A note on the Ratio and Inertia Bounds for the k-Independence Number

Abstract

The k-th power Gk of a graph G is the graph on the same vertex set where the edge set consists of those pairs of distinct vertices of G that are at distance at most k from each other. A. Abiad, G. Coutinho, and M. A. Fiol [On the k-independence number of graphs, Discrete Mathematics 342 (2019), 2875--2885] proposed extensions of the classical ratio (for regular graphs) and inertia bounds to the independence number of Gk for k 2. Continuing a line of work comparing these two parameters with other known bounds, we show that the -function of L. Lovász and the weighted inertia bound of A. R. Calderbank and P. Frankl, when applied directly to Gk, perform at least as well as the ratio and inertia bounds of Abiad-Coutinho-Fiol, respectively. In particular, (Gk) provides a polynomial-time computable upper bound on the independence number of Gk that is at least as strong as the ratio bound when the latter applies (i.e.,\ when the graph G is regular).