Energy, Laplacian energy of double graphs and new families of equienergetic graphs

Abstract

For a graph G with vertex set V(G)=\v1, v2, ·s, vn\, the extended double cover G* is a bipartite graph with bipartition (X, Y), X=\x1, x2, ·s, xn\ and Y=\y1, y2, ·s, yn\, where two vertices xi and yj are adjacent if and only if i=j or vi adjacent to vj in G. The double graph D[G] of G is a graph obtained by taking two copies of G and joining each vertex in one copy with the neighbours of corresponding vertex in another copy. In this paper we study energy and Laplacian energy of the graphs G* and D[G], L-spectra of Gk* the k-th iterated extended double cover of G. We obtain a formula for the number of spanning trees of G*. We also obtain some new families of equienergetic and L-equienergetic graphs.