Symplectic leaves for generalized affine Grassmannian slices
Abstract
The generalized affine Grassmannian slices Wμλ are algebraic varieties introduced by Braverman, Finkelberg, and Nakajima in their study of Coulomb branches of 3d N=4 quiver gauge theories. We prove a conjecture of theirs by showing that the dense open subset Wμλ ⊂eq Wμλ is smooth. An explicit decomposition of Wμλ into symplectic leaves follows as a corollary. Our argument works over an arbitrary ring and in particular implies that the complex points Wμλ(C) are a smooth holomorphic symplectic manifold.
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