Random Tur\'an Problems for Hypergraph Expansions

Abstract

Given an r0-uniform hypergraph F, we define its r-uniform expansion F(r) to be the hypergraph obtained from F by inserting r-r0 distinct vertices into each edge of F, and we define ex(Gn,pr,F(r)) to be the largest F(r)-free subgraph of the random hypergraph Gn,pr. We initiate the first systematic study of ex(Gn,pr,F(r)) for general hypergraphs F. Our main result essentially resolves this problem for large r by showing that ex(Gn,pr,F(r)) goes through three predictable phases whenever F is Sidorenko and r is sufficiently large, with the behavior of ex(Gn,pr,F(r)) being provably more complex whenever F has no Sidorenko expansion. Moreover, our methods unify and generalize almost all previously known results for the random Tur\'an problem for degenerate hypergraphs of uniformity at least 3.