0000000000613836

AUTHOR

Rosemary J. Harris

showing 2 related works from this author

Metastability of Traffic Flow in Zero-Range Model

2007

The development of traffic jams in vehicular flow is an everyday example of the occurence of phase separation in low-dimensional driven systems, a topic which has attracted much recent interest [1–4]. In [5] the existence of phase separation is related to the size-dependence of domain currents and a quantitative criterion is obtained by considering the zero-range process (ZRP) as a generic model for domain dynamics. We use zero-range picture to study the phase separation in traffic flow in the spirit of the probabilistic (master equation) description of transportation [6]. Significantly, we find [7] that prior to condensation studied in previous works [8, 9] the system can exist in a homoge…

PhysicsWork (thermodynamics)Grand canonical ensembleFlow (mathematics)MetastabilityDiagramMaster equationNucleationStatistical physicsTraffic flow
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Zero-range model of traffic flow.

2005

A multi--cluster model of traffic flow is studied, in which the motion of cars is described by a stochastic master equation. Assuming that the escape rate from a cluster depends only on the cluster size, the dynamics of the model is directly mapped to the mathematically well-studied zero-range process. Knowledge of the asymptotic behaviour of the transition rates for large clusters allows us to apply an established criterion for phase separation in one-dimensional driven systems. The distribution over cluster sizes in our zero-range model is given by a one--step master equation in one dimension. It provides an approximate mean--field dynamics, which, however, leads to the exact stationary s…

Work (thermodynamics)Physics - Physics and SocietyStatistical Mechanics (cond-mat.stat-mech)Stochastic processThermodynamicsFOS: Physical sciencesPhysics and Society (physics.soc-ph)Critical valueTraffic flowJMetastabilityMaster equationCluster (physics)ddc:530Statistical physicsStationary stateCondensed Matter - Statistical MechanicsMathematicsPhysical review. E, Statistical, nonlinear, and soft matter physics
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