A local limit theorem for the edge counts of random induced subgraphs of a random graph
Abstract
Consider a `dense' Erdos--R\'enyi random graph model G=Gn,M with n vertices and M edges, where we assume the edge density M/n2 is bounded away from 0 and 1. Fix k=k(n) with k/n bounded away from 0 and~1, and let S be a random subset of size k of the vertices of G. We show that with probability 1-(-n(1)), G satisfies both a central limit theorem and a local limit theorem for the empirical distribution of the edge count e(G[S]) of the subgraph of G induced by S, where the distribution is over uniform random choices of the k-set S.
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