An Independent Process Approximation to Sparse Random Graphs with a Prescribed Number of Edges and Triangles

Abstract

We prove a pre-asymptotic bound on the total variation distance between the uniform distribution over two types of undirected graphs with n nodes. One distribution places a prescribed number of kT triangles and kS edges not involved in a triangle independently and uniformly over all possibilities, and the other is the uniform distribution over simple graphs with exactly kT triangles and kS edges not involved in a triangle. As a corollary, for kS = o(n) and kT = o(n) as n tends to infinity, the total variation distance tends to 0, at a rate that is given explicitly. Our main tool is Chen-Stein Poisson approximation, hence our bounds are explicit for all finite values of the parameters.