arXiv:1401.3321 Abstract | arXiv Analytics

arXiv:1401.3321 [math.PR]Abstract References Reviews Resources

The $(q,μ,ν)$-Boson process and $(q,μ,ν)$-TASEP

Published 2014-01-14Version 1

We prove a intertwining relation (or Markov duality) between the $(q,\mu,\nu)$-Boson process and $(q,\mu,\nu)$-TASEP, two discrete time Markov chains introduced by Povolotsky. Using this and a variant of the coordinate Bethe ansatz we compute nested contour integral formulas for expectations of a family of observables of the $(q,\mu,\nu)$-TASEP when started from step initial data. We then utilize these to prove a Fredholm determinant formula for distribution of the location of any given particle.

Comments: 18 pages, 2 figures

Categories: math.PR, cond-mat.stat-mech, math-ph, math.MP, math.QA

Keywords: boson process, discrete time markov chains, coordinate bethe ansatz, nested contour integral formulas, step initial data

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arXiv:1401.3321 [math.PR]Abstract References Reviews Resources

The $(q,μ,ν)$-Boson process and $(q,μ,ν)$-TASEP

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arXiv:1401.3321 [math.PR]AbstractReferencesReviewsResources

The $(q,μ,ν)$-Boson process and $(q,μ,ν)$-TASEP

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arXiv:1401.3321 [math.PR]Abstract References Reviews Resources