Sufficient conditions for a graph with minimum degree to have a component factor

Abstract

Let Tkr denote the set of trees T such that i(T-S)≤kr|S| for any S⊂ V(T) and for any e∈ E(T) there exists a set S*⊂ V(T) with i((T-e)-S*)>kr|S*|, where r<k are two positive integers. A \C2i+1,T:1≤ i<rk-r,T∈Tkr\-factor of a graph G is a spanning subgraph of G, in which every component is isomorphic to an element in \C2i+1,T:1≤ i<rk-r,T∈Tkr\. Let A(G) and Q(G) denote the adjacency matrix and the signless Laplacian matrix of G, respectively. The adjacency spectral radius and the signless Laplacian spectral radius of G, denoted by (G) and q(G), are the largest eigenvalues of A(G) and Q(G), respectively. In this paper, we study the connections between the spectral radius and the existence of a \C2i+1,T:1≤ i<rk-r,T∈Tkr\-factor in a graph. We first establish a tight sufficient condition involving the adjacency spectral radius to guarantee the existence of a \C2i+1,T:1≤ i<rk-r,T∈Tkr\-factor in a graph. Then we propose a tight signless Laplacian spectral radius condition for the existence of a \C2i+1,T:1≤ i<rk-r,T∈Tkr\-factor in a graph.

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