Random Subgraphs in Sparse Graphs

Abstract

We investigate the threshold probability for connectivity of sparse graphs under weak assumptions. As a corollary this completely solve the problem for Cartesian powers of arbitrary graphs. In detail, let G be a connected graph on k vertices, Gn the n-th Cartesian power of G, αi be the number of vertices of degree i of G, λ be a positive real number, and Gnp be the graph obtained from Gn by deleting every edge independently with probability 1-p. If Σiαi(1-p)i=λ1n, then n→ ∞P[Gnp \ is\ connected]=(-λ). This result extends known results for regular graphs. The main result implies that the threshold probability does not depend on the graph structure of G itself, but only on the degree sequence of the graph.