Expected Chromatic Number of Random Subgraphs

Abstract

Given a graph G and p ∈ [0,1], let Gp denote the random subgraph of G obtained by keeping each edge independently with probability p. Alon, Krivelevich, and Sudokov proved E [(Gp)] ≥ Cp (G) |V(G)|, and Bukh conjectured an improvement of E[(Gp)] ≥ Cp (G) (G). We prove a new spectral lower bound on E[(Gp)], as progress towards Bukh's conjecture. We also propose the stronger conjecture that for any fixed p ≤ 1/2, among all graphs of fixed chromatic number, E[(Gp)] is minimized by the complete graph. We prove this stronger conjecture when G is planar or (G) < 4. We also consider weaker lower bounds on E[(Gp)] proposed in a recent paper by Shinkar; we answer two open questions of Shinkar negatively and propose a possible refinement of one of them.