Spectral radius and rainbow k-factors of graphs
Abstract
Let G=\G1,…, Gkn2\ be a set of graphs on the same vertex set V=\1,…,n\ where k· n is even. We say G admits a rainbow k-factor if there exists a k-regular graph F on the vertex set V such that all edges of F are from different members of G. In this paper, we show a sufficient spectral condition for the existence of a rainbow k-factor for k≥ 2, which is that if (Gi)≥(Kk-1(K1 Kn-k)) for each Gi∈ G, then G admits a rainbow k-factor unless G1=G2=·s=Gkn2 Kk-1(K1 Kn-k).
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