On Satisfiability Problems with a Linear Structure

February 25, 2016 Β· Declared Dead Β· πŸ› International Symposium on Parameterized and Exact Computation

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Authors Serge Gaspers, Christos Papadimitriou, Sigve Hortemo Saether, Jan Arne Telle arXiv ID 1602.07876 Category cs.DS: Data Structures & Algorithms Cross-listed cs.CC Citations 7 Venue International Symposium on Parameterized and Exact Computation Last Checked 4 months ago
Abstract
It was recently shown \cite{STV} that satisfiability is polynomially solvable when the incidence graph is an interval bipartite graph (an interval graph turned into a bipartite graph by omitting all edges within each partite set). Here we relax this condition in several directions: First, we show that it holds for $k$-interval bigraphs, bipartite graphs which can be converted to interval bipartite graphs by adding to each node of one side at most $k$ edges; the same result holds for the counting and the weighted maximization version of satisfiability. Second, given two linear orders, one for the variables and one for the clauses, we show how to find, in polynomial time, the smallest $k$ such that there is a $k$-interval bigraph compatible with these two orders. On the negative side we prove that, barring complexity collapses, no such extensions are possible for CSPs more general than satisfiability. We also show NP-hardness of recognizing 1-interval bigraphs.
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