MPA for TASEP with a generalized update on a ring

Abstract

We apply the Matrix Product Ansatz to study the Totally Asymmetric Simple Exclusion Process on a ring with a generalized discrete-time dynamics depending on two hopping probabilities, p and p. The model contains as special cases the TASEP with parallel update, when p =0, and with sequential backward-ordered update, when p =p. We construct a two-dimensional matrix-product representation and use it to obtain exact finite-size expressions for the partition function, the current of particles and the two-point correlation function. Our main new result is the derivation of the finite-size pair correlation function. Its behavior is analyzed in different regimes of effective attraction and repulsion between the particles, depending on whether p >p or p < p. In particular, we explicitly obtain an analytic expression for the pair correlation function in the limit of irreversible aggregation p→ 1, when the stationary configurations contain just one cluster.