Torsor and Quotient Presentations for D-homogeneous Spectra

Abstract

The D-graded Proj construction provides a general framework for constructing schemes from rings graded by finitely generated abelian groups D, yet its properties and applications remain underdeveloped compared to the classical N-graded case. This paper establishes the essential characteristics of D-graded rings S, like the distinction between D-homogeneous prime ideals and D-prime ideals if D has torsion. We particularly focus on describing the quotient by the associated group scheme, generalizing the construction of a toric variety from its Cox ring. As in the N-graded construction, the basic affine opens of the Proj construction are given in terms of degree-zero localizations S(f), where f in S homogeneous is relevant. We prove that πf: Spec(Sf) Spec(S(f)) is a geometric quotient under mild finiteness assumptions if f is relevant, and give necessary and sufficient conditions for this map to be a pseudo Spec(S0[D])-torsor.