The Laplacian spectral radius of graphs - Details

author：

Li, J. (Li, J..) ^[1] | Shiu, W.C. (Shiu, W.C..) ^[2] | Chang, A. (Chang, A..) ^[3]

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Abstract：

The　Laplacian　spectral　radius　of　a　graph　is　the　largest　eigenvalue　of　the　associated　Laplacian　matrix.　In　this　paper,　we　improve　Shi＇s　upper　bound　for　the　Laplacian　spectral　radius　of　irregular　graphs　and　present　some　new　bounds　for　the　Laplacian　spectral　radius　of　some　classes　of　graphs.　©　2010　Mathematical　Institute,　Academy　of　Sciences　of　Czech　Republic.

Keyword：

Bounds; Graph; Laplacian spectral radius

Community：

[ 1 ] [Li, J.]Department of Mathematics and Information Science, Zhangzhou Normal University, Fujian, China
[ 2 ] [Shiu, W.C.]Department of Mathematics, Hong Kong Baptist University, Hong Kong, China
[ 3 ] [Chang, A.]Software College/Center of Discrete Mathematics, Fuzhou University, Fujian 350002, China

Reprint 's Address：

[Li, J.]Department of Mathematics and Information Science, Zhangzhou Normal University, Fujian, China

Email：

fzjxli@tom.com

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Source ：

Czechoslovak Mathematical Journal

ISSN： 0011-4642

Year： 2010

Issue： 3

Volume： 60

Page： 835-847

0 . 2 6 5

JCR@2010

0 . 4 0 0

JCR@2023

JCR Journal Grade：4

CAS Journal Grade：4

Cited Count：

WoS CC Cited Count：

SCOPUS Cited Count： 5

ESI Highly Cited Papers on the List： 0 Unfold All

WanFang Cited Count：

Chinese Cited Count：

30 Days PV： 2

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