Asymptotic normality for triangle counting in the sparse β-model
Abstract
We study the number of triangles Tn in the sparse β-model on n vertices, a random graph model that captures degree heterogeneity in real-world networks. Using the norms of the heterogeneity parameter vector, we first determine the asymptotic mean and variance of Tn. Next, by applying the Malliavin-Stein method, we derive a non-asymptotic upper bound on the Kolmogorov distance between normalized Tn and the standard normal distribution. Under an additional assumption on degree heterogeneity, we further prove the asymptotic normality for Tn, as n∞.
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