The phase transition in site percolation on pseudo-random graphs

Abstract

We establish the existence of the phase transition in site percolation on pseudo-random d-regular graphs. Let G=(V,E) be an (n,d,λ)-graph, that is, a d-regular graph on n vertices in which all eigenvalues of the adjacency matrix, but the first one, are at most λ in their absolute values. Form a random subset R of V by putting every vertex v∈ V into R independently with probability p. Then for any small enough constant ε>0, if p=1-εd, then with high probability all connected components of the subgraph of G induced by R are of size at most logarithmic in n, while for p=1+εd, if the eigenvalue ratio λ/d is small enough as a function of ε, then typically R spans a connected component of size at least ε nd and a path of length proportional to ε2nd.