Residues of q-Hypergeometric Integrals and Characters of Affine Lie Algebras
Abstract
We study certain subspaces of solutions to the sl2 rational qKZ equation at level zero. Each subspace is specified by the vanishing of the residue at a certain divisor which stems from models in two dimensional integrable field theories. We determine the character of the subspace which is parametrized by the number of variables and the sl2 weight of the solutions. The sum of all characters with a fixed weight gives rise to the branching functions of the irreducible representations of sl2 in the level one integrable highest weight representations of sl2. It is written in the fermionic form.
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