Isomorphisms between dense random graphs

Authors: Erlang Surya, Lutz Warnke, Emily Zhu

26 pages, 2 figures

Abstract: We consider two variants of the induced subgraph isomorphism problem for two independent binomial random graphs with constant edge-probabilities p_1,p_2. We resolve several open problems of Chatterjee and Diaconis, and also confirm simulation-based predictions of McCreesh, Prosser, Solnon and Trimble: (i) we prove a sharp threshold result for the appearance of G_{n,p_1} as an induced subgraph of G_{N,p_2}, (ii) we show two-point concentration of the maximum common induced subgraph of G_{N, p_1} and G_{N,p_2}, and (iii) we show that the number of induced copies of G_{n,p_1} in G_{N,p_2} has an unusual limiting distribution.

Submitted to arXiv on 08 May. 2023

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