A local spectral condition for perfect matchings in 3-graphs

Abstract

Let γ be a constant such that 0 < γ < 1, and let n be a sufficiently large integer. Consider a 3-uniform hypergraph H on n vertices. In 2013, K\"uhn, Osthus, and Treglown, along with Khan independently, proved that for large enough n with n 03, if δ1(H)≥2n/32, then H admits a perfect matching. For any vertex v∈ V(H), we define NH(v) as the 2-graph with vertex set V(H)\v\ and edge set E(NH(v)) = \e⊂eq V(H)\v\: e \v\∈ E(H)\. In this paper, we show that if (NH(v)) > (2/3+γ)n for all v∈ V(H), where (NH(v)) denotes the spectral radius of NH(v), then H has a perfect matching. This bound is asymptotically tight. Furthermore, for integer s satisfying n≥ 3s+3, we establish that if \[ (NH(v))>12(s-1+(s-1)2+4s(n-s-1))\] holds for every v∈ V(H), then H admits a fractional matching of size s+1. Notably, this second spectral bound is tight.