Tensor powers of vector representation of Uq(sl2) at even roots of unity

Abstract

We study the decomposition of tensor powers of two dimensional irreducible representations of quantum sl2 at even roots of unity into direct sums of tilting modules. We derive a combinatorial formula for multiplicity of tilting modules in the N-th tensor power of two dimensional irreducible representations, interpret it in terms of lattice paths and find its asymptotic behavior when N∞. We also describe the limit of character and Plancherel measures when N∞. We consider both Uq(sl2) with divided powers and the small quantum sl2.

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