Kinetics of the one-dimensional voter model with long-range interactions

IF 2.6 Q1 MATHEMATICS, INTERDISCIPLINARY APPLICATIONS Journal of Physics Complexity Pub Date : 2024-06-04 DOI:10.1088/2632-072x/ad4dfb
Federico Corberi and Claudio Castellano
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Abstract

The voter model is an extremely simple yet nontrivial prototypical model of ordering dynamics, which has been studied in great detail. Recently, a great deal of activity has focused on long-range statistical physics models, where interactions take place among faraway sites, with a probability slowly decaying with distance. In this paper, we study analytically the one-dimensional long-range voter model, where an agent takes the opinion of another at distance r with probability . The model displays rich and diverse features as α is changed. For α > 3 the behavior is similar to the one of the nearest-neighbor version, with the formation of ordered domains whose typical size grows as until consensus (a fully ordered configuration) is reached. The correlation function between two agents at distance r obeys dynamical scaling with sizeable corrections at large distances , slowly fading away in time. For violations of scaling appear, due to the simultaneous presence of two lengh-scales, the size of domains growing as , and the distance over which correlations extend. For the system reaches a partially ordered stationary state, characterised by an algebraic correlator, whose lifetime diverges in the thermodynamic limit of infinitely many agents, so that consensus is not reached. For a finite system escape towards the fully ordered configuration is finally promoted by development of large distance correlations. In a system of N sites, global consensus is achieved after a time for α > 3, for , and for .
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具有长程相互作用的一维选民模型动力学
投票者模型是一个极其简单但又非简单的有序动力学原型模型,人们对它进行了深入细致的研究。最近,大量研究都集中在远距离统计物理模型上,在这种模型中,相互作用发生在遥远的地点之间,概率随距离缓慢衰减。在本文中,我们分析研究了一维远距离选民模型,其中一个代理人以概率 。随着 α 的变化,该模型显示出丰富多样的特征。当 α > 3 时,该模型的行为类似于近邻模型,会形成有序域,其典型大小随着共识(完全有序配置)的达成而增长。距离 r 的两个代理之间的相关函数服从动态缩放,在距离较大时有相当大的修正,并随着时间的推移慢慢消失。由于同时存在两个长度尺度,即域的大小随着距离的增大而增大,以及相关性延伸的距离。系统会达到部分有序的静止状态,其特征是代数相关器,其寿命在无限多代理的热力学极限下发散,因此无法达成共识。对于有限系统来说,大距离相关性的发展最终会促进系统向完全有序的构型逃逸。在一个由 N 个位点组成的系统中,当 α > 3、 、 和 时,会在一段时间后达成全局共识。
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来源期刊
Journal of Physics Complexity
Journal of Physics Complexity Computer Science-Information Systems
CiteScore
4.30
自引率
11.10%
发文量
45
审稿时长
14 weeks
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