On associated variety for Lie superalgebras

Abstract

We define the associated variety XM of a module M over a finite-dimensional superalgebra g , and show how to extract information about M from these geometric data. XM is a subvariety of the cone X of self-commuting odd elements. For finite-dimensional M , XM is invariant under the action of the underlying Lie group G0 . For simple superalgebra with invariant symmetric form, X has finitely many G0 -orbits; we associate a number (rank) to each such orbit. One can also associate a number (degree of atypicality) to an irreducible finite-dimensional representation. We prove that if M is an irreducible g -module of degree of atypicality k , then XM lies in the closure of all orbits on X of rank k . If g= g l(m|n) we prove that XM coincides with this closure.

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