Shadows of 3-uniform hypergraphs under a minimum degree condition
Abstract
We prove a minimum degree version of the Kruskal--Katona theorem: given d 1/4 and a triple system F on n vertices with minimum degree at least d n2, we obtain asymptotically tight lower bounds for the size of its shadow. Equivalently, for t n/2-1, we asymptotically determine the minimum size of a graph on n vertices, in which every vertex is contained in at least t2 triangles. This can be viewed as a variant of the Rademacher--Tur\'an problem.
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