Bi-orthogonal Polynomial Sequences and the Asymmetric Simple Exclusion Process

Abstract

We reformulate the Corteel-Williams equations for the stationary state of the two parameter Asymmetric Simple Exclusion Process (TASEP) as a linear map L(\,·\,), acting on a tensor algebra built from a rank two free module with basis \e1,e2\. From this formulation we construct a pair of sequences, \Pn(e1)\ and \Qm(e2)\, of bi-orthogonal polynomials (BiOPS), that is, they satisfy L(Pn(e1) Qm(e2))=nδn,m. The existence of the sequences arises from the determinant of a Pascal triangle like matrix of polynomials. The polynomials satisfy first order (uncoupled) recurrence relations. We show that the two first moments L(Pn\, e1\, Qm) and L(Pn\, e2\, Qm) give rise to a matrix representation of the ASEP diffusion algebra and hence provide an understanding of the origin of the matrix product Ansatz. The second moment L(Pn\, e1 e2\,Qm ) defines a tridiagonal matrix which makes the connection with Chebyshev-like orthogonal polynomials.