Maximum independent sets in (pyramid, even hole)-free graphs

Abstract

A hole in a graph is an induced cycle with at least 4 vertices. A graph is even-hole-free if it does not contain a hole on an even number of vertices. A pyramid is a graph made of three chordless paths P1 = a … b1, P2 = a … b2, P3 = a … b3 of length at least~1, two of which have length at least 2, vertex-disjoint except at a, and such that b1b2b3 is a triangle and no edges exist between the paths except those of the triangle and the three edges incident with a. We give a polynomial time algorithm to compute a maximum weighted independent set in a even-hole-free graph that contains no pyramid as an induced subgraph. Our result is based on a decomposition theorem and on bounding the number of minimal separators. All our results hold for a slightly larger class of graphs, the class of (square, prism, pyramid, theta, even wheel)-free graphs.