Benchmark
non-incremental/QF_IDL/20210312-Bouvier/vlsat3_i13.smt2
Publications:
[1] Pierre Bouvier, Hubert Garavel, and Hernan Ponce de Leon.
"Automatic Decomposition of Petri Nets into Automata Networks -
A Synthetic Account". Proceedings PETRI NETS 2020, LNCS 12152,
Springer. https://doi.org/10.1007/978-3-030-51831-8_1
[2] Hubert Garavel. "Nested-Unit Petri Nets". Journal of Logical
and Algebraic Methods in Programming, vol. 104, Elsevier, 2019.
https://doi.org/10.1016/j.jlamp.2018.11.005
In [1], several methods for decomposing an ordinary, safe Petri net
into a flat, unit-safe NUPN [2], have been proposed. These methods
are implemented in a complete tool chain involving SAT solvers, SMT
solvers, and tools for graph coloring and finding maximal cliques.
From a data set of 12,000+ NUPN models, 51,000+ SMT formulas have
been generated, out of which a subset of 1200 interesting formulas
to be used as SMT-LIB 2.6 benchmarks was carefully selected.
Original filename: vlsat3_i13.smt2
Specific parameters for the present benchmark:
- number of places: 315
- number of units: 101
- number of edges in the concurrency graph: 47655
- number of variables: 315
- number of uninterpreted functions: 0
- number of asserts: 47970
- total number of operators in asserts: 197438
| Benchmark |
|---|
| Size | 1724756 |
| Compressed Size | 182023 |
| License |
Creative Commons Attribution 4.0 International
(CC-BY-4.0)
|
| Category | industrial |
| First Occurrence | 2021-07-18 |
| Generated By | Pierre Bouvier |
| Generated On | 2021-03-12 00:00:00 |
| Generator | — |
| Dolmen OK | 1 |
| strict Dolmen OK | 1 |
| check-sat calls | 1 |
| Status | sat |
| Inferred Status | sat |
| Size | 1724748 |
| Compressed Size | 182031 |
| Max. Term Depth | 2 |
| Asserts | 47970 |
| Declared Functions | 0 |
| Declared Constants | 315 |
| Declared Sorts | 0 |
| Defined Functions | 0 |
| Defined Recursive Functions | 0 |
| Defined Sorts | 0 |
| Constants | 0 |
| Declared Datatypes | 0 |
Symbols
or | 314 |
= | 26765 |
distinct | 47655 |
| |
Evaluations
| Evaluation |
Rating |
Solver |
Variant |
Result |
Wallclock |
CPU Time |
|
SMT-COMP 2022
|
0.50 (3/6) |
cvc5 |
cvc5-default-2022-07-02-b15e116-wrapped_sq |
unknown ❌
|
1200.12000
|
1199.71000
|
| |
MathSAT |
MathSAT-5.6.8_default |
unknown ❌
|
1200.11000
|
1199.87000
|
| |
Par4 |
Par4-wrapped-sq_default |
sat ✅
|
83.01990
|
328.73000
|
| |
veriT |
veriT_default |
unknown ❌
|
1200.09000
|
1200.03000
|
| |
Yices2 |
Yices 2.6.2 for SMTCOMP 2021_default |
sat ✅
|
1070.08000
|
1069.95000
|
| |
Z3 |
z3-4.8.17_default |
sat ✅
|
113.92200
|
113.91000
|
|
SMT-COMP 2023
|
0.33 (4/6) |
cvc5 |
cvc5-default-2023-05-16-ea045f305_sq |
unknown ❌
|
1200.02000
|
1199.81000
|
| |
OpenSMT |
OpenSMT a78dcf01_default |
unknown ❌
|
1200.02000
|
1200.04000
|
| |
Par4 |
Par4-wrapped-sq_default |
sat ✅
|
215.09500
|
851.73000
|
| |
SMTInterpol |
smtinterpol-2.5-1272-g2d6d356c_default |
sat ✅
|
18.89670
|
35.78030
|
| |
Yices2 |
Yices 2 for SMTCOMP 2023_default |
sat ✅
|
566.12600
|
566.03700
|
| |
Z3++ |
Z3++_sq_0526_default |
sat ✅
|
136.35200
|
136.33700
|
|
SMT-COMP 2024
|
0.40 (3/5) |
cvc5 |
cvc5 |
unknown ❌
|
1201.72026
|
1201.12236
|
| |
OpenSMT |
OpenSMT |
unknown ❌
|
1201.22423
|
1200.65467
|
| |
SMTInterpol |
SMTInterpol |
sat ✅
|
15.52351
|
47.68352
|
| |
Yices2 |
Yices2 |
sat ✅
|
279.83043
|
279.66191
|
| |
Z3alpha |
Z3-alpha |
sat ✅
|
69.38305
|
69.28021
|
|
SMT-COMP 2025
|
0.33 (4/6) |
cvc5 |
cvc5 |
unknown ❌
|
1201.78929
|
1200.95719
|
| |
OpenSMT |
OpenSMT |
unknown ❌
|
1201.29386
|
1201.03479
|
| |
SMTInterpol |
SMTInterpol |
sat ✅
|
19.71404
|
30.15820
|
| |
Yices2 |
Yices2 |
sat ✅
|
849.36106
|
849.17207
|
| |
Z3alpha |
Z3-alpha |
sat ✅
|
64.05977
|
253.38864
|
| |
Z3 |
Z3-alpha-base |
sat ✅
|
90.90009
|
90.76669
|