A Quantitative Local Limit Theorem for Triangles in Random Graphs
Abstract
In this paper we prove a quantiative local limit theorem for the distribution of the number of triangles in the Erdos-Renyi random graph G(n,p), for a fixed p∈ (0,1). This proof is an extension of the previous work of Gilmer and Kopparty, who proved that the local limit theorem held asymptotically for triangles. Our work gives bounds on the 1 and ∞ distance of the triangle distribution from a suitable discrete normal.
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