Iain Gordon
Published 2005-07-20Version 1
We show that the spherical subalgebra of the rational Cherednik algebra associated to the wreath product of a symmetric group and a cyclic group is isomorphic to a quotient of the ring of invariant differential operators on a space of representations of the cyclic quiver. This confirms a version of a conjecture of Etingof and Ginzburg in the case of cyclic groups. The proof is a straightforward application of work of Oblomkov on the deformed Harish-Chandra homomorphism, and of Crawley-Boevey and of Gan and Ginzburg on preprojective algebras.
Representations of wreath products on cohomology of De Concini-Procesi compactifications
Invariant differential operators on a class of multiplicity free spaces
The Hall algebra of a cyclic quiver at $q=0$
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