Tensor category KLk(sl2n) via minimal affine W-algebras at the non-admissible level k =-2n+12
Abstract
We prove that KLk(slm) is a semi-simple, rigid braided tensor category for all even m 4, and k= -m+12 which generalizes result from arXiv:2103.02985 obtained for m=4. Moreover, all modules in KLk(slm) are simple-currents and they appear in the decomposition of conformal embeddings glm slm+1 at level k= - m+12 from arXiv:1509.06512. For this we inductively identify minimal affine W-algebra Wk-1 (slm+2, θ) as simple current extension of Lk(slm) H M, where H is the rank one Heisenberg vertex algebra, and M the singlet vertex algebra for c=-2. The proof uses previously obtained results for the tensor categories of singlet algebra from arXiv:2202.05496. We also classify all irreducible ordinary modules for Wk-1 (slm+2, θ). The semi-simple part of the category of Wk-1 (slm+2, θ)-modules comes from KLk-1(slm+2), using quantum Hamiltonian reduction, but this W-algebra also contains indecomposable ordinary modules.
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