The cotangent bundle of G/UP and Kostant-Whittaker descent
Abstract
We prove that the algebra of functions on the cotangent bundle T*(G/UP) of the parabolic base affine space for a reductive group G and a parabolic subgroup P is isomorphic to the subalgebra of the functions on G × L × l//L which are invariant under a certain action of the group scheme of universal centralizers on G, where L is a Levi subgroup of P and l is its Lie algebra, upgrading an isomorphism of Ginzburg and Kazhdan simultaneously to the parabolic and the modular setting. We also derive a related isomorphism for the partial Whittaker cotangent bundle of G, which proves a conjecture of Devalapurkar.
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