Complexes of graphs with bounded independence number

Abstract

Let G=(V,E) be a graph and n a positive integer. Let In(G) be the abstract simplicial complex whose simplices are the subsets of V that do not contain an independent set of size n in G. We study the collapsibility numbers of the complexes In(G) for various classes of graphs, focusing on the class of graphs with maximum degree bounded by . As an application, we obtain the following result: Let G be a claw-free graph with maximum degree at most . Then, every collection of (2+1)(n-1)+1 independent sets in G has a rainbow independent set of size n.