Exploring Graphs with Distinct M-Eigenvalues: Product Operation, Wronskian Vertices, and Controllability

Abstract

Let GM denote the set of connected graphs with distinct M-eigenvalues. This paper explores the M-spectrum and eigenvectors of a new product GC H of graphs G and H. We present the necessary and sufficient condition for GC H to have distinct M-eigenvalues. Specifically, for the rooted product G H, we present a more concise and precise condition. A key concept, the M-Wronskian vertex, which plays a crucial role in determining graph properties related to separability and construction of specific graph families, is investigated. We propose a novel method for constructing infinite pairs of non-isomorphic M-cospectral graphs in GM by leveraging the structural properties of the M-Wronskian vertex. Moreover, the necessary and sufficient condition for G H to be M-controllable is given.

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