Skew group algebras, invariants and Weyl Algebras

Abstract

The aim of this paper is two fold: First to study finite groups G of automorphisms of the homogenized Weyl algebra Bn, the skew group algebra Bn G, the ring of invariants BnG, and the relations of these algebras with the Weyl algebra An, with the skew group algebra An G, and with the ring of invariants AnG. Of particular interest is the case n=1. In the on the other hand, we consider the invariant ring slC[X]G of the polynomial ring K[X] in n generators, where G is a finite subgroup of Gl(n,slC) such that any element in G different from the identity does not have one as an eigenvalue. We study the relations between the category of finitely generated modules over slC[X]G and the corresponding category over the skew group algebra slC% [X] G. We obtain a generalization of known results for n=2 and G a finite subgroup of Sl(2,C). In the last part of the paper we extend the results for the polynomial algebra C[X] to the homogenized Weyl algebra Bn.