8-Vertex Correlation Functions and Twist Covariance of q-KZ Equation
Abstract
We study the vertex operators (z) associated with standard quantum groups. The element Z = RRt is a "Casimir operator" for quantized Kac-Moody algebras and the quantum Knizhnik-Zamolodchikov (q-KZ) equation is interpreted as the statement :Z(z): = (z). We study the covariance of the q-KZ equation under twisting, first within the category of Hopf algebras, and then in the wider context of quasi Hopf algebras. We obtain the intertwining operators associated with the elliptic R-matrix and calculate the two-point correlation function for the eight-vertex model.
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