Degree bounds for modular covariants

Abstract

Let V,W be representations of a cyclic group G of prime order p over a field k of characteristic p. The module of covariants k[V,W]G is the set of G-equivariant polynomial maps V → W, and is a module over k[V]G. We give a formula for the Noether bound β(k[V,W]G,k[V]G), i.e. the minimal degree d such that k[V,W]G is generated over k[V]G by elements of degree at most d.