Rational Cherednik algebras and Hilbert schemes
Abstract
Let Hc be the rational Cherednik algebra of type An-1 with spherical subalgebra Uc = eHce. Then Uc is filtered by order of differential operators, with associated graded ring gr Uc = C[h+h*]W, where W is the n-th symmetric group. We construct a filtered Z-algebra B such that, under mild conditions on c: (1) The category B-qgr of graded noetherian B-modules modulo torsion is equivalent to Uc-mod; (2) The associated graded Z-algebra gr(B) has gr(B)-qgr equivalent to Coh Hilb(n), the category of coherent sheaves on the Hilbert scheme of points in the plane. This can be regarded as saying that Uc simultaneously gives a noncommutative deformation both of (h+h*)/W and of its resolution of singularities Hilb(n) --> (h+h*)/W. As our forthcoming companion paper [GS] shows, this result is a powerful tool for studying the representation theory of Hc and its relationship to Hilb(n).
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