Topological transition in a coupled dynamic in random networks

In this work, we study the topological transition on the associated networks in a model proposed by Saeedian et al. (Scientific Reports 2019 9:9726), which considers a coupled dynamics of node and link states. Our goal was to better understand the two observed phases, so we use another network struc...

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Bibliographic Details
Published in:arXiv.org 2022-04
Main Authors: Paulo Freitas Gomes, Henrique Almeida Fernandes, Ariadne de Andrade Costa
Format: Article
Language:English
Subjects:
Alliances
Mathematical models
Nodes
Order parameters
Topology
Online Access:Get full text
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Summary:In this work, we study the topological transition on the associated networks in a model proposed by Saeedian et al. (Scientific Reports 2019 9:9726), which considers a coupled dynamics of node and link states. Our goal was to better understand the two observed phases, so we use another network structure (the so called random geometric graph - RGG) together with other metrics borrowed from network science. We observed a topological transition on the two associated networks, which are subgraphs of the full network. As the links have two possible states (friendly and non-friendly), we defined each associated network as composed of only one type of link. The (non) friendly associated network has (non) friendly links only. This topological transition was observed from the domain distribution of each associated network between the two phases of the system (absorbing and active). We also showed that another metric from network science called modularity (or assortative coefficient) can also be used as order parameter, giving the same phase diagram as the original order parameter from the seminal work. On the absorbing phase the absolute value of the modularity for each associated network reaches a maximum value, while on the active phase they fall to the minimum value.
ISSN:2331-8422
DOI:10.48550/arxiv.2112.04874