On Coloring Random Subgraphs of a Fixed Graph

Abstract

Given an arbitrary graph G we study the chromatic number of a random subgraph G1/2 obtained from G by removing each edge independently with probability 1/2. Studying (G1/2) has been suggested by Bukh~Bukh, who asked whether E[(G1/2)] ≥ ( (G)/((G))) holds for all graphs G. In this paper we show that for any graph G with chromatic number k = (G) and for all d ≤ k1/3 it holds that [(G1/2) ≤ d] < (- (k(k-d3)d3)). In particular, [G1/2 is bipartite] < (- (k2 )). The later bound is tight up to a constant in (·), and is attained when G is the complete graph on k vertices. As a technical lemma, that may be of independent interest, we prove that if in any d3 coloring of the vertices of G there are at least t monochromatic edges, then [(G1/2) ≤ d] < e- (t). We also prove that for any graph G with chromatic number k = (G) and independence number α(G) ≤ O(n/k) it holds that E[(G1/2)] ≥ ( k/(k) ). This gives a positive answer to the question of Bukh for a large family of graphs.