Unsatisfiable core

In mathematical logic, given an unsatisfiable Boolean propositional formula in conjunctive normal form, a subset of clauses whose conjunction is still unsatisfiable is called an unsatisfiable core of the original formula.

Many SAT solvers can produce a resolution graph which proves the unsatisfiability of the original problem. This can be analyzed to produce a smaller unsatisfiable core.

An unsatisfiable core is called a minimal unsatisfiable core, if every proper subset (allowing removal of any arbitrary clause or clauses) of it is satisfiable. Thus, such a core is a local minimum, though not necessarily a global one. There are several practical methods of computing minimal unsatisfiable cores.[1][2]

A minimum unsatisfiable core contains the smallest number of the original clauses required to still be unsatisfiable. No practical algorithms for computing the minimum core are known.[3] Notice the terminology: whereas minimal unsatisfiable core was a local problem with an easy solution, the minimum unsatisfiable core is a global problem with no known easy solution.

References

N. Dershowitz, Z. Hanna, and A. Nadel, A Scalable Algorithm for Minimal Unsatisfiable Core Extraction
Stefan Szeider, Minimal unsatisfiable formulas with bounded clause-variable difference are fixed-parameter tractable
Algorithms for Computing Minimal Unsatisfiable Subsets

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[1] N. Dershowitz, Z. Hanna, and A. Nadel, A Scalable Algorithm for Minimal Unsatisfiable Core Extraction

[2] Stefan Szeider, Minimal unsatisfiable formulas with bounded clause-variable difference are fixed-parameter tractable

[3] Algorithms for Computing Minimal Unsatisfiable Subsets