The emergence of a giant component in random subgraphs of pseudo-random graphs

Abstract

Let G be a d-regular graph G on n vertices. Suppose that the adjacency matrix of G is such that the eigenvalue λ which is second largest in absolute value satisfies λ=o(d). Let Gp with p=αd be obtained from G by including each edge of G independently with probability p. We show that if α<1 then whp the maximum component size of Gp is O( n) and if α>1 then Gp contains a unique giant component of size (n), with all other components of size O( n).