Equivariant symplectic geometry of cotangent bundles, II
Abstract
We examine the structure of the cotangent bundle T*X of an algebraic variety X acted on by a reductive group G from the viewpoint of equivariant symplectic geometry. In particular, we construct an equivariant symplectic covering of T*X by the cotangent bundle of a certain variety of horospheres in X, and integrate the invariant collective motion on T*X. These results are based on a "local structure theorem" describing the action of a certain parabolic in G on an open subset of X, which is interesting by itself.
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