On graph entropy measures based on the number of independent sets and matchings

Pengfei Wan; Xinzhuang Chen; Jianhua Tu; Matthias Dehmer; Shenggui Zhang; Frank Emmert-Streib

doi:10.1016/j.ins.2019.11.020

On graph entropy measures based on the number of independent sets and matchings

Pengfei Wan
, Xinzhuang Chen
, Jianhua Tu
, Matthias Dehmer^*
, Shenggui Zhang
, Frank Emmert-Streib

^*Corresponding author for this work

Northwestern Polytechnical University Xian
Beijing University of Chemical Technology
Nankai University
Private University for Health Sciences, Medical Informatics and Technology
Upper Austria University of Applied Sciences
Tampere University
Institute of Biosciences and Medical Technology

Research output: Contribution to journal › Article › peer-review

Abstract

In this paper, we consider the graph entropy measures based on the number of independent sets and matchings. The reason to study these measures relates to the fact that the independent set and matching problem is computationally demanding. However, these features can be calculated for smaller networks. In case one can establish efficient estimations, those measures may be also used for larger graphs. So, we establish some upper and lower bounds as well as some information inequalities for these information-theoretic quantities. In order to give further evidence, we also generate numerical results to study these measures such as list the extremal graphs for these entropies. Those results reveal the two entropies possess some new features.

Original language	English
Pages (from-to)	491-504
Number of pages	14
Journal	Information Sciences
Volume	516
DOIs	https://doi.org/10.1016/j.ins.2019.11.020
Publication status	Published - Apr 2020
Externally published	Yes

Keywords

Graph entropy measures
Independent set
Matching
Quantitative graph theory
Subgraph

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10.1016/j.ins.2019.11.020

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title = "On graph entropy measures based on the number of independent sets and matchings",

abstract = "In this paper, we consider the graph entropy measures based on the number of independent sets and matchings. The reason to study these measures relates to the fact that the independent set and matching problem is computationally demanding. However, these features can be calculated for smaller networks. In case one can establish efficient estimations, those measures may be also used for larger graphs. So, we establish some upper and lower bounds as well as some information inequalities for these information-theoretic quantities. In order to give further evidence, we also generate numerical results to study these measures such as list the extremal graphs for these entropies. Those results reveal the two entropies possess some new features.",

keywords = "Graph entropy measures, Independent set, Matching, Quantitative graph theory, Subgraph",

author = "Pengfei Wan and Xinzhuang Chen and Jianhua Tu and Matthias Dehmer and Shenggui Zhang and Frank Emmert-Streib",

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T1 - On graph entropy measures based on the number of independent sets and matchings

AU - Wan, Pengfei

AU - Chen, Xinzhuang

AU - Tu, Jianhua

AU - Dehmer, Matthias

AU - Zhang, Shenggui

AU - Emmert-Streib, Frank

PY - 2020/4

Y1 - 2020/4

N2 - In this paper, we consider the graph entropy measures based on the number of independent sets and matchings. The reason to study these measures relates to the fact that the independent set and matching problem is computationally demanding. However, these features can be calculated for smaller networks. In case one can establish efficient estimations, those measures may be also used for larger graphs. So, we establish some upper and lower bounds as well as some information inequalities for these information-theoretic quantities. In order to give further evidence, we also generate numerical results to study these measures such as list the extremal graphs for these entropies. Those results reveal the two entropies possess some new features.

AB - In this paper, we consider the graph entropy measures based on the number of independent sets and matchings. The reason to study these measures relates to the fact that the independent set and matching problem is computationally demanding. However, these features can be calculated for smaller networks. In case one can establish efficient estimations, those measures may be also used for larger graphs. So, we establish some upper and lower bounds as well as some information inequalities for these information-theoretic quantities. In order to give further evidence, we also generate numerical results to study these measures such as list the extremal graphs for these entropies. Those results reveal the two entropies possess some new features.

KW - Graph entropy measures

KW - Independent set

KW - Matching

KW - Quantitative graph theory

KW - Subgraph

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DO - 10.1016/j.ins.2019.11.020

M3 - Article

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SN - 0020-0255

VL - 516

SP - 491

EP - 504

JO - Information Sciences

JF - Information Sciences

ER -

On graph entropy measures based on the number of independent sets and matchings

Abstract

Keywords

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