On the laplacian estrada index of a graph

Jianxi Li; Chee Shiu; An Chang

doi:10.2298/aadm0901147l

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On the laplacian estrada index of a graph

Jianxi Li Chee Shiu An Chang

Year: 2009 Journal: Applicable Analysis and Discrete Mathematics Vol: 3 (1)Pages: 147-156 Publisher: University of Belgrade

DOI: 10.2298/aadm0901147l

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Abstract

Let G be a graph of order n. Let ?1 , ?2 , . . . , ?n be the eigenvalues of the adjacency matrix of G, and let ?1 , ?2 , . . . , ?n be the eigenvalues of the Laplacian matrix of G. Much studied Estrada index of the graph G is defined n as EE = EE(G)= ?n/i=1 e?i . We define and investigate the Laplacian Estrada index of the graph G, LEE=LEE(G)= ?n/i=1 e(?i - 2m/n). Bounds for LEE are obtained, as well as some relations between LEE and graph Laplacian energy.

Keywords:

Mathematics Adjacency matrix Combinatorics Laplacian matrix Graph energy Eigenvalues and eigenvectors Graph Resistance distance Degree matrix Algebraic connectivity Laplace operator Spectral graph theory Discrete mathematics Graph power Line graph Mathematical analysis

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Graph theory and applications

Physical Sciences → Mathematics → Geometry and Topology

Synthesis and Properties of Aromatic Compounds

Physical Sciences → Chemistry → Organic Chemistry

Complex Network Analysis Techniques

Physical Sciences → Physics and Astronomy → Statistical and Nonlinear Physics

On the laplacian estrada index of a graph

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