A matrix ansatz for the diffusion of an impurity in the asymmetric exclusion process

Cédric Boutillier; Paul François; Kirone Mallick; Shamlal Mallick

doi:10.1088/0305-4470/35/46/301

A matrix ansatz for the diffusion of an impurity in the asymmetric exclusion process

Cédric Boutillier, Paul François, Kirone Mallick, Shamlal Mallick

Research output: Contribution to journal › Article › peer-review

Abstract

We study the fluctuations of the position of an impurity in the asymmetric exclusion process on a ring with an arbitrary number of particles and holes. The steady state of this model is exactly known and four different phases appear in the limit of a large system. We calculate the diffusion constant of the impurity by using a matrix product method and also obtain a representation for unequal time correlation functions. We show that our results found by the matrix ansatz agree with those obtained previously by the Bethe ansatz.

Original language	English
Pages (from-to)	9703-9730
Number of pages	28
Journal	Journal of Physics A: Mathematical and General
Volume	35
Issue number	46
DOIs	https://doi.org/10.1088/0305-4470/35/46/301
Publication status	Published - 22 Nov 2002
Externally published	Yes

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abstract = "We study the fluctuations of the position of an impurity in the asymmetric exclusion process on a ring with an arbitrary number of particles and holes. The steady state of this model is exactly known and four different phases appear in the limit of a large system. We calculate the diffusion constant of the impurity by using a matrix product method and also obtain a representation for unequal time correlation functions. We show that our results found by the matrix ansatz agree with those obtained previously by the Bethe ansatz.",

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AU - Boutillier, Cédric

AU - François, Paul

AU - Mallick, Kirone

AU - Mallick, Shamlal

PY - 2002/11/22

Y1 - 2002/11/22

N2 - We study the fluctuations of the position of an impurity in the asymmetric exclusion process on a ring with an arbitrary number of particles and holes. The steady state of this model is exactly known and four different phases appear in the limit of a large system. We calculate the diffusion constant of the impurity by using a matrix product method and also obtain a representation for unequal time correlation functions. We show that our results found by the matrix ansatz agree with those obtained previously by the Bethe ansatz.

AB - We study the fluctuations of the position of an impurity in the asymmetric exclusion process on a ring with an arbitrary number of particles and holes. The steady state of this model is exactly known and four different phases appear in the limit of a large system. We calculate the diffusion constant of the impurity by using a matrix product method and also obtain a representation for unequal time correlation functions. We show that our results found by the matrix ansatz agree with those obtained previously by the Bethe ansatz.

U2 - 10.1088/0305-4470/35/46/301

DO - 10.1088/0305-4470/35/46/301

M3 - Article

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VL - 35

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EP - 9730

JO - Journal of Physics A: Mathematical and General

JF - Journal of Physics A: Mathematical and General

IS - 46

ER -

A matrix ansatz for the diffusion of an impurity in the asymmetric exclusion process

Abstract

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