Forbidding edge-critical graphs as trace in uniform hypergraphs

Abstract

We say a hypergraph H contains a graph G as trace if there exists a vertex subset S ⊂eq V(H) such that |S| = V(G) and \e S e ∈ E(H)\ contains G as a subgraph. We use ex(n, Trr(G)) to denote the maximum number of edges in an r-uniform hypergraph on n vertices not containing G as trace. The study of Tur\'an numbers for traces was initiated by Mubayi and Zhao~(2017) who studied ex(n, Trr(Ks+1)) where Ks+1 is a clique on s+1 vertices and conjectured the exact value of ex(n, Trr(Ks+1)). When r s, the conjecture was covered by a result of Pikhurko~(2013) who gave the exact value of Tur\'an numbers for expanded cliques. Then Gerbner and Picollelli~(2023) gave the exact value for book graphs~(K1,1,t, the complete tripartite graph with two parts of size one and one part of size t 2). We say G is edge-critical if there exists an edge e ∈ E(G) such that (G - e) < (G) where (G) is the chromatic number of G. The definition of edge-critical was given by Simonovits~(1974), who proved that for an edge-critical graph G with (G) = s+1 3, the Tur\'an graph T(n,s) is the unique extremal graph for ex(n,G) as n is sufficiently large. In this paper, we further generalize the results of Gerbner and Picollelli~(2023) to edge-critical graphs. More precisely, we prove that for an edge-critical graph G with (G) = s+1, when s r 3 and n is sufficiently large, the r-uniform Tur\'an graph Tr(n,s) is the unique extremal hypergraph.