Degree versions of the Erdos-Ko-Rado Theorem and Erdos hypergraph matching conjecture

Abstract

We use an algebraic method to prove a degree version of the celebrated Erd os-Ko-Rado theorem: given n>2k, every intersecting k-uniform hypergraph H on n vertices contains a vertex that lies on at most n-2k-2 edges. This result can be viewed as a special case of the degree version of a well-known conjecture of Erdos on hypergraph matchings. Improving the work of Bollob\'as, Daykin, and Erd os from 1976, we show that given integers n, k, s with n 3k2 s, every k-uniform hypergraph H on n vertices with minimum vertex degree greater than n-1k-1-n-sk-1 contains s disjoint edges.