Modules of covariants in modular invariant theory

Abstract

Let the finite group G act linearly on the vector space V over the field k of arbitrary characteristic. If H<G is a subgroup the extension of invariant rings k[V]G⊂ k[V]H is studied using modules of covariants. An example of our results is the following. Let W be the subgroup of G generated by the reflections in G. A classical theorem due to Serre says that if k[V] is a free k[V]G-module then G=W. We generalize this result as follows. If k[V]H is a free k[V]G-module then G is generated by H and W, and the invariant ring k[V]H W is free over k[V]W and generated as an algebra by H-invariants and W-invariants.