Color-avoiding percolation of random graphs: between the subcritical and the intermediate regime

Abstract

Fix a graph G in which every edge is colored in some of k 2 colors. Two vertices u and v are CA-connected if u and v may be connected using any subset of k - 1 colors. CA-connectivity is an equivalence relation dividing the vertex set into classes called CA-components. In two recent papers, R\'ath, Varga, Fekete, and Molontay, and Lichev and Schapira studied the size of the largest CA-component in a randomly colored random graph. The second of these works distinguished and studied three regimes (supercritical, intermediate, and subcritical) in which the largest CA-component has respectively linear, logarithmic, and bounded size. In this short note, we describe the phase transition between the intermediate and the subcritical regime.