Ramin Nasiri, Hamid Reza Ellahi, Gholam Hossein Fath-Tabar, Ahmad Gholami
Published 2014-10-01Version 1
Recently Ayyaswamy [1] have introduced a novel concept of the signless Laplacian Estrada index (after here $SLEE$) associated with a graph $G$. After works, we have identified the unique graph with maximum $SLEE$ with a given parameter such as: number of cut vertices, (vertex) connectivity and edge connectivity. In this paper we continue out characterization for two further parameters; diameter and number of cut vertices.
Comments: 12 pages, 4 figures
Edge Connectivity, Packing Spanning Trees, and eigenvalues of Graphs
On vertex peripherians and Wiener index of graphs with fixed number of cut vertices
Minimum Distance Spectral Radius of Graphs with Given Edge Connectivity
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