Eigenvalues and eigenstates of the s ellq(2)-invariant Universal R-operator defined for cyclic representations at roots of unity

Abstract

The s ellq(2) representations are realized in the space of polynomials for general and exceptional values of deformation parameter q and on finite set of theta-functions for cyclic representation corresponding to qN = +/- 1, which are a natural extension of the polynomials. The complete set of eigenstates of the Universal R-matrix are constructed and corresponding eigenvalues are calculated.

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