부산대학교 도서관

We study the typical structure of a sparse Erd\H{o}s--R\'enyi random graph conditioned on the lower tail subgraph count event. We show that in certain regimes, a typical graph sampled from the conditional distribution resembles the entropy minimizer of the mean field approximation in the sense of both subgraph counts and cut norm. The main ingredients are an adaptation of an entropy increment scheme of Kozma and Samotij, and a new stability for the solution of the associated entropy variational problem. Our proof suggests a more general framework for establishing typical behavior statements when the objects of interest can be encoded in a hypergraph satisfying mild degree conditions.
Comment: 13 pages, comments welcome!