The conjunctive normal form formula is not satisfiable: no matter which truth values are assigned to its two variables, at least one of its four clauses will be false. However, it is possible to assign truth values in such a way as to make three out of four clauses true; indeed, every truth assignment will do this. Therefore, if this formula is given as an instance of the MAX-SAT problem, the solution to the problem is the number three.
More generally, one can define a weighted version of MAX-SAT as follows: given a conjunctive normal form formula with non-negative weights assigned to each clause, find truth values for its variables that maximize the combined weight of the satisfied clauses. The MAX-SAT problem is an instance of weighted MAX-SAT where all weights are 1.
MAX-SAT can also be expressed using an integer linear program. Fix a conjunctive normal form formula with variables 1, 2,..., n, and let denote the clauses of. For each clause in, let + and − denote the sets of variables which are not negated in, and those that are negated in, respectively. The variables of the ILP will correspond to the variables of the formula, whereas the variables will correspond to the clauses. The ILP is as follows: The above program can be relaxed to the following linear program : The following algorithm using that relaxation is an expected -approximation:
The 1/2-approximation algorithm does better when clauses are large whereas the -approximation does better when clauses are small. They can be combined as follows:
Run the 1/2-approximation algorithm to get a truth assignment.
Run the -approximation to get a truth assignment.
Output whichever of or maximizes the weight of the satisfied clauses.
This is a deterministic factor -approximation.
Example
On the formula where, the -approximation will set each variable to True with probability 1/2, and so will behave identically to the 1/2-approximation. Assuming that the assignment of is chosen first during derandomization, the derandomized algorithms will pick a solution with total weight, whereas the optimal solution has weight.
Solvers
Many exact solvers for MAX-SAT have been developed during recent years, and many of them were presented in the well-known conference on the boolean satisfiability problem and related problems, the SAT Conference. In 2006 the SAT Conference hosted the first MAX-SAT evaluation comparing performance of practical solvers for MAX-SAT, as it has done in the past for the pseudo-boolean satisfiability problem and the quantified boolean formula problem. Because of its NP-hardness, large-size MAX-SAT instances cannot in general be solved exactly, and one must often resort to approximation algorithms and heuristics There are several solvers submitted to the last Max-SAT Evaluations:
Branch and Bound based: Clone, MaxSatz, IncMaxSatz, IUT_MaxSatz, WBO, GIDSHSat.
Satisfiability based: SAT4J, QMaxSat.
Unsatisfiability based: msuncore, WPM1, PM2.
Special cases
MAX-SAT is one of the optimization extensions of the boolean satisfiability problem, which is the problem of determining whether the variables of a given Boolean formula can be assigned in such a way as to make the formula evaluate to TRUE. If the clauses are restricted to have at most 2 literals, as in 2-satisfiability, we get the MAX-2SAT problem. If they are restricted to at most 3 literals per clause, as in 3-satisfiability, we get the MAX-3SAT problem.
Related problems
There are many problems related to the satisfiability of conjunctive normal form Boolean formulas.
* The partial maximum satisfiability problem asks for the maximum number of clauses which can be satisfied by any assignment of a given subset of clauses. The rest of the clauses must be satisfied.
* The soft satisfiability problem, given a set of SAT problems, asks for the maximum number of those problems which can be satisfied by any assignment.
* The minimum satisfiability problem.
The MAX-SAT problem can be extended to the case where the variables of the constraint satisfaction problem belong to the set of reals. The problem amounts to finding the smallest q such that the q-relaxed intersection of the constraints is not empty.
