Torsor and Quotient Presentations for $D$-homogeneous Spectra

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 $\mathbb{N}$-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 $\mathbb{N}$-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 \emph{relevant}.

We prove that $\pi_f: {\rm Spec}(S_f) \to {\rm Spec}(S_{(f)})$ 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 ${\rm Spec}(S_0[D])$-torsor.