Spectral radius and perfect k-matchings in t-connected graphs

Abstract

A k-matching of a graph G is a function f:E(G)→\0,1,2,…,k\ with Σe∈ EG(v)f(e)≤ k for each vertex v of G, where EG(v) is the set of edges incident with v in G. A perfect k-matching of a graph G is a k-matching f satisfying Σe∈ EG(v)f(e)=k for any vertex v of G. A fractional perfect matching of a graph G is a function f:E(G)→ [0,1] satisfying Σe∈ EG(v)f(e)=1 for any v∈ V(G). We denote by (G) the spectral radius of G. In this paper, we put forward a tight spectral radius condition for a t-connected graph to possess a perfect k-matching and a tight spectral radius condition for the existence of a perfect k-matching in a t-connected graph with a fractional perfect matching.