Distance r-domination number and r-independence complexes of graphs

Abstract

For r≥ 1, the r-independence complex of a graph G, denoted Indr(G), is a simplicial complex whose faces are subsets A ⊂eq V(G) such that each component of the induced subgraph G[A] has at most r vertices. In this article, we establish a relation between the distance r-domination number of G and (homological) connectivity of Indr(G). We also prove that Indr(G), for a chordal graph G, is either contractible or homotopy equivalent to a wedge of spheres. Given a wedge of spheres, we also provide a construction of a chordal graph whose r-independence complex has the homotopy type of the given wedge.