A probabilistic interpretation for interpolation Macdonald polynomials

Abstract

Previous work of Ayyer, Martin, and Williams gave a probabilistic interpretation of the Macdonald polynomials Pλ(x1,…,xn;1,t) at q=1 in terms of a Markov chain called the multispecies t-Push TASEP, a Markov chain involving particles of types λ1,…,λn hopping around a ring. In particular, they showed that for each composition η obtained by permuting the parts of λ, the stationary probability of being in state η is proportional to the ASEP polynomial Fη(x1,…,xn; 1,t), and the normalizing constant (or partition function) is Pλ(x1,…,xn; 1,t). There is an inhomogeneous generalization of Macdonald polynomials due to Knop and Sahi called interpolation Macdonald polynomials P*λ(x1,…,xn;q,t), as well as an inhomogeneous generalization of ASEP polynomials called interpolation ASEP polynomials F*η(x1,…,xn;q,t) that we introduced in previous work. In this article we introduce a new Markov chain called the interpolation t-Push TASEP, and show that its steady state probabilities and partition function are given by the interpolation ASEP polynomials and the interpolation Macdonald polynomial, evaluated at q=1. This generalizes the previous result of Ayyer, Martin, and Williams.