Saved in:
Bibliographic Details
Main Authors: Boldi, Paolo, Furia, Flavio, Prezioso, Chiara
Format: Preprint
Published: 2025
Subjects:
Online Access:https://arxiv.org/abs/2506.19670
Tags: Add Tag
No Tags, Be the first to tag this record!
_version_ 1866915634115248128
author Boldi, Paolo
Furia, Flavio
Prezioso, Chiara
author_facet Boldi, Paolo
Furia, Flavio
Prezioso, Chiara
contents Centrality indices are used to rank the nodes of a graph by importance: this is a common need in many concrete situations (social networks, citation networks, web graphs, for instance) and it was discussed many times in sociology, psychology, mathematics and computer science, giving rise to a whole zoo of definitions of centrality. Although they differ widely in nature, many centrality measures are based on shortest-path distances: such centralities are often referred to as geometric. Geometric centralities can use the shortest-path-length information in many different ways, but most of the existing geometric centralities can be defined as a linear transformation of the distance-count vector (that is, the vector containing, for every index t, the number of nodes at distance t). In this paper we study this class of centralities, that we call linear (geometric) centralities, in their full generality. In particular, we look at them in the light of the axiomatic approach, and we study their expressivity: we show to what extent linear centralities can be used to distinguish between nodes in a graph, and how many different rankings of nodes can be induced by linear centralities on a given graph. The latter problem (which has a number of possible applications, especially in an adversarial setting) is solved by means of a linear programming formulation, which is based on Farkas' lemma, and is interesting in its own right.
format Preprint
id arxiv_https___arxiv_org_abs_2506_19670
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Properties and Expressivity of Linear Geometric Centralities
Boldi, Paolo
Furia, Flavio
Prezioso, Chiara
Social and Information Networks
Centrality indices are used to rank the nodes of a graph by importance: this is a common need in many concrete situations (social networks, citation networks, web graphs, for instance) and it was discussed many times in sociology, psychology, mathematics and computer science, giving rise to a whole zoo of definitions of centrality. Although they differ widely in nature, many centrality measures are based on shortest-path distances: such centralities are often referred to as geometric. Geometric centralities can use the shortest-path-length information in many different ways, but most of the existing geometric centralities can be defined as a linear transformation of the distance-count vector (that is, the vector containing, for every index t, the number of nodes at distance t). In this paper we study this class of centralities, that we call linear (geometric) centralities, in their full generality. In particular, we look at them in the light of the axiomatic approach, and we study their expressivity: we show to what extent linear centralities can be used to distinguish between nodes in a graph, and how many different rankings of nodes can be induced by linear centralities on a given graph. The latter problem (which has a number of possible applications, especially in an adversarial setting) is solved by means of a linear programming formulation, which is based on Farkas' lemma, and is interesting in its own right.
title Properties and Expressivity of Linear Geometric Centralities
topic Social and Information Networks
url https://arxiv.org/abs/2506.19670