An Improved Threshold for the Minimum Degree Kruskal-Katona Theorem for 3-Uniform Hypergraphs

Abstract

Given a set X and a sufficiently large integer t, let F be a family of k-subsets of X. The Kruskal-Katona theorem states that if |F|≥ tk, then |∂k-1F|≥tk-1. The minimum degree version of this problem asks: if δ(F)≥ tk-1, how small can |∂k-1F| be? In this article, for the case k=3, we prove that every extremal graph for this problem contains an isolated copy of Kt+13 whenever |X| ≥ ct2 + o(t2), with the constant c = 1 + 928/33. Our proof uses a graph transformation that regularizes the neighborhood structure of extremal graphs, reducing the problem to a counting argument on the neighbors of a disjoint clique family. This improves a result of F\"uredi and Zhao [SIAM J.\ Discrete Math.\ 36(4), 2022], reducing the threshold from O(t3) to O(t2).