Isolation critical graphs under multiple edge subdivision

Abstract

This paper introduces the notion of an (,q)-critical graph. The isolation number of a graph G, denoted by (G) and also known as the vertex-edge domination number of G, is the size of a smallest subset D of the vertex set of G such that the subgraph induced by the set of vertices that are not in the closed neighbourhood of D has no edges. A graph G is (,q)-critical if every subdivision of q edges of G gives a graph whose isolation number is greater than (G), and G has q-1 edges such that subdividing them gives a graph whose isolation number is (G). We show that an (,q)-critical graph exists for every integer q 1. We prove that if G is a connected m-edge non-star graph, then G is (,q)-critical for some q m - 1. We show that this bound is best possible. We provide a general characterization of (,1)-critical graphs as well as a constructive characterization of (,1)-critical trees, demonstrating that (,1)-criticality can be checked in linear time for trees.