nLab maximal spectrum

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Definition

Given a ring, or a kk-algebra (unital or not) AA, its maximal spectrum Spec mASpec_m A is the set of its maximal ideals. Other notations are: SpmASpm A (used EGA IV₃, 10.9), Spec maxASpec_{max}A, MaxSpecAMaxSpec A.

Properties

If kk is a field, and RR is a finitely generated noetherian commutative unital kk-algebra without nilpotent elements, then Spec mASpec_m A equipped with the Zariski topology is a noetherian topological space; the varieties in the classical sense (cf. chapter 1 of Hartshorne) are exactly the spectra of such kk-algebras. A more appropriate spectrum for general commutative unital rings is the prime spectrum.

The structure sheaf of Spec mASpec_m A is 𝒪 Spec mAi 1𝒪 SpecA\mathcal{O}_{Spec_m A}\coloneqq i^{-1}\mathcal{O}_{Spec A}, the inverse image of the structure sheaf of SpecASpec A along the inclusion i:Spec mASpecAi\colon Spec_m A\hookrightarrow Spec A. When AA is a Jacobson ring, a locally ringed space isomorphic to (Spec mA,𝒪 Spec mA)(Spec_m A,\mathcal{O}_{Spec_m A}) is called an affine ultra-scheme. An ultra-scheme? is a locally ringed space obtained by gluing affine ultraschemes.

Last revised on July 3, 2026 at 11:52:19. See the history of this page for a list of all contributions to it.