The $q$-Hahn asymmetric exclusion process
Abstract
We introduce new integrable exclusion and zero-range processes on the one-dimensional lattice that generalize the -Hahn TASEP and the -Hahn Boson (zero-range) process introduced in [Pov13] and further studied in [Cor14], by allowing jumps in both directions. Owing to a Markov duality, we prove moment formulas for the locations of particles in the exclusion process. This leads to a Fredholm determinant formula that characterizes the distribution of the location of any particle. We show that the model-dependent constants that arise in the limit theorems predicted by the KPZ scaling theory are recovered by a steepest descent analysis of the Fredholm determinant. For some choice of the parameters, our model specializes to the multi-particle-asymmetric diffusion model introduced in [SW98]. In that case, we make a precise asymptotic analysis that confirms KPZ universality predictions. Surprisingly, we also prove that in the partially asymmetric case, the location of the first particle also enjoys cube-root fluctuations which follow Tracy-Widom GUE statistics.
Cite
@article{arxiv.1501.03445,
title = {The $q$-Hahn asymmetric exclusion process},
author = {Guillaume Barraquand and Ivan Corwin},
journal= {arXiv preprint arXiv:1501.03445},
year = {2017}
}
Comments
40 pages,11 figures. v3: Presentation improved in Introduction and Section 4. to appear in Ann. Appl. Probab