Finite dimensional representations of symplectic reflection algebras associated to wreath products II
Abstract
This note extends some results of a previous paper (math.RT/0403250) about finite dimensional representations of the wreath product symplectic reflection algebra H(k,c,N,G) of rank N attached to a finite subgroup G of SL(2,C) (here k is a number and c a class function on the set of nontrivial elements of G). Specifically, let N'=(N1,...,Nr) be a partition of N. Consider W=W1 >... Wr an irreducible representation of SN'=SN1× ...× SNr⊂ SN s.t. Wi has rectangular Young diagram for any i and let Yi, i=1,...,r be a collection of irreducible non isomorphic representation of the rank 1 algebra B=H(c0,1,G) s.t. Ext1B(Yi, Yj)=0 for any i≠ j. Consider the module M'=W Y, where Y=Y1N1 ... YrNr, over the subalgebra SN'#BN ⊂ SN#BN= H(0,c0,N,G) and form the induced module M over H(0,c0,N,G). We show that M can be uniquely deformed along a linear subspace of codimension r in the space of the parameters (k,c) passing through c0. This result implies the main result of math.RT/0403250 as a particular case, the case of the trivial partition N'=(N).
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