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author:

Li, Jianxi (Li, Jianxi.) [1] | Shiu, Wai Chee (Shiu, Wai Chee.) [2] | Chang, An (Chang, An.) [3] (Scholars:常安)

Indexed by:

Scopus SCIE

Abstract:

The Laplacian spectral radius of a graph is the largest eigenvalue of the ass ociated 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.

Keyword:

bounds graph Laplacian spectral radius

Community:

  • [ 1 ] [Li, Jianxi]Zhangzhou Normal Univ, Dept Math & Informat Sci, Zhangzhou, Fujian, Peoples R China
  • [ 2 ] [Shiu, Wai Chee]Hong Kong Baptist Univ, Dept Math, Hong Kong, Hong Kong, Peoples R China
  • [ 3 ] [Chang, An]Fuzhou Univ, Ctr Discrete Math, Software Coll, Fuzhou 350002, Fujian, Peoples R China

Reprint 's Address:

  • [Li, Jianxi]Zhangzhou Normal Univ, Dept Math & Informat Sci, Zhangzhou, Fujian, Peoples R China

Email:


fzjxli@tom.com |
wcshiu@hkbu.edu.hk |
anchang@fzu.edu.cn
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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

ESI Discipline: MATHEMATICS;

JCR Journal Grade:4

CAS Journal Grade:4

Cited Count:

WoS CC Cited Count: 3

SCOPUS Cited Count: 6

ESI Highly Cited Papers on the List: 0 Unfold All

WanFang Cited Count:

Chinese Cited Count:

30 Days PV: 0

Affiliated Colleges:

数学与统计学院 本学院/部未明确归属的数据

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