On the largest degrees in intersecting hypergraphs

Abstract

Let [n]k denote the collection of all k-subsets of the standard n-set [n]=\1,2,…,n\. Let n>2k and let F⊂ [n]k be an intersecting k-graph, i.e., F F'≠ for all F,F'∈ F. The number of edges F∈ F containing x∈ [n] is called the degree of x. Assume that d1≥ d2≥ …≥ dn are the degrees of F in decreasing order. An important result of Huang and Zhao states that for n>2k the minimum degree dn is at most n-2k-2. For n≥ 6k-9 we strengthen this result by showing d2k+1≤ n-2k-2. As to the second and third largest degrees we prove the best possible bound d3≤ d2≤ n-2k-2+n-3k-2 for n>2k. Several more best possible results of a similar nature are established.

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