EMBEDDED ELLIPTIC CURVES AND THE YANG-BAXTER EQUATIONSt
نویسنده
چکیده
The completely 2, symmetric S-matrix defined by Belavin is shown to satisfy the Yang-Baxter equations. In the projective space of Boltzmann weights, the curves on which there exist commuting transfer matrices are shown to be embedded elliptic curves. Explicit polynomial equations for these curves are given. For n = 2 these results reduce to the results of Baxter for the symmetric eight-vertex model.
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تاریخ انتشار 1984