The Spectral Problem for the q-Knizhnik-Zamolodchikov Equation and Continuous q-Jacobi Polynomials
Abstract
The spectral problem for the q-Knizhnik-Zamolodchikov equations for Uq(sl2) (0<q<1) at arbitrary level k is considered. The case of two-point functions in the fundamental representation is studied in detail.The scattering states are given explicitly in terms of continuous q-Jacobi polynomials, and the S-matrix is derived from their asymptotic behavior. The level zero S-matrix is shown to coincide, up to a trivial factor, with the kink-antikink S-matrix for the spin-12 XXZ antiferromagnet. In the limit of infinite level we observe connections with harmonic analysis on p-adic groups with the prime p given by p=q-2.
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