Stability Conditions for Multigraded Rings

Abstract

Let D be a finitely generated abelian group and S a D-graded ring. We introduce a geometric semistability condition for points x ∈ (S), characterized by maximal-dimensional orbit cones σ(x). This set of geometrically semistable points Xgss yields a new framework for the D-graded Proj construction, which is equivalently given as the geometric quotient of D(S+) = (S) V(S+) by the torus (S0[D]), where S+ S is the ideal generated by all relevant elements. We show that orbit cones are unions of relevant cones D(f). This yields a chamber decomposition of the weight space σ(S) = (d ∈ D Sd ≠ 0), determined entirely by relevant elements. In particular, we obtain D(S) = Xgss (S0[D]). As an application, for a simplicial toric (pre-)variety X with full-dimensional convex support and S = (X), this chamber decomposition of its weight space recovers the secondary fan of X. Consequently, when d ∈ D = (X), the space D(S) is exactly the direct limit of all GIT quotients n d (S0[D]) of X.

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