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Chiral Potts model and the discrete Sine-Gordon model at roots of unity | Vladimir V. Bazhanov
; | Date: |
13 Sep 2008 | Abstract: | The discrete quantum Sine-Gordon models at roots of unity remarkably combines
a classical integrable system with an integrable quantum spin system, whose
parameters obey classical equations of motion. We show that the fundamental
R-matrix of the model (which satisfy a difference property Yang-Baxter
equation) naturally splits into a product of a singular "classical" part and a
finite dimensional quantum part. The classical part of the $R$-matrix itself
satisfies the quantum Yang-Baxter equation, and therefore can be factored out
producing, however, a certain "twist" of the quantum part. We show that the
resulting equation exactly coincides with the star-triangle relation of the
N-state chiral Potts model. The associated spin model on the whole lattice is,
in fact, more general than the chiral Potts and reduces to the latter only for
the simplest (constant) classical background. In a general case the model is
inhomogeneous: its Boltzmann weights are determined by non-trivial background
solutions of the equations of motion of the classical discrete sine-Gordon
model. | Source: | arXiv, 0809.2351 | Services: | Forum | Review | PDF | Favorites |
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