Spectral radius and rainbow matchings of graphs
Abstract
Let n,m be integers such that 1≤ m≤ (n-2)/2 and let [n]=\1,…,n\. Let G=\G1,…,Gm+1\ be a family of graphs on the same vertex set [n]. In this paper, we prove that if for any i∈ [m+1], the spectral radius of Gi is not less than \2m,12(m-1+(m-1)2+4m(n-m))\, then G admits a rainbow matching, i.e. a choice of disjoint edges ei∈ Gi, unless G1=G2=…=Gm+1 and G1∈ \K2m+1 (n-2m-1)K1, Km (n-m)K1\.
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