Azumaya algebra
In mathematics, an Azumaya algebra is a generalization of central simple algebras to R-algebras where R need not be a field. Such a notion was introduced in a 1951 paper of Goro Azumaya, for the case where R is a commutative local ring. The notion was developed further in ring theory, and in algebraic geometry, where Alexander Grothendieck made it the basis for his geometric theory of the Brauer group in Bourbaki seminars from 1964–65. There are now several points of access to the basic definitions.
Over a ring
An Azumaya algebra over a commutative ring is an -algebra that is finitely generated, faithful, and projective as an -module, such that the tensor product is isomorphic to the matrix algebra via the map sending to the endomorphism of.Examples over a field
Over a field, Azumaya algebras are completely classified by the Artin-Wedderburn theorem since they are the same as central simple algebras. These are algebras isomorphic to the matrix ring for some division algebra over. For example, quaternion algebras provide examples of central simple algebras.Examples over local rings
Given a local commutative ring, an -algebra is Azumaya if and only if A is free of positive finite rank as an R-module, and the algebra is a central simple algebra over, hence all examples come from central simple algebras over.Cyclic algebras
There is a class of Azumaya algebras called cyclic algebras which generate all similarity classes of Azumaya algebras over a field, hence all elements in the Brauer group . Given a finite cyclic Galois field extension of degree, for every and any generator there is a twisted polynomial ring, also denoted, generated by an element such thatand the following commutation propertyholds. As a vector space over, has basis with multiplication given byNote that give a geometrically integral variety, there is also an associated cyclic algebra for the quotient field extension.Brauer group of a ring
Over fields, there is a cohomological classification of Azumaya algebras using Étale cohomology. In fact, this group, called the Brauer group, can be also defined as the similarity classespg 3 of Azumaya algebras over a ring, where rings are similar if there is an isomorphismof rings for some. Then, this equivalence is in fact an equivalence relation, and if,, then, showingis a well defined operation. This forms a group structure on the set of such equivalence classes called the Brauer group, denoted. Another definition is given by the torsion subgroup of the etale cohomology groupwhich is called the cohomological Brauer group. These two definitions agree when is a field.Brauer group using Galois cohomology
There is another equivalent definition of the Brauer group using Galois cohomology. For a field extension there is a cohomological Brauer group defined asand the cohomological Brauer group for is defined aswhere the colimit is taken over all finite Galois field extensions.Computation for a local field
Over a local non-archimedean field, such as the p-adic numbers, local class field theory gives the isomorphismpg 193of abelian groups. This is because given abelian field extensions there is a short exact sequence of Galois groupsand from Local class field theory, there is the following commutative diagramwhere the vertical maps are isomorphisms and the horizontal maps are injections.
n-torsion for a field
Recall there is the Kummer sequencegiving a long exact sequence in cohomology for a field. Since Hilbert's Theorem 90 implies, there is an associated short exact sequenceshowing the second etale cohomology group with coefficients in the n-th roots of unity isGenerators of n-torsion classes in the Brauer Group over a field
The Galois symbol, or norm-residue symbol, is a map from the n-torsion Milnor K-theory group to the etale cohomology group, denoted byIt comes from the composition of the cup product in etale cohomology with the Hilbert's Theorem 90 isomorphismhenceIt turns out this map factors through, whose class for is represented by a cyclic algebra. For the Kummer extension where, take a generator of the cyclic group, and construct. There is an alternative, yet equivalent construction through Galois cohomology and etale cohomology. Consider the short exact sequence of trivial -modulesThe long exact sequence yields a mapFor the unique characterwith, there is a unique liftandnote the class is from the Hilberts theorem 90 map. Then, since there exists a primative root of unity, there is also a classIt turns out this is precisely the class. Because of the Norm residue isomorphism theorem, is an isomorphism and the -torsion classes in are generated by the cyclic algebras.
Skolem-Noether theorem
One of the important structure results about Azumaya algebras is the Skolem-Noether theorem: given a commutative ring and an Azumaya algebra, the only automorphisms of are inner. Meaning, the mapsendingis surjective. This is important because it directly relates to the cohomological classification of similarity classes of Azumaya algebras over a scheme. In particular, it implies an Azumaya algebra has structure group for some, and the Čech cohomology groupgives a cohomological classification of such bundles. Then, this can be related to using the exact sequenceIt turns out the image of is a subgroup of the torsion subgroup.On a scheme
An Azumaya algebra on a scheme X with structure sheaf, according to the original Grothendieck seminar, is a sheaf of -algebras that is étale locally isomorphic to a matrix algebra sheaf; one should, however, add the condition that each matrix algebra sheaf is of positive rank. This definition makes an Azumaya algebra on into a 'twisted-form' of the sheaf. Milne, Étale Cohomology, starts instead from the definition that it is a sheaf of -algebras whose stalk at each point is an Azumaya algebra over the local ring in the sense given above.Two Azumaya algebras and are equivalent if there exist locally free sheaves and of finite positive rank at every point such that
where is the endomorphism sheaf of. The Brauer group of X is the set of equivalence classes of Azumaya algebras. The group operation is given by tensor product, and the inverse is given by the opposite algebra. Note that this is distinct from the cohomological Brauer group which is defined as.
Example over Spec(Z1/n)
The construction of a quaternion algebra over a field can be globalized to by considering the noncommutative -algebrathen, as a sheaf of -algebras, has the structure of an Azumaya algebra. The reason for restricting to the open affine set is because the quaternion algebra is a division algebra over the points is and only if the Hilbert symbolwhich is true at all but finitely many primes.Example over Pn
Over Azumaya algebras can be constructed as for an Azumaya algebra over a field. For example, the endomorphism sheaf of is the matrix sheafso an Azumaya algebra over can be constructed from this sheaf tensored with an Azumaya algebra over, such as a quaternion algebra.Applications
There have been significant applications of Azumaya algebras in diophantine geometry, following work of Yuri Manin. The Manin obstruction to the Hasse principle is defined using the Brauer group of schemes.Brauer group and Azumaya algebras
- Milne, John. . Ch IV
- Mathoverflow Thread on ""
Division algebras