPI { dim = 6 , bits = 3 , solver = Minisatapi , tracing = False , verbose = False} , input_size = Size { num_rules = 8 , num_strict_rules = 3 , num_top_rules = 3 , num_weak_rules = 5 , alphabet_size = 5 , total_length = 55} , self = 183 , parent = Just 82 , duration = 22.642461848000 , status = Fail , start = 2021-07-13 11:51:13.839426371 UTC , finish = 2021-07-13 11:51:36.481888219 UTC , thread_cap_info = ( [ 'T' , 'h' , 'r' , 'e' , 'a' , 'd' , 'I' , 'd' , ' ' , '4' , '2' , '7' ] , 0 , True )} Fail : QPI { dim = 8, bits = 3, solver = Minisatapi, tracing = False, verbose = False} total number 2 max duration 10.307252132000 min duration 6.382479230000 total durat. 16.689731362000 Info { what = QPI { dim = 8 , bits = 3 , solver = Minisatapi , tracing = False , verbose = False} , input_size = Size { num_rules = 8 , num_strict_rules = 3 , num_top_rules = 3 , num_weak_rules = 5 , alphabet_size = 5 , total_length = 55} , self = 226 , parent = Just 82 , duration = 6.382479230000 , status = Fail , start = 2021-07-13 11:51:36.482083904 UTC , finish = 2021-07-13 11:51:42.864563134 UTC , thread_cap_info = ( [ 'T' , 'h' , 'r' , 'e' , 'a' , 'd' , 'I' , 'd' , ' ' , '4' , '7' , '1' ] , 0 , True )} Info { what = QPI { dim = 8 , bits = 3 , solver = Minisatapi , tracing = False , verbose = False} , input_size = Size { num_rules = 7 , num_strict_rules = 1 , num_top_rules = 1 , num_weak_rules = 6 , alphabet_size = 5 , total_length = 47} , self = 193 , parent = Just 19 , duration = 10.307252132000 , status = Fail , start = 2021-07-13 11:51:29.159973197 UTC , finish = 2021-07-13 11:51:39.467225329 UTC , thread_cap_info = ( [ 'T' , 'h' , 'r' , 'e' , 'a' , 'd' , 'I' , 'd' , ' ' , '4' , '6' , '7' ] , 0 , True )} Success : Tiling { method = Backward , width = 2 , state_type = Best , map_type = Enum , unlabel = True , print_completion_steps = False , print_tiles = False , max_num_tiles = Just 1000 , max_num_rules = Just 100000 , verbose = False , tracing = False} total number 8 max duration 5.451232088000 min duration 0.051593183000 total durat. 14.658376621000 Info { what = Tiling { method = Backward , width = 2 , state_type = Best , map_type = Enum , unlabel = True , print_completion_steps = False , print_tiles = False , max_num_tiles = Just 1000 , max_num_rules = Just 100000 , verbose = False , tracing = False} , input_size = Size { num_rules = 50 , num_strict_rules = 50 , num_top_rules = 0 , num_weak_rules = 0 , alphabet_size = 11 , total_length = 440} , self = 110 , parent = Just 74 , duration = 1.345345752000 , status = Success , start = 2021-07-13 11:51:08.108634877 UTC , finish = 2021-07-13 11:51:09.453980629 UTC , thread_cap_info = ( [ 'T' , 'h' , 'r' , 'e' , 'a' , 'd' , 'I' , 'd' , ' ' , '3' , '5' , '3' ] , 3 , True )} Info { what = Tiling { method = Backward , width = 2 , state_type = Best , map_type = Enum , unlabel = True , print_completion_steps = False , print_tiles = False , max_num_tiles = Just 1000 , max_num_rules = Just 100000 , verbose = False , tracing = False} , input_size = Size { num_rules = 27 , num_strict_rules = 27 , num_top_rules = 0 , num_weak_rules = 0 , alphabet_size = 11 , total_length = 256} , self = 137 , parent = Just 111 , duration = 2.216085128000 , status = Success , start = 2021-07-13 11:51:09.530152836 UTC , finish = 2021-07-13 11:51:11.746237964 UTC , thread_cap_info = ( [ 'T' , 'h' , 'r' , 'e' , 'a' , 'd' , 'I' , 'd' , ' ' , '3' , '8' , '4' ] , 3 , True )} Info { what = Tiling { method = Backward , width = 2 , state_type = Best , map_type = Enum , unlabel = True , print_completion_steps = False , print_tiles = False , max_num_tiles = Just 1000 , max_num_rules = Just 100000 , verbose = False , tracing = False} , input_size = Size { num_rules = 72 , num_strict_rules = 72 , num_top_rules = 0 , num_weak_rules = 0 , alphabet_size = 13 , total_length = 674} , self = 119 , parent = Just 48 , duration = 2.221039319000 , status = Success , start = 2021-07-13 11:51:07.393295902 UTC , finish = 2021-07-13 11:51:09.614335221 UTC , thread_cap_info = ( [ 'T' , 'h' , 'r' , 'e' , 'a' , 'd' , 'I' , 'd' , ' ' , '2' , '2' , '5' ] , 3 , True )} Info { what = Tiling { method = Backward , width = 2 , state_type = Best , map_type = Enum , unlabel = True , print_completion_steps = False , print_tiles = False , max_num_tiles = Just 1000 , max_num_rules = Just 100000 , verbose = False , tracing = False} , input_size = Size { num_rules = 72 , num_strict_rules = 72 , num_top_rules = 0 , num_weak_rules = 0 , alphabet_size = 13 , total_length = 674} , self = 160 , parent = Just 48 , duration = 2.992204031000 , status = Success , start = 2021-07-13 11:51:12.888999908 UTC , finish = 2021-07-13 11:51:15.881203939 UTC , thread_cap_info = ( [ 'T' , 'h' , 'r' , 'e' , 'a' , 'd' , 'I' , 'd' , ' ' , '4' , '2' , '1' ] , 3 , True )} Info { what = Tiling { method = Backward , width = 2 , state_type = Best , map_type = Enum , unlabel = True , print_completion_steps = False , print_tiles = False , max_num_tiles = Just 1000 , max_num_rules = Just 100000 , verbose = False , tracing = False} , input_size = Size { num_rules = 42 , num_strict_rules = 42 , num_top_rules = 0 , num_weak_rules = 0 , alphabet_size = 13 , total_length = 418} , self = 173 , parent = Just 161 , duration = 5.451232088000 , status = Success , start = 2021-07-13 11:51:16.878801212 UTC , finish = 2021-07-13 11:51:22.3300333 UTC , thread_cap_info = ( [ 'T' , 'h' , 'r' , 'e' , 'a' , 'd' , 'I' , 'd' , ' ' , '4' , '4' , '3' ] , 3 , True )} Success : Tiling { method = Backward , width = 4 , state_type = Best , map_type = Enum , unlabel = True , print_completion_steps = False , print_tiles = False , max_num_tiles = Just 1000 , max_num_rules = Just 100000 , verbose = False , tracing = False} total number 3 max duration 32.849455037000 min duration 3.499019087000 total durat. 43.962943716000 Info { what = Tiling { method = Backward , width = 4 , state_type = Best , map_type = Enum , unlabel = True , print_completion_steps = False , print_tiles = False , max_num_tiles = Just 1000 , max_num_rules = Just 100000 , verbose = False , tracing = False} , input_size = Size { num_rules = 7 , num_strict_rules = 7 , num_top_rules = 0 , num_weak_rules = 0 , alphabet_size = 5 , total_length = 48} , self = 128 , parent = Just 1 , duration = 3.499019087000 , status = Success , start = 2021-07-13 11:51:06.799767279 UTC , finish = 2021-07-13 11:51:10.298786366 UTC , thread_cap_info = ( [ 'T' , 'h' , 'r' , 'e' , 'a' , 'd' , 'I' , 'd' , ' ' , '7' , '3' ] , 3 , True )} Info { what = Tiling { method = Backward , width = 4 , state_type = Best , map_type = Enum , unlabel = True , print_completion_steps = False , print_tiles = False , max_num_tiles = Just 1000 , max_num_rules = Just 100000 , verbose = False , tracing = False} , input_size = Size { num_rules = 4 , num_strict_rules = 4 , num_top_rules = 0 , num_weak_rules = 0 , alphabet_size = 4 , total_length = 28} , self = 156 , parent = Just 59 , duration = 7.614469592000 , status = Success , start = 2021-07-13 11:51:07.629295592 UTC , finish = 2021-07-13 11:51:15.243765184 UTC , thread_cap_info = ( [ 'T' , 'h' , 'r' , 'e' , 'a' , 'd' , 'I' , 'd' , ' ' , '2' , '5' , '8' ] , 3 , True )} Info { what = Tiling { method = Backward , width = 4 , state_type = Best , map_type = Enum , unlabel = True , print_completion_steps = False , print_tiles = False , max_num_tiles = Just 1000 , max_num_rules = Just 100000 , verbose = False , tracing = False} , input_size = Size { num_rules = 5 , num_strict_rules = 5 , num_top_rules = 0 , num_weak_rules = 0 , alphabet_size = 4 , total_length = 38} , self = 200 , parent = Just 37 , duration = 32.849455037000 , status = Success , start = 2021-07-13 11:51:06.862514055 UTC , finish = 2021-07-13 11:51:39.711969092 UTC , thread_cap_info = ( [ 'T' , 'h' , 'r' , 'e' , 'a' , 'd' , 'I' , 'd' , ' ' , '2' , '0' , '7' ] , 3 , True )} Fail : Tiling { method = Backward , width = 8 , state_type = Best , map_type = Enum , unlabel = True , print_completion_steps = False , print_tiles = False , max_num_tiles = Just 1000 , max_num_rules = Just 100000 , verbose = False , tracing = False} total number 2 max duration 8.261005473000 min duration 8.072663174000 total durat. 16.333668647000 Info { what = Tiling { method = Backward , width = 8 , state_type = Best , map_type = Enum , unlabel = True , print_completion_steps = False , print_tiles = False , max_num_tiles = Just 1000 , max_num_rules = Just 100000 , verbose = False , tracing = False} , input_size = Size { num_rules = 5 , num_strict_rules = 5 , num_top_rules = 0 , num_weak_rules = 0 , alphabet_size = 4 , total_length = 38} , self = 151 , parent = Just 37 , duration = 8.072663174000 , status = Fail , start = 2021-07-13 11:51:06.862584965 UTC , finish = 2021-07-13 11:51:14.935248139 UTC , thread_cap_info = ( [ 'T' , 'h' , 'r' , 'e' , 'a' , 'd' , 'I' , 'd' , ' ' , '2' , '1' , '1' ] , 3 , True )} Info { what = Tiling { method = Backward , width = 8 , state_type = Best , map_type = Enum , unlabel = True , print_completion_steps = False , print_tiles = False , max_num_tiles = Just 1000 , max_num_rules = Just 100000 , verbose = False , tracing = False} , input_size = Size { num_rules = 7 , num_strict_rules = 7 , num_top_rules = 0 , num_weak_rules = 0 , alphabet_size = 5 , total_length = 48} , self = 152 , parent = Just 1 , duration = 8.261005473000 , status = Fail , start = 2021-07-13 11:51:06.799721221 UTC , finish = 2021-07-13 11:51:15.060726694 UTC , thread_cap_info = ( [ 'T' , 'h' , 'r' , 'e' , 'a' , 'd' , 'I' , 'd' , ' ' , '8' , '3' ] , 3 , True )} Success : Tiling { method = Forward , width = 2 , state_type = Best , map_type = Enum , unlabel = True , print_completion_steps = False , print_tiles = False , max_num_tiles = Just 1000 , max_num_rules = Just 100000 , verbose = False , tracing = False} total number 9 max duration 8.747482736000 min duration 0.135844984000 total durat. 19.891136180000 Info { what = Tiling { method = Forward , width = 2 , state_type = Best , map_type = Enum , unlabel = True , print_completion_steps = False , print_tiles = False , max_num_tiles = Just 1000 , max_num_rules = Just 100000 , verbose = False , tracing = False} , input_size = Size { num_rules = 27 , num_strict_rules = 27 , num_top_rules = 0 , num_weak_rules = 0 , alphabet_size = 11 , total_length = 256} , self = 149 , parent = Just 111 , duration = 2.399586381000 , status = Success , start = 2021-07-13 11:51:12.303452836 UTC , finish = 2021-07-13 11:51:14.703039217 UTC , thread_cap_info = ( [ 'T' , 'h' , 'r' , 'e' , 'a' , 'd' , 'I' , 'd' , ' ' , '4' , '1' , '5' ] , 3 , True )} Info { what = Tiling { method = Forward , width = 2 , state_type = Best , map_type = Enum , unlabel = True , print_completion_steps = False , print_tiles = False , max_num_tiles = Just 1000 , max_num_rules = Just 100000 , verbose = False , tracing = False} , input_size = Size { num_rules = 72 , num_strict_rules = 72 , num_top_rules = 0 , num_weak_rules = 0 , alphabet_size = 13 , total_length = 674} , self = 175 , parent = Just 48 , duration = 6.489939547000 , status = Success , start = 2021-07-13 11:51:15.887487293 UTC , finish = 2021-07-13 11:51:22.37742684 UTC , thread_cap_info = ( [ 'T' , 'h' , 'r' , 'e' , 'a' , 'd' , 'I' , 'd' , ' ' , '4' , '3' , '7' ] , 3 , True )} Info { what = Tiling { method = Forward , width = 2 , state_type = Best , map_type = Enum , unlabel = True , print_completion_steps = False , print_tiles = False , max_num_tiles = Just 1000 , max_num_rules = Just 100000 , verbose = False , tracing = False} , input_size = Size { num_rules = 42 , num_strict_rules = 42 , num_top_rules = 0 , num_weak_rules = 0 , alphabet_size = 13 , total_length = 418} , self = 178 , parent = Just 161 , duration = 8.747482736000 , status = Success , start = 2021-07-13 11:51:17.268929476 UTC , finish = 2021-07-13 11:51:26.016412212 UTC , thread_cap_info = ( [ 'T' , 'h' , 'r' , 'e' , 'a' , 'd' , 'I' , 'd' , ' ' , '4' , '4' , '7' ] , 3 , True )} Success : Tiling { method = Forward , width = 4 , state_type = Best , map_type = Enum , unlabel = True , print_completion_steps = False , print_tiles = False , max_num_tiles = Just 1000 , max_num_rules = Just 100000 , verbose = False , tracing = False} total number 3 max duration 6.681389219000 min duration 0.668402364000 total durat. 8.632841242000 Info { what = Tiling { method = Forward , width = 4 , state_type = Best , map_type = Enum , unlabel = True , print_completion_steps = False , print_tiles = False , max_num_tiles = Just 1000 , max_num_rules = Just 100000 , verbose = False , tracing = False} , input_size = Size { num_rules = 7 , num_strict_rules = 7 , num_top_rules = 0 , num_weak_rules = 0 , alphabet_size = 5 , total_length = 48} , self = 93 , parent = Just 1 , duration = 1.283049659000 , status = Success , start = 2021-07-13 11:51:06.798743954 UTC , finish = 2021-07-13 11:51:08.081793613 UTC , thread_cap_info = ( [ 'T' , 'h' , 'r' , 'e' , 'a' , 'd' , 'I' , 'd' , ' ' , '5' , '9' ] , 3 , True )} Info { what = Tiling { method = Forward , width = 4 , state_type = Best , map_type = Enum , unlabel = True , print_completion_steps = False , print_tiles = False , max_num_tiles = Just 1000 , max_num_rules = Just 100000 , verbose = False , tracing = False} , input_size = Size { num_rules = 4 , num_strict_rules = 4 , num_top_rules = 0 , num_weak_rules = 0 , alphabet_size = 4 , total_length = 28} , self = 147 , parent = Just 59 , duration = 6.681389219000 , status = Success , start = 2021-07-13 11:51:07.626934989 UTC , finish = 2021-07-13 11:51:14.308324208 UTC , thread_cap_info = ( [ 'T' , 'h' , 'r' , 'e' , 'a' , 'd' , 'I' , 'd' , ' ' , '2' , '4' , '6' ] , 3 , True )} Success : Tiling { method = Overlap , width = 2 , state_type = Best , map_type = Enum , unlabel = True , print_completion_steps = False , print_tiles = False , max_num_tiles = Just 1000 , max_num_rules = Just 100000 , verbose = False , tracing = False} total number 9 max duration 31.970053768000 min duration 0.436905298000 total durat. 72.852684902000 Info { what = Tiling { method = Overlap , width = 2 , state_type = Best , map_type = Enum , unlabel = True , print_completion_steps = False , print_tiles = False , max_num_tiles = Just 1000 , max_num_rules = Just 100000 , verbose = False , tracing = False} , input_size = Size { num_rules = 8 , num_strict_rules = 3 , num_top_rules = 3 , num_weak_rules = 5 , alphabet_size = 5 , total_length = 55} , self = 117 , parent = Just 82 , duration = 1.676262935000 , status = Success , start = 2021-07-13 11:51:07.875985574 UTC , finish = 2021-07-13 11:51:09.552248509 UTC , thread_cap_info = ( [ 'T' , 'h' , 'r' , 'e' , 'a' , 'd' , 'I' , 'd' , ' ' , '3' , '3' , '7' ] , 3 , True )} Info { what = Tiling { method = Overlap , width = 2 , state_type = Best , map_type = Enum , unlabel = True , print_completion_steps = False , print_tiles = False , max_num_tiles = Just 1000 , max_num_rules = Just 100000 , verbose = False , tracing = False} , input_size = Size { num_rules = 7 , num_strict_rules = 2 , num_top_rules = 2 , num_weak_rules = 5 , alphabet_size = 5 , total_length = 53} , self = 212 , parent = Just 195 , duration = 2.060325156000 , status = Success , start = 2021-07-13 11:51:39.498790753 UTC , finish = 2021-07-13 11:51:41.559115909 UTC , thread_cap_info = ( [ 'T' , 'h' , 'r' , 'e' , 'a' , 'd' , 'I' , 'd' , ' ' , '5' , '1' , '7' ] , 3 , True )} Info { what = Tiling { method = Overlap , width = 2 , state_type = Best , map_type = Enum , unlabel = True , print_completion_steps = False , print_tiles = False , max_num_tiles = Just 1000 , max_num_rules = Just 100000 , verbose = False , tracing = False} , input_size = Size { num_rules = 61 , num_strict_rules = 5 , num_top_rules = 5 , num_weak_rules = 56 , alphabet_size = 15 , total_length = 539} , self = 153 , parent = Just 65 , duration = 7.390582414000 , status = Success , start = 2021-07-13 11:51:07.756447873 UTC , finish = 2021-07-13 11:51:15.147030287 UTC , thread_cap_info = ( [ 'T' , 'h' , 'r' , 'e' , 'a' , 'd' , 'I' , 'd' , ' ' , '2' , '8' , '1' ] , 3 , True )} Info { what = Tiling { method = Overlap , width = 2 , state_type = Best , map_type = Enum , unlabel = True , print_completion_steps = False , print_tiles = False , max_num_tiles = Just 1000 , max_num_rules = Just 100000 , verbose = False , tracing = False} , input_size = Size { num_rules = 61 , num_strict_rules = 5 , num_top_rules = 5 , num_weak_rules = 56 , alphabet_size = 15 , total_length = 539} , self = 166 , parent = Just 65 , duration = 8.203215510000 , status = Success , start = 2021-07-13 11:51:09.500343548 UTC , finish = 2021-07-13 11:51:17.703559058 UTC , thread_cap_info = ( [ 'T' , 'h' , 'r' , 'e' , 'a' , 'd' , 'I' , 'd' , ' ' , '3' , '7' , '8' ] , 3 , True )} Info { what = Tiling { method = Overlap , width = 2 , state_type = Best , map_type = Enum , unlabel = True , print_completion_steps = False , print_tiles = False , max_num_tiles = Just 1000 , max_num_rules = Just 100000 , verbose = False , tracing = False} , input_size = Size { num_rules = 33 , num_strict_rules = 3 , num_top_rules = 3 , num_weak_rules = 30 , alphabet_size = 15 , total_length = 309} , self = 184 , parent = Just 167 , duration = 19.183352069000 , status = Success , start = 2021-07-13 11:51:17.84688698 UTC , finish = 2021-07-13 11:51:37.030239049 UTC , thread_cap_info = ( [ 'T' , 'h' , 'r' , 'e' , 'a' , 'd' , 'I' , 'd' , ' ' , '4' , '5' , '2' ] , 3 , True )} Info { what = Tiling { method = Overlap , width = 2 , state_type = Best , map_type = Enum , unlabel = True , print_completion_steps = False , print_tiles = False , max_num_tiles = Just 1000 , max_num_rules = Just 100000 , verbose = False , tracing = False} , input_size = Size { num_rules = 92 , num_strict_rules = 8 , num_top_rules = 8 , num_weak_rules = 84 , alphabet_size = 15 , total_length = 852} , self = 204 , parent = Just 98 , duration = 31.970053768000 , status = Success , start = 2021-07-13 11:51:08.49497428 UTC , finish = 2021-07-13 11:51:40.465028048 UTC , thread_cap_info = ( [ 'T' , 'h' , 'r' , 'e' , 'a' , 'd' , 'I' , 'd' , ' ' , '3' , '6' , '3' ] , 3 , True )} Fail : Tiling { method = Overlap , width = 8 , state_type = Best , map_type = Enum , unlabel = True , print_completion_steps = False , print_tiles = False , max_num_tiles = Just 1000 , max_num_rules = Just 100000 , verbose = False , tracing = False} total number 3 max duration 32.896576993000 min duration 15.149935443000 total durat. 71.842608312000 Info { what = Tiling { method = Overlap , width = 8 , state_type = Best , map_type = Enum , unlabel = True , print_completion_steps = False , print_tiles = False , max_num_tiles = Just 1000 , max_num_rules = Just 100000 , verbose = False , tracing = False} , input_size = Size { num_rules = 10 , num_strict_rules = 5 , num_top_rules = 5 , num_weak_rules = 5 , alphabet_size = 5 , total_length = 70} , self = 172 , parent = Just 15 , duration = 15.149935443000 , status = Fail , start = 2021-07-13 11:51:06.813639202 UTC , finish = 2021-07-13 11:51:21.963574645 UTC , thread_cap_info = ( [ 'T' , 'h' , 'r' , 'e' , 'a' , 'd' , 'I' , 'd' , ' ' , '1' , '8' , '0' ] , 3 , True )} Info { what = Tiling { method = Overlap , width = 8 , state_type = Best , map_type = Enum , unlabel = True , print_completion_steps = False , print_tiles = False , max_num_tiles = Just 1000 , max_num_rules = Just 100000 , verbose = False , tracing = False} , input_size = Size { num_rules = 7 , num_strict_rules = 1 , num_top_rules = 1 , num_weak_rules = 6 , alphabet_size = 5 , total_length = 47} , self = 182 , parent = Just 19 , duration = 23.796095876000 , status = Fail , start = 2021-07-13 11:51:06.813193537 UTC , finish = 2021-07-13 11:51:30.609289413 UTC , thread_cap_info = ( [ 'T' , 'h' , 'r' , 'e' , 'a' , 'd' , 'I' , 'd' , ' ' , '1' , '5' , '6' ] , 3 , True )} Info { what = Tiling { method = Overlap , width = 8 , state_type = Best , map_type = Enum , unlabel = True , print_completion_steps = False , print_tiles = False , max_num_tiles = Just 1000 , max_num_rules = Just 100000 , verbose = False , tracing = False} , input_size = Size { num_rules = 8 , num_strict_rules = 3 , num_top_rules = 3 , num_weak_rules = 5 , alphabet_size = 5 , total_length = 55} , self = 206 , parent = Just 82 , duration = 32.896576993000 , status = Fail , start = 2021-07-13 11:51:07.876020643 UTC , finish = 2021-07-13 11:51:40.772597636 UTC , thread_cap_info = ( [ 'T' , 'h' , 'r' , 'e' , 'a' , 'd' , 'I' , 'd' , ' ' , '3' , '4' , '2' ] , 3 , True )} Success : Weight { modus = Pre (Or_Else Count (IfSizeLeq 100000 (Simplex Sparse) Fail)) , verbose = False , tracing = False} total number 23 max duration 24.164447007000 min duration 0.000047112000 total durat. 81.443976468000 Info { what = Weight { modus = Pre (Or_Else Count (IfSizeLeq 100000 (Simplex Sparse) Fail)) , verbose = False , tracing = False} , input_size = Size { num_rules = 108 , num_strict_rules = 108 , num_top_rules = 0 , num_weak_rules = 0 , alphabet_size = 19 , total_length = 984} , self = 139 , parent = Just 134 , duration = 1.110099339000 , status = Success , start = 2021-07-13 11:51:10.906281699 UTC , finish = 2021-07-13 11:51:12.016381038 UTC , thread_cap_info = ( [ 'T' , 'h' , 'r' , 'e' , 'a' , 'd' , 'I' , 'd' , ' ' , '4' , '0' , '3' ] , 3 , False )} Info { what = Weight { modus = Pre (Or_Else Count (IfSizeLeq 100000 (Simplex Sparse) Fail)) , verbose = False , tracing = False} , input_size = Size { num_rules = 88 , num_strict_rules = 10 , num_top_rules = 10 , num_weak_rules = 78 , alphabet_size = 18 , total_length = 839} , self = 220 , parent = Just 213 , duration = 1.186674628000 , status = Success , start = 2021-07-13 11:51:41.566075553 UTC , finish = 2021-07-13 11:51:42.752750181 UTC , thread_cap_info = ( [ 'T' , 'h' , 'r' , 'e' , 'a' , 'd' , 'I' , 'd' , ' ' , '5' , '3' , '9' ] , 3 , False )} Info { what = Weight { modus = Pre (Or_Else Count (IfSizeLeq 100000 (Simplex Sparse) Fail)) , verbose = False , tracing = False} , input_size = Size { num_rules = 621 , num_strict_rules = 621 , num_top_rules = 0 , num_weak_rules = 0 , alphabet_size = 52 , total_length = 8152} , self = 181 , parent = Just 148 , duration = 15.980390641000 , status = Success , start = 2021-07-13 11:51:14.308714343 UTC , finish = 2021-07-13 11:51:30.289104984 UTC , thread_cap_info = ( [ 'T' , 'h' , 'r' , 'e' , 'a' , 'd' , 'I' , 'd' , ' ' , '4' , '2' , '9' ] , 3 , False )} Info { what = Weight { modus = Pre (Or_Else Count (IfSizeLeq 100000 (Simplex Sparse) Fail)) , verbose = False , tracing = False} , input_size = Size { num_rules = 383 , num_strict_rules = 383 , num_top_rules = 0 , num_weak_rules = 0 , alphabet_size = 42 , total_length = 4482} , self = 217 , parent = Just 179 , duration = 16.655031475000 , status = Success , start = 2021-07-13 11:51:26.016949027 UTC , finish = 2021-07-13 11:51:42.671980502 UTC , thread_cap_info = ( [ 'T' , 'h' , 'r' , 'e' , 'a' , 'd' , 'I' , 'd' , ' ' , '4' , '6' , '5' ] , 3 , False )} Info { what = Weight { modus = Pre (Or_Else Count (IfSizeLeq 100000 (Simplex Sparse) Fail)) , verbose = False , tracing = False} , input_size = Size { num_rules = 383 , num_strict_rules = 383 , num_top_rules = 0 , num_weak_rules = 0 , alphabet_size = 42 , total_length = 4482} , self = 203 , parent = Just 174 , duration = 17.746218626000 , status = Success , start = 2021-07-13 11:51:22.330257579 UTC , finish = 2021-07-13 11:51:40.076476205 UTC , thread_cap_info = ( [ 'T' , 'h' , 'r' , 'e' , 'a' , 'd' , 'I' , 'd' , ' ' , '4' , '6' , '2' ] , 3 , False )} Info { what = Weight { modus = Pre (Or_Else Count (IfSizeLeq 100000 (Simplex Sparse) Fail)) , verbose = False , tracing = False} , input_size = Size { num_rules = 709 , num_strict_rules = 709 , num_top_rules = 0 , num_weak_rules = 0 , alphabet_size = 57 , total_length = 9344} , self = 189 , parent = Just 157 , duration = 24.164447007000 , status = Success , start = 2021-07-13 11:51:15.244075824 UTC , finish = 2021-07-13 11:51:39.408522831 UTC , thread_cap_info = ( [ 'T' , 'h' , 'r' , 'e' , 'a' , 'd' , 'I' , 'd' , ' ' , '4' , '3' , '2' ] , 3 , False )} Fail : Weight { modus = Pre (Or_Else Count (IfSizeLeq 100000 (Simplex Sparse) Fail)) , verbose = False , tracing = False} total number 19 max duration 0.910888366000 min duration 0.000255207000 total durat. 3.510619870000 **************************************************