A note on exact minimum degree threshold for fractional perfect matchings

TL;DR

This paper establishes the exact minimum degree threshold for fractional perfect matchings in certain uniform hypergraphs, extending previous asymptotic results to precise bounds for a range of degree conditions.

Contribution

It provides the exact minimum degree threshold for fractional perfect matchings in k-uniform hypergraphs for specified degree ranges, improving upon prior asymptotic findings.

Findings

Exact degree threshold formula derived

Threshold is proven to be optimal

Conditions for fractional matchings of various sizes established

Abstract

R\"odl, Ruci\'nski, and Szemer\'edi determined the minimum $(k-1)$-degree threshold for the existence of fractional perfect matchings in $k$-uniform hypergrahs, and K\"uhn, Osthus, and Townsend extended this result by asymptotically determining the $d$-degree threshold for the range $k-1>d\ge k/2$. In this note, we prove the following exact degree threshold: Let $k,d$ be positive integers with $k\ge 4$ and $k-1>d\geq k/2$, and let $n$ be any integer with $n\ge k^2$. Then any $n$-vertex $k$-uniform hypergraph with minimum $d$-degree $\delta_d(H)>{n-d\choose k-d} -{n-d-(\lceil n/k\rceil-1)\choose k-d}$ contains a fractional perfect matching. This lower bound on the minimum $d$-degree is best possible. We also determine optimal minimum $d$-degree conditions which guarantees the existence of fractional matchings of size $s$, where $0<s\le n/k$ (when $k/2\le d\le k-1$), or with $s$ large enough and $s\le n/k$ (when $2k/5<d<k/2$).