Almost commuting scheme of symplectic matrices and quantum Hamiltonian reduction
Abstract
Losev introduced the scheme X of almost commuting elements (i.e., elements commuting upto a rank one element) of g=sp(V) for a symplectic vector space V and discussed its algebro-geometric properties. We construct a Lagrangian subscheme Xnil of X and show that it is a complete intersection of dimension dim(g)+12dim(V) and compute its irreducible components. We also study the quantum Hamiltonian reduction of the algebra D(g) of differential operators on the Lie algebra g tensored with the Weyl algebra with respect to the action of the symplectic group, and show that it is isomorphic to the spherical subalgebra of a certain rational Cherednik algebra of Type C.
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