Minisat is a constraint programming/satisfaction tool, there is a version of Minisat which works here in the browser http://www.msoos.org/2013/09/minisat-in-your-browser/

How can I express a scheduling problem with Minisat? Is there a higher level language which compiles to Minisat which would let me express it?

I mean for solving problems like exam timetabling. http://docs.jboss.org/drools/release/6.1.0.Final/optaplanner-docs/html_single/#examination

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3 Answers 3


Another high level modeling language is Picat (http://picat-lang.org/), which have an option to solve/2 to convert to CNF when using the sat module, e.g. "solve([dump], Vars)". The syntax when using the sat module - as well as for the cp and mip modules - is similar to standard CLP syntax.

For some Picat examples, see my Picat page: http://hakank.org/picat/ .

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    I'm learning minizinc, and afaik your site it the best resource (as well as your answers here on SO)... alas, it's unresponsive by some days... Anyway, your github repo is still available. Thanks
    – CapelliC
    Commented Jan 22, 2015 at 8:41
  • @CapelliC: Thanks for your kind words. My site hakank.org is down right now, but I do everything I can to fix it as soon as possible. Great that you found the GitHub repo.
    – hakank
    Commented Jan 22, 2015 at 16:54

SAT solvers like Minisat or Cryptominisat typically read a clause set of logical OR expressions in Conjunctive Normal Form (CNF). It takes an encoding step to translate your problem into this CNF format.

Circuit SAT Solvers process a nested Boolean expression rather than a CNF. But it appears that this type of solvers is nowadays outperformed by the CNF SAT Solvers.

Constraint programming solvers like Minizinc use a high level language which is easier to write and to comprehend. Depending on the features being used, Minizinc can translate its input language into a CNF/DIMACS format suitable for a SAT solver.

Peter Stuckey's paper "There are no CNF Problems" explains the idea. His slides also contain some insights on scheduling.

Have a look at Minizinc examples for scheduling written by Hakan Kjellerstrand.

Emmanuel Hebrard's Scheduling and SAT is an extensive treatment of the topic.


I worked on this project few months ago.

It was really interesting to do.

To use miniSAT (or any other SAT solvers), you will have to reduce the Scheduling Problem to a SAT problem.

I can recommand you this question that I asked in 3 parts.

Class Scheduling to Boolean satisfiability [Polynomial-time reduction]

Class Scheduling to Boolean satisfiability [Polynomial-time reduction] part 2

Class Scheduling to Boolean satisfiability [Polynomial-time reduction] Final Part

And you will basically see, step by step, how to transform the Scheduling Problem to a SAT problem that MiniSAT can read and solve :).

Thanks again to @amit who was a very big help in this project.

With this answer, you will be able to solve N rooms with T teachers, who are teaching S subjects to G different group of students :) which is I think, enough for 99% of Scheduling Problems.

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