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SRS Standard pair #516973197
details
property
value
status
complete
benchmark
x07.xml
ran by
Akihisa Yamada
cpu timeout
1200 seconds
wallclock timeout
300 seconds
memory limit
137438953472 bytes
execution host
n028.star.cs.uiowa.edu
space
Secret_07_SRS
run statistics
property
value
solver
matchbox-2021-06-18b
configuration
tc21-9.sh
runtime (wallclock)
39.8820710182 seconds
cpu usage
126.38754293
max memory
2.469875712E9
stage attributes
key
value
output-size
81725
starexec-result
YES
output
/export/starexec/sandbox2/solver/bin/starexec_run_tc21-9.sh /export/starexec/sandbox2/benchmark/theBenchmark.xml /export/starexec/sandbox2/output/output_files -------------------------------------------------------------------------------- YES ************************************************** summary ************************************************** SRS with 9 rules on 5 letters DP SRS with 17 strict rules and 9 weak rules on 10 letters weights SRS with 15 strict rules and 9 weak rules on 10 letters EDG 2 sub-proofs 1 SRS with 1 rules on 3 letters Usable SRS with 1 rules on 3 letters weights SRS with 0 rules on 0 letters no strict rules 2 SRS with 14 strict rules and 9 weak rules on 9 letters Matrix { monotone = Weak, domain = Arctic, shape = Full, bits = 3, encoding = FBV, dim = 2, solver = Minisatapi, verbose = False, tracing = False} SRS with 13 strict rules and 9 weak rules on 9 letters EDG SRS with 13 strict rules and 9 weak rules on 9 letters Matrix { monotone = Weak, domain = Arctic, shape = Full, bits = 3, encoding = FBV, dim = 2, solver = Minisatapi, verbose = False, tracing = False} SRS with 11 strict rules and 9 weak rules on 9 letters weights SRS with 9 strict rules and 9 weak rules on 8 letters EDG SRS with 9 strict rules and 9 weak rules on 8 letters Matrix { monotone = Weak, domain = Natural, shape = Full, bits = 4, encoding = Ersatz_Binary, dim = 2, solver = Minisatapi, verbose = True, tracing = False} SRS with 3 strict rules and 9 weak rules on 8 letters EDG SRS with 3 strict rules and 9 weak rules on 8 letters Matrix { monotone = Weak, domain = Arctic, shape = Full, bits = 8, encoding = Ersatz_Binary, dim = 4, solver = Minisatapi, verbose = True, tracing = False} SRS with 2 strict rules and 9 weak rules on 8 letters weights SRS with 0 strict rules and 9 weak rules on 5 letters EDG ************************************************** proof ************************************************** property Termination has value Just True for SRS [a, a, b] -> [c, d] {- Input 0 -} [b, e, b] -> [e, d] {- Input 1 -} [b, d] -> [e, b] {- Input 2 -} [b, b, b] -> [e, e] {- Input 3 -} [e, e, e] -> [d, e] {- Input 4 -} [d] -> [b, e] {- Input 5 -} [c, d, a] -> [c] {- Input 6 -} [d, c] -> [c, d, a] {- Input 7 -} [a] -> [e, b] {- Input 8 -} reason DP property Termination has value Just True for SRS [a, a, b] ->= [c, d] {- DP Nontop (Input 0) -} [b, e, b] ->= [e, d] {- DP Nontop (Input 1) -} [b, d] ->= [e, b] {- DP Nontop (Input 2) -} [b, b, b] ->= [e, e] {- DP Nontop (Input 3) -} [e, e, e] ->= [d, e] {- DP Nontop (Input 4) -} [d] ->= [b, e] {- DP Nontop (Input 5) -} [c, d, a] ->= [c] {- DP Nontop (Input 6) -} [d, c] ->= [c, d, a] {- DP Nontop (Input 7) -} [a] ->= [e, b] {- DP Nontop (Input 8) -} [a#] |-> [b#] {- DP (Top 1) (Input 8) -} [a#] |-> [e#, b] {- DP (Top 0) (Input 8) -} [a#, a, b] |-> [c#, d] {- DP (Top 0) (Input 0) -} [a#, a, b] |-> [d#] {- DP (Top 1) (Input 0) -} [b#, b, b] |-> [e#] {- DP (Top 1) (Input 3) -} [b#, b, b] |-> [e#, e] {- DP (Top 0) (Input 3) -} [b#, d] |-> [b#] {- DP (Top 1) (Input 2) -} [b#, d] |-> [e#, b] {- DP (Top 0) (Input 2) -} [b#, e, b] |-> [d#] {- DP (Top 1) (Input 1) -} [b#, e, b] |-> [e#, d] {- DP (Top 0) (Input 1) -} [c#, d, a] |-> [c#] {- DP (Top 0) (Input 6) -} [d#] |-> [b#, e] {- DP (Top 0) (Input 5) -} [d#] |-> [e#] {- DP (Top 1) (Input 5) -} [d#, c] |-> [a#] {- DP (Top 2) (Input 7) -} [d#, c] |-> [c#, d, a] {- DP (Top 0) (Input 7) -} [d#, c] |-> [d#, a] {- DP (Top 1) (Input 7) -} [e#, e, e] |-> [d#, e] {- DP (Top 0) (Input 4) -} reason (a#, 1/4) (b#, 1/4) (e#, 1/4) (d#, 1/4) property Termination has value Just True for SRS [a, a, b] ->= [c, d] {- DP Nontop (Input 0) -} [b, e, b] ->= [e, d] {- DP Nontop (Input 1) -} [b, d] ->= [e, b] {- DP Nontop (Input 2) -} [b, b, b] ->= [e, e] {- DP Nontop (Input 3) -} [e, e, e] ->= [d, e] {- DP Nontop (Input 4) -} [d] ->= [b, e] {- DP Nontop (Input 5) -} [c, d, a] ->= [c] {- DP Nontop (Input 6) -} [d, c] ->= [c, d, a] {- DP Nontop (Input 7) -} [a] ->= [e, b] {- DP Nontop (Input 8) -} [a#] |-> [b#] {- DP (Top 1) (Input 8) -} [a#] |-> [e#, b] {- DP (Top 0) (Input 8) -} [a#, a, b] |-> [d#] {- DP (Top 1) (Input 0) -} [b#, b, b] |-> [e#] {- DP (Top 1) (Input 3) -} [b#, b, b] |-> [e#, e] {- DP (Top 0) (Input 3) -} [b#, d] |-> [b#] {- DP (Top 1) (Input 2) -} [b#, d] |-> [e#, b] {- DP (Top 0) (Input 2) -} [b#, e, b] |-> [d#] {- DP (Top 1) (Input 1) -}
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