Abstract
A series of solvable lattice models with face interaction are introduced on the basis of the affine Lie algebraXn(1)=An(1),Bn(1),Cn(1),Dn(1). The local states taken on by the fluctuation variables are the dominant integral weights ofXn(1) of a fixed level. Adjacent local states are subject to a condition related to the vector representation ofXn. The Boltzmann weights are parametrized by elliptic theta functions and solve the star-triangle relation.
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