Lagrangian subvarieties of hyperspherical varieties
Abstract
Given a hyperspherical G-variety X we consider the zero moment level X⊂ X of the action of a Borel subgroup B⊂ G. We conjecture that X is Lagrangian. For the dual G-variety X, we conjecture that that there is a bijection between the sets of irreducible components Irr X and Irr X. We check this conjecture for all the hyperspherical equivariant slices, and for all the basic classical Lie superalgebras.
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