An Aα-spectral radius for the existence of P3, P4, P5-factors in graphs

Abstract

Let G be a connected graph of order n with n≥25. A \P3,P4,P5\-factor is a spanning subgraph H of G such that every component of H is isomorphic to an element of \P3,P4,P5\. Nikiforov introduced the Aα-matrix of G as Aα(G)=α D(G)+(1-α)A(G) [V. Nikiforov, Merging the A- and Q-spectral theories, Appl. Anal. Discrete Math. 11 (2017) 81--107], where α∈[0,1], D(G) denotes the diagonal matrix of vertex degrees of G and A(G) denotes the adjacency matrix of G. The largest eigenvalue of Aα(G), denoted by λα(G), is called the Aα-spectral radius of G. In this paper, it is proved that G has a \P3,P4,P5\-factor unless G=K1(Kn-2 K1) if λα(G)≥λα(K1(Kn-2 K1)), where α be a real number with 0≤α<23.