On sum of powers of the Laplacian eigenvalues of graphs.

Abstract: Let be a simple graph with vertex set and edge set . The Laplacian matrix of G is , where is the diagonal matrix of its vertex degrees and is the adjacency matrix. Let be the Laplacian eigenvalues of G. For a graph G and a real number , the graph invariant is the sum of the β-th power of the non-zero Laplacian eigenvalues of G, that is, In this paper, we obtain some lower and upper bounds on for G in terms of n, the number of edges m, maximum degree , clique number ω, independence number α and the number of spanning trees t. Moreover, we present some Nordhaus–Gaddum-type results for of G. [Copyright &y& Elsevier]