Frobenius representation type for invariant rings of finite groups

Abstract

Let V be a finite rank vector space over a perfect field of characteristic p>0, and let G be a finite subgroup of GL(V). If V is a permutation representation of G, or more generally a monomial representation, we prove that the ring of invariants (SymV)G has finite Frobenius representation type. We also construct an example with V a finite rank vector space over the algebraic closure of the function field F3(t), and G an elementary abelian subgroup of GL(V), such that the invariant ring (SymV)G does not have finite Frobenius representation type.

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