Joint q-moments and shift invariance for the multi-species q-TAZRP on the infinite line

Abstract

This paper presents a novel method for computing certain particle locations in the multi-species q-TAZRP (totally asymmetric zero range process). The method is based on a decomposition of the process into its discrete-time embedded Markov chain, which is described more generally as a monotone process on a graded partially ordered set; and an independent family of exponential random variables. A further ingredient is explicit contour integral formulas for the transition probabilities of the q-TAZRP. The main result of this method is a shift invariance for the multi-species q-TAZRP on the infinite line. By a previously known Markov duality result, these particle locations are the same as joint q-moments. One particular special case is that for step initial conditions, ordered multi-point joint q-moments of the n-species q-TAZRP match the n-point joint q-moments of the single-species q-TAZRP. Thus, we conjecture that the Airy2 process describes the joint multi-point fluctuations of multi-species q-TAZRP. As a probabilistic application of this result, we find explicit contour integral formulas for the joint q-moments of the multi-species q-TAZRP in the diffusive scaling regime.