Convex combinations of centrality measures
Despite a plethora of centrality measures were proposed, there is no consensus on what centrality is exactly due to the shortcomings each measure has. In this manuscript, we propose to combine centrality measures pertinent to a network by forming their convex combinations. We found that some combina...
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my.um.eprints.269942022-04-08T07:02:39Z http://eprints.um.edu.my/26994/ Convex combinations of centrality measures Keng, Ying Ying Kwa, Kiam Heong McClain, Christopher HM Sociology QA Mathematics Despite a plethora of centrality measures were proposed, there is no consensus on what centrality is exactly due to the shortcomings each measure has. In this manuscript, we propose to combine centrality measures pertinent to a network by forming their convex combinations. We found that some combinations, induced by regular points, split the nodes into the largest number of classes by their rankings. Moreover, regular points are found with probability 1 and their induced rankings are insensitive to small variation. By contrast, combinations induced by critical points are scarce, but their presence enables the variation in node rankings. We also discuss how optimum combinations could be chosen, while proving various properties of the convex combinations of centrality measures. Taylor & Francis Inc 2021-10-02 Article PeerReviewed Keng, Ying Ying and Kwa, Kiam Heong and McClain, Christopher (2021) Convex combinations of centrality measures. Journal of Mathematical Sociology, 45 (4). pp. 195-222. ISSN 0022-250X, DOI https://doi.org/10.1080/0022250X.2020.1765776 <https://doi.org/10.1080/0022250X.2020.1765776>. 10.1080/0022250X.2020.1765776 |
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HM Sociology QA Mathematics Keng, Ying Ying Kwa, Kiam Heong McClain, Christopher Convex combinations of centrality measures |
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Despite a plethora of centrality measures were proposed, there is no consensus on what centrality is exactly due to the shortcomings each measure has. In this manuscript, we propose to combine centrality measures pertinent to a network by forming their convex combinations. We found that some combinations, induced by regular points, split the nodes into the largest number of classes by their rankings. Moreover, regular points are found with probability 1 and their induced rankings are insensitive to small variation. By contrast, combinations induced by critical points are scarce, but their presence enables the variation in node rankings. We also discuss how optimum combinations could be chosen, while proving various properties of the convex combinations of centrality measures. |
| format |
Article |
| author |
Keng, Ying Ying Kwa, Kiam Heong McClain, Christopher |
| author_facet |
Keng, Ying Ying Kwa, Kiam Heong McClain, Christopher |
| author_sort |
Keng, Ying Ying |
| title |
Convex combinations of centrality measures |
| title_short |
Convex combinations of centrality measures |
| title_full |
Convex combinations of centrality measures |
| title_fullStr |
Convex combinations of centrality measures |
| title_full_unstemmed |
Convex combinations of centrality measures |
| title_sort |
convex combinations of centrality measures |
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Taylor & Francis Inc |
| publishDate |
2021 |
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http://eprints.um.edu.my/26994/ |
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1735409485607862272 |
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13.211869 |