Laplacian spectral characterization of dumbbell graphs and theta graphs
Abstract
Let Pn and Cn denote the path and cycle on n vertices respectively. The dumbbell graph, denoted by Dp,k,q, is the graph obtained from two cycles Cp, Cq and a path Pk+2 by identifying each pendant vertex of Pk+2 with a vertex of a cycle respectively. The theta graph, denoted by r,s,t, is the graph formed by joining two given vertices via three disjoint paths Pr, Ps and Pt respectively. In this paper, we prove that all dumbbell graphs as well as theta graphs are determined by their Laplacian spectra.
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