Quantum Group Theory in τ(2)-model, Duality of τ(2)-model and XXZ-model with Cyclic Uq(sl2)-representation for qn =1, and Chiral Potts Model

Abstract

We identify the quantum group Uw(sl2) in the L-operator of τ(2)-model for a generic w as a subalgebra of U q (sl2) with w = q-2. In the roots of unity case, q=q, w = ω with q n = ωN = 1, the eigenvalues and eigenvectors of XXZ-model with the Uq (sl2)-cyclic representation are determined by the τ(2)-model with the induced Uω(sl2)-cyclic representation, which is decomposed as a finite sum of τ(2)-models in non-superintegrable inhomogeneous N-state chiral Potts model. Through the theory of chiral Potts model, the Q-operator of XXZ-model can be identified with the related chiral Potts transfer matrices, with special features appeared in the n=2N, e.g. N even, case. We also establish the duality of τ(2)-models related to cyclic representations of Uq (sl2), analogous to the τ(2)-duality in chiral Potts model; and identify the model dual to the XXZ model with Uq (sl2)-cyclic representation.