Regular subgraphs of uniform hypergraphs
Abstract
We prove that for every integer r≥ 2, an n-vertex k-uniform hypergraph H containing no r-regular subgraphs has at most (1+o(1))n-1k-1 edges if k≥ r+1 and n is sufficiently large. Moreover, if r∈\3,4\, r k and k,n are both sufficiently large, then the maximum number of edges in an n-vertex k-uniform hypergraph containing no r-regular subgraphs is exactly n-1 k-1, with equality only if all edges contain a specific vertex v. We also ask some related questions.
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