Minimal nilpotent finite W-algebra and cuspidal module category of sp2n

Abstract

Let US be the localization of U(sp2n) with respect to the Ore subset S generated by the root vectors Xε1-ε2,…,Xε1-εn, X2ε1. We show that the minimal nilpotent finite W-algebra W(sp2n, e) is isomorphic to the centralizer CUS(B) of some subalgebra B in US, and it can be identified with a tensor product factor of US. As an application, we show that the category of weight sp2n-modules with injective actions of all root vectors and finite-dimensional weight spaces is equivalent to the category of finite-dimensional modules over W(sp2n, e), explaining the coincidence that both of them are semi-simple.

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