Artículo
Erdós-Rényi phase transition in the Axelrod model on complete graphs
Fecha de publicación:
05/2020
Editorial:
American Physical Society
Revista:
Physical Review E: Covering Statistical, Nonlinear, Biological, and Soft Matter Physics
ISSN:
2470-0053
Idioma:
Inglés
Tipo de recurso:
Artículo publicado
Clasificación temática:
Resumen
The Axelrod model has been widely studied since its proposal for social influence and cultural dissemination. In particular, the community of statistical physics focused on the presence of a phase transition as a function of its two main parameters, F and Q. In this work, we show that the Axelrod model undergoes a second-order phase transition in the limit of F→∞ on a complete graph. This transition is equivalent to the Erdos-Rényi phase transition in random networks when it is described in terms of the probability of interaction at the initial state, which depends on a scaling relation between F and Q. We also found that this probability plays a key role in sparse topologies by collapsing the transition curves for different values of the parameter F.
Palabras clave:
Modelo de Axelrod
,
Modelo de Erdos-Renyi
,
Transiciones de fase
Archivos asociados
Licencia
Identificadores
Colecciones
Articulos(IFIBA)
Articulos de INST.DE FISICA DE BUENOS AIRES
Articulos de INST.DE FISICA DE BUENOS AIRES
Citación
Pinto, Sebastián; Balenzuela, Pablo; Erdós-Rényi phase transition in the Axelrod model on complete graphs; American Physical Society; Physical Review E: Covering Statistical, Nonlinear, Biological, and Soft Matter Physics; 101; 5; 5-2020; 1-6
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