The affine closure of cotangent bundles of horospherical spaces
Abstract
For a smooth quasi-affine variety X, the affine closure T*X := Spec(K[T*X]) contains T*X as an open subset, and its smooth locus carries a symplectic structure. A natural question is whether T*X itself is a symplectic variety. A notable example is the conjecture of Ginzburg and Kazhdan, which predicts that T*(G/U) is symplectic for a maximal unipotent subgroup U in a reductive linear algebraic group G. This conjecture was recently proved by Gannon using representation-theoretic methods. In this paper, we provide a new geometric approach to this conjecture. Our method allows us to prove a more general result: T*(G/H) is symplectic for any horospherical subgroup H in G such that G/H is quasi-affine. In particular, this implies that the affine closure T*(G/[P,P]) is a symplectic variety for any parabolic subgroup P in G.
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