On the Equivalent Theory of the Generalized τ(2)-model and the Chiral Potts Model with two Alternating Vertical Rapidities

Abstract

By the Baxter's Q72-operator method, we demonstrate the equivalent theory between the generalized τ(2)-model (other than two special cases with a pseudovacuum state) and the N-state chiral Potts model with two alternating vertical rapidities, where the degenerate models are included. As a consequence, the theory of the XXZ chain model associated to cyclic representations (with the parameter ) of U q(sl2) with qN=1 for odd N is identified with either (for N=1) the chiral Potts model with two superintegrable vertical rapidities, or (for N ≠ 1) the degenerate model for the selfdual solution of the star-triangle relation. In all these identifications, the transfer matrices T, T of the chiral Potts model (including the degenerate ones) serve as the QR, QL-operators of the corresponding τ(2)-model, so that the functional relations hold as in the solvable N-state chiral Potts model.