Spectral Conditions, Degree Sequences, and Graphical Properties

Xiao-Min Zhu; Weijun Liu; Xu Yang

doi:10.3390/math11204264

Mathematics (Oct 2023)

Spectral Conditions, Degree Sequences, and Graphical Properties

Xiao-Min Zhu,
Weijun Liu,
Xu Yang

Affiliations

Xiao-Min Zhu: College of Sciences, Shanghai Institute of Technology, Shanghai 201418, China
Weijun Liu: College of General Education, Guangdong University of Science and Technology, Dongguan 523083, China
Xu Yang: School of Statistics and Mathematics, Shanghai Lixin University of Accounting and Finance, Shanghai 201209, China

DOI: https://doi.org/10.3390/math11204264
Journal volume & issue: Vol. 11, no. 20
p. 4264

Abstract

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Integrity, tenacity, binding number, and toughness are significant parameters with which to evaluate network vulnerability and stability. However, we hardly use the definitions of these parameters to evaluate directly. According to the methods, concerning the spectral radius, we show sufficient conditions for a graph to be k-integral, k-tenacious, k-binding, and k-tough, respectively. In this way, the vulnerability and stability of networks can be easier to characterize in the future.

Published in Mathematics

ISSN: 2227-7390 (Online)
Publisher: MDPI AG
Country of publisher: Switzerland
LCC subjects: Science: Mathematics
Website: http://www.mdpi.com/journal/mathematics

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