| backend | ||
| docs | ||
| sat | ||
| smt | ||
| solver | ||
| tests | ||
| util | ||
| .gitignore | ||
| .header | ||
| .merlin | ||
| .ocp-indent | ||
| _tags | ||
| LICENSE | ||
| main.ml | ||
| Makefile | ||
| META | ||
| msat.mlpack | ||
| msat.odocl | ||
| opam | ||
| README.md | ||
| TODO.md | ||
MSAT
MSAT is an OCaml library that features a modular SAT-solver and some extensions (including SMT). This is work in progress.
It derives from Alt-Ergo Zero.
COPYRIGHT
This program is distributed under the Apache Software License version
2.0. See the enclosed file LICENSE.
USAGE
Sat Solver
A ready-to-use SAT solver is available in the Sat module. It can be used as shown in the following code :
(* Module initialization *)
module F = Msat.Sat.Tseitin
module Sat = Msat.Sat.Make(Msat.Log)
(* We create here two distinct atoms *)
let a = Sat.new_atom () (* A 'new_atom' is always distinct from any other atom *)
let b = Sat.make 1 (* Atoms can be created from integers *)
(* Let's create some formulas *)
let p = F.make_atom a
let q = F.make_atom b
let r = F.make_and [p; q]
let s = F.make_or [F.make_not p; F.make_not q]
(* We can try and check the satisfiability of the given formulas *)
Sat.assume (F.make_cnf r)
let _ = Sat.solve () (* Should return Sat.Sat *)
(* The Sat solver has an incremental mutable state, so we still have
* the formula 'r' in our assumptions *)
Sat.assume (F.make_cnf s)
let _ = Sat.solve () (* Should return Sat.Unsat *)
Generic SAT/SMT Solver
A modular implementation of the SMT algorithm can be found in the Msat.Solver module,
as a functor which takes two modules :
-
A representation of formulas (which implements the
Formula_intf.Ssignature) -
A theory (which implements the
Theory_intf.Ssignature) to check consistence of assertions.
INSTALLATION
Via opam
Once the package is on opam, just opam install msat.
For the development version, use:
opam pin add msat https://github.com/Gbury/mSAT.git
Manual installation
You will need ocamlfind. The command is:
make install