Pseudo-reflection group actions on local rings

Abstract

In a classical paper [C] Chevalley considered the invariants of a finite group H ⊂ GL_k(S₁) generated by pseudo-reflections, acting on the graded polynomial ring S = k[X₁,…,X_n] over a field k of characteristic zero. He proved that S is free as a graded S^H-module, hence S^H is a graded polynomial ring (Theorem A), and that the natural representation of H in is equivalent to the regular representation (Theorem B). On the other hand, a theorem of Shephard and Todd shows that when S^H is a polynomial ring, the (finite) group H is generated by pseudo-reflections. These results have been extended by Bourbaki [Bo₂] to fields whose characteristic may be positive, but does not divide the order |H| of the group.