An analytical study of the behavior of the voter model on the small-world topology is performed. In order to solve the equations for the dynamics, we consider an annealed version of the Watts-Strogatz (WS) network, where long-range connections are randomly chosen at each time step. The resulting dynamics is as rich as on the original WS network. A temporal scale ? separates a quasistationary disordered state with coexisting domains from a fully ordered frozen configuration. ? is proportional to the number of nodes in the network, so that the system remains asymptotically disordered in the thermodynamic limit.
Solution of voter model dynamics on annealed small-world networks
Daniele Vilone;Claudio Castellano
2004
Abstract
An analytical study of the behavior of the voter model on the small-world topology is performed. In order to solve the equations for the dynamics, we consider an annealed version of the Watts-Strogatz (WS) network, where long-range connections are randomly chosen at each time step. The resulting dynamics is as rich as on the original WS network. A temporal scale ? separates a quasistationary disordered state with coexisting domains from a fully ordered frozen configuration. ? is proportional to the number of nodes in the network, so that the system remains asymptotically disordered in the thermodynamic limit.File in questo prodotto:
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