Random Tur\'an Problems for Ks,t Expansions

Abstract

Let Ks,t(r) denote the r-uniform hypergraph obtained from the graph Ks,t by inserting r-2 new vertices inside each edge of Ks,t. We prove essentially tight bounds on the size of a largest Ks,t(r)-subgraph of the random r-uniform hypergraph Gn,pr whenever r 2s/3+2, giving the first random Tur\'an results for expansions that go beyond a natural "tight-tree barrier." In addition to this, our methods yield optimal supersaturation results for Ks,t(3) for sufficiently dense host hypergraphs, which may be of independent interest.

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