The existence of a \P2,C3,P5,T(3)\-factor based on the size or the Aα-spectral radius of graphs
Abstract
Let G be a connected graph of order n. A \P2,C3,P5,T(3)\-factor of G is a spanning subgraph of G such that each component is isomorphic to a member in \P2,C3,P5,T(3)\, where T(3) is a \1,2,3\-tree. The Aα-spectral radius of G is denoted by α(G). In this paper, we obtain a lower bound on the size or the Aα-spectral radius for α∈[0,1) of G to guarantee that G has a \P2,C3,P5,T(3)\-factor, and construct an extremal graph to show that the bound on Aα-spectral radius is optimal.
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