Characterizing tricyclic graphs with pendant vertices having largest Aα-spectral radius

Abstract

For a graph G with adjacency matrix A(G) and degree diagonal matrix D(G), the Aα-matrix of G is defined as equation* Aα(G) = α D(G) + (1- α) A(G), for any α ∈ [0,1]. equation* The Aα-spectral radius of G is the largest eigenvalue of the matrix Aα(G). A tricyclic graph of order n is a simple connected graph with n+2 edges. In this paper, we characterize the unique graph having the largest Aα-spectral radius for α ∈ [12, 1) among all tricyclic graphs of order n with k (≥ 1) pendant vertices. As an application, we derive a sufficient spectral condition (alternate to the edge condition) to guarantee the absence of the tricyclic structure in a graph with k pendant vertices.

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