Excellent ring

In commutative algebra, a quasi-excellent ring is a Noetherian commutative ring that behaves well with respect to the operation of completion, and is called an excellent ring if it is also universally catenary. Excellent rings are one answer to the problem of finding a natural class of "well-behaved" rings containing most of the rings that occur in number theory and algebraic geometry. At one time it seemed that the class of Noetherian rings might be an answer to this problem, but Masayoshi Nagata and others found several strange counterexamples showing that in general Noetherian rings need not be well-behaved: for example, a normal Noetherian local ring need not be analytically normal.

The class of excellent rings was defined by Alexander Grothendieck (1965) as a candidate for such a class of well-behaved rings. Quasi-excellent rings are conjectured to be the base rings for which the problem of resolution of singularities can be solved; Template:Harvtxt showed this in characteristic 0, but the positive characteristic case is (as of 2024) still a major open problem. Essentially all Noetherian rings that occur naturally in algebraic geometry or number theory are excellent; in fact it is quite hard to construct examples of Noetherian rings that are not excellent.

The definition of excellent rings is quite involved, so we recall the definitions of the technical conditions it satisfies. Although it seems like a long list of conditions, most rings in practice are excellent, such as fields, polynomial rings, complete Noetherian rings, Dedekind domains over characteristic 0 (such as ${\displaystyle \mathbb{Z}}$), and quotient and localization rings of these rings.

• A ring ${\displaystyle R}$ containing a field ${\displaystyle k}$ is called geometrically regular over ${\displaystyle k}$ if for any finite extension ${\displaystyle K}$ of ${\displaystyle k}$ the ring ${\displaystyle R{\otimes }_{k}K}$ is regular.
• A homomorphism of rings from ${\displaystyle R\to S}$ is called regular if it is flat and for every ${\displaystyle 𝔭\in \text{Spec}(R)}$ the fiber ${\displaystyle S{\otimes }_R\kappa (𝔭)}$ is geometrically regular over the residue field ${\displaystyle \kappa (𝔭)}$ of ${\displaystyle 𝔭}$.
• A ring ${\displaystyle R}$ is called a G-ring^[1] (or Grothendieck ring) if it is Noetherian and its formal fibers are geometrically regular; this means that for any ${\displaystyle 𝔭\in \text{Spec}(R)}$, the map from the local ring ${\displaystyle R_{𝔭}\to \widehat{R_{𝔭}}}$ to its completion is regular in the sense above.

Finally, a ring is J-2^[2] if any finite type ${\displaystyle R}$-algebra ${\displaystyle S}$ is J-1, meaning the regular subscheme ${\displaystyle \text{Reg}(\text{Spec}(S))\subset \text{Spec}(S)}$ is open.

A ring ${\displaystyle R}$ is called quasi-excellent if it is a G-ring and J-2 ring. It is called excellent^{[3]pg 214} if it is quasi-excellent and universally catenary. In practice almost all Noetherian rings are universally catenary, so there is little difference between excellent and quasi-excellent rings.

A scheme is called excellent or quasi-excellent if it has a cover by open affine subschemes with the same property, which implies that every open affine subscheme has this property.

Because an excellent ring ${\displaystyle R}$ is a G-ring,^[1] it is Noetherian by definition. Because it is universally catenary, every maximal chain of prime ideals has the same length. This is useful for studying the dimension theory of such rings because their dimension can be bounded by a fixed maximal chain. In practice, this means infinite-dimensional Noetherian rings^[4] which have an inductive definition of maximal chains of prime ideals, giving an infinite-dimensional ring, cannot be constructed.

Given an excellent scheme ${\displaystyle X}$ and a locally finite type morphism ${\displaystyle f:X^{\prime }\to X}$, then ${\displaystyle X^{\prime }}$ is excellent^{[3]pg 217}.

Any quasi-excellent ring is a Nagata ring.

Any quasi-excellent reduced local ring is analytically reduced.

Any quasi-excellent normal local ring is analytically normal.

Most naturally occurring commutative rings in number theory or algebraic geometry are excellent. In particular:

• All complete Noetherian local rings, for instance all fields and the ring Template:Math of [[p-adic integer|Template:Math-adic integers]], are excellent.
• All Dedekind domains of characteristic Template:Math are excellent. In particular the ring Template:Math of integers is excellent. Dedekind domains over fields of characteristic greater than Template:Math need not be excellent.
• The rings of convergent power series in a finite number of variables over Template:Math or Template:Math are excellent.
• Any localization of an excellent ring is excellent.
• Any finitely generated algebra over an excellent ring is excellent. This includes all polynomial algebras ${\displaystyle R[x_1,\dots ,x_n]/(f_1,\dots ,f_k)}$ with ${\displaystyle R}$ excellent. This means most rings considered in algebraic geometry are excellent.

Here is an example of a discrete valuation ring Template:Math of dimension Template:Math and characteristic Template:Math which is Template:Math but not a Template:Math-ring and so is not quasi-excellent. If Template:Math is any field of characteristic Template:Math with Template:Math and Template:Math is the ring of power series Template:Math such that Template:Math is finite then the formal fibers of Template:Math are not all geometrically regular so Template:Math is not a Template:Math-ring. It is a Template:Math ring as all Noetherian local rings of dimension at most Template:Math are Template:Math rings. It is also universally catenary as it is a Dedekind domain. Here Template:Math denotes the image of Template:Math under the Frobenius morphism Template:Math.

Here is an example of a ring that is a G-ring but not a J-2 ring and so not quasi-excellent. If Template:Math is the subring of the polynomial ring Template:Math in infinitely many generators generated by the squares and cubes of all generators, and Template:Math is obtained from Template:Math by adjoining inverses to all elements not in any of the ideals generated by some Template:Math, then Template:Math is a 1-dimensional Noetherian domain that is not a Template:Math ring as Template:Math has a cusp singularity at every closed point, so the set of singular points is not closed, though it is a G-ring. This ring is also universally catenary, as its localization at every prime ideal is a quotient of a regular ring.

Nagata's example of a 2-dimensional Noetherian local ring that is catenary but not universally catenary is a G-ring, and is also a J-2 ring as any local G-ring is a J-2 ring Template:Harv. So it is a quasi-excellent catenary local ring that is not excellent.

Quasi-excellent rings are closely related to the problem of resolution of singularities, and this seems to have been Grothendieck's motivation^{[3]pg 218} for defining them. Grothendieck (1965) observed that if it is possible to resolve singularities of all complete integral local Noetherian rings, then it is possible to resolve the singularities of all reduced quasi-excellent rings. Hironaka (1964) proved this for all complete integral Noetherian local rings over a field of characteristic 0, which implies his theorem that all singularities of excellent schemes over a field of characteristic 0 can be resolved. Conversely if it is possible to resolve all singularities of the spectra of all integral finite algebras over a Noetherian ring R then the ring R is quasi-excellent.

• Resolution of singularities

Template:Reflist

• Alexandre Grothendieck, Jean Dieudonné, Eléments de géométrie algébrique IV Publications Mathématiques de l'IHÉS 24 (1965), section 7
• Template:Springer
• Template:Cite journal
• Template:Cite journal
• Template:Cite book