Poisson Traces for Symmetric Powers of Symplectic Varieties

Author(s)

Etingof, Pavel I.; Schedler, Travis

Abstract

We compute the space of Poisson traces on symmetric powers of affine symplectic varieties. In the case of symplectic vector spaces, we also consider the quotient by the diagonal translation action, which includes the quotient singularities T*C[superscript n-1]/S[subscript n] associated with the type A Weyl group S[subscript n] and its reflection representation C[superscript n-1]. We also compute the full structure of the natural D-module, previously defined by the authors, whose solution space over algebraic distributions identifies with the space of Poisson traces. As a consequence, we deduce bounds on the numbers of finite-dimensional irreducible representations and prime ideals of quantizations of these varieties. Finally, motivated by these results, we pose conjectures on symplectic resolutions, and give related examples of the natural D-module. In an appendix, the second author computes the Poisson traces and associated D-module for the quotients T*C[superscript n]/D[subscript n] associated with type D Weyl groups. In a second appendix, the same author provides a direct proof of one of the main theorems.

Date issued

2013-03

URI

http://hdl.handle.net/1721.1/92850

Department

Massachusetts Institute of Technology. Department of Mathematics

Journal

International Mathematics Research Notices

Publisher

Oxford University Press

Citation

Etingof, P., and T. Schedler. “Poisson Traces for Symmetric Powers of Symplectic Varieties.” International Mathematics Research Notices (March 21, 2013).

Version: Author's final manuscript

ISSN

1073-7928

1687-0247