On a d-degree Erdos-Ko-Rado Theorem

Abstract

A family of subsets F is intersecting if A B ≠ for any A, B ∈ F. In this paper, we show that for given integers k > d 2 and n 2k+2d-3, and any intersecting family F of k-subsets of \1, ·s, n\, there exists a d-subset of [n] contained in at most n-d-1k-d-1 subsets of F. This result, proved using spectral graph theory, gives a d-degree generalization of the celebrated Erdos-Ko-Rado Theorem, improving a theorem of Kupavskii.

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