An algebraic construction of duality functions for the stochastic Uq(An(1)) vertex model and its degenerations

Abstract

A recent paper KMMO introduced the stochastic Uq(An(1)) vertex model. The stochastic S-matrix is related to the R-matrix of the quantum group Uq(An(1)) by a gauge transformation. We will show that a certain function D+μ intertwines with the transfer matrix and its space reversal. When interpreting the transfer matrix as the transition matrix of a discrete-time totally asymmetric particle system on the one-dimensional lattice Z, the function D+μ becomes a Markov duality function Dμ which only depends on q and the vertical spin parameters μx. By considering degenerations in the spectral parameter, the duality results also hold on a finite lattice with closed boundary conditions, and for a continuous-time degeneration. This duality function had previously appeared in a multi-species ASEP(q,j) process. The proof here uses that the R-matrix intertwines with the co-product, but does not explicitly use the Yang-Baxter equation. It will also be shown that the stochastic Uq(An(1)) is a multi-species version of a stochastic vertex model studied in BP,CP. This will be done by generalizing the fusion process of CP and showing that it matches the fusion of KRL up to the gauge transformation. We also show, by direct computation, that the multi-species q-Hahn Boson process (which arises at a special value of the spectral parameter) also satisfies duality with respect to D0, generalizing the single-species result of C.