A complete set of intertwiners for arbitrary tensor product representations via current algebras
Abstract
Let g be a reductive Lie algebra and let V(λ) be a tensor product of k copies of finite dimensional irreducible g-modules. Choosing k points in C, V(λ) acquires a natural structure of the current algebra g C[t]-module. Following a work of Rao [R], we produce an explicit and complete set of g-module intertwiners of V(λ) in terms of the action of the current algebra.
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