Transfer matrix functional relations for the generalized tau2(tq) model
Abstract
The N-state chiral Potts model in lattice statistical mechanics can be obtained as a ``descendant'' of the six-vertex model, via an intermediate ``Q'' or ``τ2 (tq)'' model. Here we generalize this to obtain a column-inhomogeneous τ2 (tq) model, and derive the functional relations satisfied by its row-to-row transfer matrix. We do not need the usual chiral Potts relations between the Nth powers of the rapidity parameters ap, bp, cp, dp of each column. This enables us to readily consider the case of fixed-spin boundary conditions on the left and right-most columns. We thereby re-derive the simple direct product structure of the transfer matrix eigenvalues of this model, which is closely related to the superintegrable chiral Potts model with fixed-spin boundary conditions.
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