On the typical structure of graphs not containing a fixed vertex-critical subgraph

Abstract

This work studies the typical structure of sparse H-free graphs, that is, graphs that do not contain a subgraph isomorphic to a given graph H. Extending the seminal result of Osthus, Pr\"omel, and Taraz that addressed the case where H is an odd cycle, Balogh, Morris, Samotij, and Warnke proved that, for every r 3, the structure of a random Kr+1-free graph with n vertices and m edges undergoes a phase transition when m crosses an explicit (sharp) threshold function mr(n). They conjectured that a similar threshold phenomenon occurs when Kr+1 is replaced by any strictly 2-balanced, edge-critical graph H. In this paper, we resolve this conjecture. In fact, we prove that the structure of a typical H-free graph undergoes an analogous phase transition for every H in a family of vertex-critical graphs that includes all edge-critical graphs.

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