Roman Bezrukavnikov, Michael Finkelberg, Victor Ginzburg
Published 2003-12-29, updated 2006-03-28Version 5
We prove a localization theorem for the type A rational Cherednik algebra H_c=H_{1,c} over an algebraic closure of the finite field F_p. In the most interesting special case where the parameter c takes values in F_p, we construct an Azumaya algebra A_c on Hilb^n, the Hilbert scheme of n points in the plane, such that the algebra of global sections of A_c is isomorphic to H_c. Our localisation theorem provides an equivalence between the bounded derived categories of H_c-modules and sheaves of coherent A_c-modules on the Hilbert scheme, respectively. Furthermore, we show that the Azumaya algebra splits on the formal completion of each fiber of the Hilbert-Chow morphism. This provides a link between our results and those of Bridgeland-King-Reid and Haiman.
Comments: Appendices by Pavel Etingof and Vadim Vologodsky
The polynomial representation of the type $A_{n - 1}$ rational Cherednik algebra in characteristic $p \mid n$
The Hilbert Series of the Irreducible Quotient of the Polynomial Representation of the Rational Cherednik Algebra of Type $A_{n-1}$ in Characteristic $p$ for $p|n-1$
Inductive AM condition for the alternating groups in characteristic 2
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