Arithmetic invariant theory II

Abstract

Let k be a field, let G be a reductive group, and let V be a linear representation of G. Let V//G = Spec(Sym(V*))G denote the geometric quotient and let π: V V//G denote the quotient map. Arithmetic invariant theory studies the map π on the level of k-rational points. In this article, which is a continuation of the results of our earlier paper "Arithmetic invariant theory", we provide necessary and sufficient conditions for a rational element of V//G to lie in the image of π, assuming that generic stabilizers are abelian. We illustrate the various scenarios that can occur with some recent examples of arithmetic interest.