Invariants for the Modular Cyclic Group of Prime Order via Classical Invariant Theory

Abstract

Let F be any field of characteristic p. It is well-known that there are exactly p inequivalent indecomposable representations V1,V2,...,Vp of Cp defined over F. Thus if V is any finite dimensional Cp-representation there are non-negative integers 0≤ n1,n2,..., nk ≤ p-1 such that V i=1k Vni+1. It is also well-known there is a unique (up to equivalence) d+1 dimensional irreducible complex representation of 2() given by its action on the space Rd of d forms. Here we prove a conjecture, made by R.J. Shank, which reduces the computation of the ring of Cp-invariants F[ i=1k Vni+1]Cp to the computation of the classical ring of invariants (or covariants) [R1 (i=1k Rni)]2(). This shows that the problem of computing modular Cp invariants is equivalent to the problem of computing classical 2() invariants. This allows us to compute for the first time the ring of invariants for many representations of Cp. In particular, we easily obtain from this generators for the rings of vector invariants F[m V2]Cp, F[m V3]Cp and F[m V4]Cpfor all m ∈ . This is the first computation of the latter two families of rings of invariants.