On the -th largest degree of an intersecting family

Abstract

Let F⊂[n]k be an intersecting family. For an element i∈[n], the degree of i is the number of sets in F that contain i. Assume that the degrees are ordered as d1 d2·s dn.Huang and Zhao showed that if n>2k, then the minimum degree satisfies dnn-2k-2, with the maximum attained by the 1-star. We strengthen this result by proving that for n 2k+1, the (2k+1)-th largest degree satisfies d2k+1n-2k-2, thereby confirming a conjecture of Frankl and Wang. Furthermore, we prove that for large k and n>12k, the (k+2)-th largest degree dk+2 is already at most n-2k-2. The techniques we developed also yield a tight upper bound for the (+1)-th largest degree d+1 for k k and sufficiently large n>C k.