The Complexity of Planar Counting Problems

Abstract

We prove the #P-hardness of the counting problems associated with various satisfiability, graph and combinatorial problems, when restricted to planar instances. These problems include romannum [] 3Sat, 1-3Sat, 1-Ex3Sat, Minimum Vertex Cover, Minimum Dominating Set, Minimum Feedback Vertex Set, X3C, Partition Into Triangles, and Clique Cover. romannum We also prove the NP-completeness of the Ambiguous Satisfiability problems Sa80 and the DP-completeness (with respect to random polynomial reducibility) of the unique satisfiability problems VV85 associated with several of the above problems, when restricted to planar instances. Previously, very few #P-hardness results, no NP-hardness results, and no DP-completeness results were known for counting problems, ambiguous satisfiability problems and unique satisfiability problems, respectively, when restricted to planar instances. Assuming P ≠ NP, one corollary of the above results is There are no ε-approximation algorithms for the problems of maximizing or minimizing a linear objective function subject to a planar system of linear inequality constraints over the integers.

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