Orthogonal Polynomial Stochastic Duality Functions for Multi-Species SEP(2j) and Multi-Species IRW
Abstract
We obtain orthogonal polynomial self-duality functions for multi-species version of the symmetric exclusion process (SEP(2j)) and the independent random walker process (IRW) on a finite undirected graph. In each process, we have n>1 species of particles. In addition, we allow up to 2j particles to occupy each site in the multi-species SEP(2j). The duality functions for the multi-species SEP(2j) and the multi-species IRW come from unitary intertwiners between different *-representations of the special linear Lie algebra sln+1 and the Heisenberg Lie algebra hn, respectively. The analysis leads to multivariate Krawtchouk polynomials as orthogonal duality functions for the multi-species SEP(2j) and homogeneous products of Charlier polynomials as orthogonal duality functions for the multi-species IRW.
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