Shi-shyr Roan
Published 2004-10-01, updated 2005-08-12Version 3
In this paper, we present a systematical account of the descending procedure from six-vertex model to the $N$-state chiral Potts model through fusion relations of $\tau^{(j)}$-operators, following the works of Bazhanov-Stroganov and Baxter-Bazhanov-Perk. A careful analysis of the descending process leads to appearance of the high genus curve as rapidities' constraint for the chiral Potts models. Full symmetries of the rapidity curve are identified, so is its symmetry group structure. By normalized transfer matrices of the chiral Potts model, the $\tau^{(2)}T$ relation can be reduced to functional equations over a hyperelliptic curves associated to rapidities, by which the degeneracy of $\tau^{(2)}$-eigenvalues is revealed in the case of superintegrable chiral Potts model.
Comments: Latex 17 pages ; typos and small errors corrected, references added-Journal version
Journal: J.Phys. A38 (2005) 7483-7500
Duality and Symmetry in Chiral Potts Model
States with v1=lambda, v2=-lambda and reciprocal equations in the six-vertex model
The Q-operator for Root-of-Unity Symmetry in Six Vertex Model
