mathematics Mathematics is a field of study that discovers and organizes methods, Mathematical theory, theories and theorems that are developed and Mathematical proof, proved for the needs of empirical sciences and mathematics itself. There are many ar ...

, a Severi–Brauer variety over a field ''K'' is an

algebraic variety Algebraic varieties are the central objects of study in algebraic geometry, a sub-field of mathematics. Classically, an algebraic variety is defined as the solution set, set of solutions of a system of polynomial equations over the real number, ...

''V'' which becomes

isomorphic In mathematics, an isomorphism is a structure-preserving mapping or morphism between two structures of the same type that can be reversed by an inverse mapping. Two mathematical structures are isomorphic if an isomorphism exists between the ...

to a

projective space In mathematics, the concept of a projective space originated from the visual effect of perspective, where parallel lines seem to meet ''at infinity''. A projective space may thus be viewed as the extension of a Euclidean space, or, more generally ...

over an

algebraic closure In mathematics, particularly abstract algebra, an algebraic closure of a field ''K'' is an algebraic extension of ''K'' that is algebraically closed. It is one of many closures in mathematics. Using Zorn's lemmaMcCarthy (1991) p.21Kaplansky ...

of ''K''. The varieties are associated to

central simple algebra In ring theory and related areas of mathematics a central simple algebra (CSA) over a field ''K'' is a finite-dimensional associative ''K''-algebra ''A'' that is simple, and for which the center is exactly ''K''. (Note that ''not'' every simple ...

s in such a way that the algebra splits over ''K'' if and only if the variety has a rational point over ''K''. studied these varieties, and they are also named after

Richard Brauer Richard Dagobert Brauer (February 10, 1901 – April 17, 1977) was a German and American mathematician. He worked mainly in abstract algebra, but made important contributions to number theory. He was the founder of modular representation t ...

because of their close relation to the

Brauer group In mathematics, the Brauer group of a field ''K'' is an abelian group whose elements are Morita equivalence classes of central simple algebras over ''K'', with addition given by the tensor product of algebras. It was defined by the algebraist ...

. In dimension one, the Severi–Brauer varieties are conics. The corresponding central simple algebras are the

quaternion algebra In mathematics, a quaternion algebra over a field (mathematics), field ''F'' is a central simple algebra ''A'' over ''F''See Milies & Sehgal, An introduction to group rings, exercise 17, chapter 2. that has dimension (vector space), dimension 4 ove ...

s. The algebra corresponds to the conic with equation :

z^2 = ax^2 + by^2 \

and the algebra ''splits'', that is, is isomorphic to a

matrix algebra In abstract algebra, a matrix ring is a set of matrices with entries in a ring ''R'' that form a ring under matrix addition and matrix multiplication. The set of all matrices with entries in ''R'' is a matrix ring denoted M''n''(''R'') (alterna ...

over ''K'', if and only if has a point defined over ''K'': this is in turn equivalent to being isomorphic to the

projective line In projective geometry and mathematics more generally, a projective line is, roughly speaking, the extension of a usual line by a point called a '' point at infinity''. The statement and the proof of many theorems of geometry are simplified by the ...

over ''K''. Such varieties are of interest not only in

diophantine geometry In mathematics, Diophantine geometry is the study of Diophantine equations by means of powerful methods in algebraic geometry. By the 20th century it became clear for some mathematicians that methods of algebraic geometry are ideal tools to study ...

, but also in

Galois cohomology In mathematics, Galois cohomology is the study of the group cohomology of Galois modules, that is, the application of homological algebra to modules for Galois groups. A Galois group ''G'' associated with a field extension ''L''/''K'' acts in a na ...

. They represent (at least if ''K'' is a

perfect field In algebra, a field ''k'' is perfect if any one of the following equivalent conditions holds: * Every irreducible polynomial over ''k'' has no multiple roots in any field extension ''F/k''. * Every irreducible polynomial over ''k'' has non-zero f ...

) Galois cohomology classes in ''H''¹(G(K^s/K),PGL_''n''), where PGL_''n'' is the

projective linear group In mathematics, especially in the group theoretic area of algebra, the projective linear group (also known as the projective general linear group or PGL) is the induced action of the general linear group of a vector space ''V'' on the associa ...

, and ''n'' is one more than the

dimension In physics and mathematics, the dimension of a mathematical space (or object) is informally defined as the minimum number of coordinates needed to specify any point within it. Thus, a line has a dimension of one (1D) because only one coo ...

of the variety ''V''. As usual in Galois cohomology, we often leave the

G(K^s/K)

implied. There is a

short exact sequence In mathematics, an exact sequence is a sequence of morphisms between objects (for example, Group (mathematics), groups, Ring (mathematics), rings, Module (mathematics), modules, and, more generally, objects of an abelian category) such that the Im ...

: 1 → GL₁ → GL_''n'' → PGL_''n'' → 1 of

algebraic group In mathematics, an algebraic group is an algebraic variety endowed with a group structure that is compatible with its structure as an algebraic variety. Thus the study of algebraic groups belongs both to algebraic geometry and group theory. Man ...

s. This implies a connecting homomorphism : ''H''¹(PGL_''n'') → ''H''²(GL₁) at the level of cohomology. Here ''H''²(GL₁) is identified with the

of ''K'', while the kernel is trivial because ''H''¹(GL_''n'') = by an extension of

Hilbert's Theorem 90 In abstract algebra, Hilbert's Theorem 90 (or Satz 90) is an important result on cyclic extensions of field (mathematics), fields (or to one of its generalizations) that leads to Kummer theory. In its most basic form, it states that if ''L''/''K'' ...

. Therefore, Severi–Brauer varieties can be faithfully represented by Brauer group elements, i.e. classes of

s. Lichtenbaum showed that if ''X'' is a Severi–Brauer variety over ''K'' then there is an exact sequence :

0 \rightarrow \mathrm(X) \rightarrow \mathbb ~\stackrel~ \mathrm(K) \rightarrow \mathrm(K)/(X) \rightarrow 0 \ .

Here the map ''δ'' sends 1 to the Brauer class corresponding to ''X''. As a consequence, we see that if the class of ''X'' has order ''d'' in the Brauer group then there is a divisor class of degree ''d'' on ''X''. The associated

linear system In systems theory, a linear system is a mathematical model of a system based on the use of a linear operator. Linear systems typically exhibit features and properties that are much simpler than the nonlinear case. As a mathematical abstractio ...

defines the ''d''-dimensional embedding of ''X'' over a splitting field ''L''.

Note

References

* * * * * * *

External links

Expository paper on Galois descent (PDF)
{{DEFAULTSORT:Severi-Brauer Variety Algebraic varieties Diophantine geometry Homological algebra Algebraic groups Ring theory

See also

Note

References

Further reading

External links