On the subalgebra of invariant elements: finiteness and immersions

Abstract

Let R be an algebra over a ring , T an R-algebra, M a finitely generated projective R-module, and N a T-module. Let G be a linearly reductive group scheme over equipped with a representation :GR→ AutMod(R)(M). For the graded T-algebra A, defined as A := ( ST (M RN ))G, we determine the conditions under which the graded T-algebra A is finitely generated, finitely presented, or flat. Furthermore, we establish the conditions under which a closed embedding of Proj \ A into a projective space exists. Since we do not impose any Noetherian hypotheses, our results generalize those in the literature, providing new powerful tools regarding moduli problems.