- Definition
- Local rings in the Nisnevich topology
- Example of Nisnevich Covering
- Applications
- References
In algebraic geometry, the Nisnevich topology, sometimes called the completely decomposed topology, is a Grothendieck topology on the category of schemes which has been used in algebraic K-theory, A¹ homotopy theory, and the theory of motives. It was originally introduced by Yevsey Nisnevich, who was motivated by the theory of adeles.
Definition
A morphism of schemes {{nowrap|f : Y → X}} is called a Nisnevich morphism if it is an étale morphism such that for every (possibly non-closed) point x ∈ X, there exists a point y ∈ Y such that the induced map of residue fields k(x) → k(y) is an isomorphism. Equivalently, f must be flat, unramified, locally of finite presentation, and for every point x ∈ X, there must exist a point y in the fiber {{nowrap|f−1(x)}} such that k(x) → k(y) is an isomorphism.
A family of morphisms {uα : Xα → X} is a Nisnevich cover if each morphism in the family is étale and for every (possibly non-closed) point x ∈ X, there exists α and a point y ∈ Xα s.t. uα(y) = x and the induced map of residue fields k(x) → k(y) is an isomorphism. If the family is finite, this is equivalent to the morphism 
from 
to X being a Nisnevich morphism. The Nisnevich covers are the covering families of a pretopology on the category of schemes and morphisms of schemes. This generates a topology called the Nisnevich topology. The category of schemes with the Nisnevich topology is notated Nis.
The small Nisnevich site of X has as underlying category the same as the small étale site, that is to say, objects are schemes U with a fixed étale morphism U → X and the morphisms are morphisms of schemes compatible with the fixed maps to X. Admissible coverings are Nisnevich morphisms.
The big Nisnevich site of X has as underlying category schemes with a fixed map to X and morphisms the morphisms of X-schemes. The topology is the one given by Nisnevich morphisms.
The Nisnevich topology has several variants which are adapted to studying singular varieties. Covers in these topologies include resolutions of singularities or weaker forms of resolution.
- The cdh topology allows proper birational morphisms as coverings.
- The h topology allows De Jong's alterations as coverings.
- The l′ topology allows morphisms as in the conclusion of Gabber's local uniformization theorem.
The cdh and l′ topologies are incomparable with the étale topology, and the h topology is finer than the étale topology.
Local rings in the Nisnevich topology
{{see also|Henselian ring}}If x is a point of a scheme X, then the local ring of x in the Nisnevich topology is the henselization of the local ring of x in the Zariski topology.
Example of Nisnevich Covering
Consider the étale cover given by
If we look at the associated morphism of residue fields for the generic point of the base, we see that this is a degree 2 extension
This implies that this étale cover is not Nisnevich. We can add the étale morphism 
to get a Nisnevich cover since there is an isomorphism of points for the generic point of 
.
Applications
Nisnevich introduced his topology to provide a cohomological interpretation of the class set of an affine group scheme, which was originally defined in adelic terms. He used it to partially prove a conjecture of Alexander Grothendieck and Jean-Pierre Serre which states that a rationally trivial torsor under a reductive group scheme over an integral regular Noetherian base scheme is locally trivial in the Zariski topology. One of the key properties of the Nisnevich topology is the existence of a descent spectral sequence. Let X be a Noetherian scheme of finite Krull dimension, and let Gn(X) be the Quillen K-groups of the category of coherent sheaves on X. If 
is the sheafification of these groups with respect to the Nisnevich topology, there is a convergent spectral sequence
for {{nowrap|p ≥ 0}}, {{nowrap|q ≥ 0}}, and {{nowrap|p - q ≥ 0}}. If 
is a prime number not equal to the characteristic of X, then there is an analogous convergent spectral sequence for K-groups with coefficients in 
.
The Nisnevich topology has also found important applications in algebraic K-theory, A¹ homotopy theory and the theory of motives.[1][2]
References
- {{cite conference
| first = Yevsey A.
| last = Nisnevich
| year = 1989
| title = The completely decomposed topology on schemes and associated descent spectral sequences in algebraic K-theory
| booktitle = Algebraic K-theory: connections with geometry and topology. Proceedings of the NATO Advanced Study Institute held in Lake Louise, Alberta, December 7--11, 1987. NATO Advanced Science Institutes Series C: Mathematical and Physical Sciences, 279
| editor = J. F. Jardine and V. P. Snaith
| publisher = Kluwer Academic Publishers Group
| location = Dordrecht
| pages = 241–342
}}, available at Nisnevich's website
- {{citation
| first = Marc
| last = Levine
| year = 2008
| title = Motivic Homotopy Theory
| url = http://www.math.unam.mx/javier/levine.pdf
}}
- Specific
2. ^{{cite web|title=Nisnevich Topology|url=http://www-bcf.usc.edu/~hoyois/papers/nisnevich.pdf|deadurl=bot: unknown|archiveurl=https://web.archive.org/web/20170923234114/http://www-bcf.usc.edu/~hoyois/papers/nisnevich.pdf|archivedate=2017-09-23|df=}}
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