PřF:MWITT Witt rings of fields - Informace o předmětu
MWITT Witt rings of fields
Přírodovědecká fakultapodzim 2011 - akreditace
Údaje z období podzim 2011 - akreditace se nezveřejňují
- Rozsah
- 0/0. 1 kr. (plus 1 za zk). Doporučované ukončení: z. Jiná možná ukončení: zk.
- Vyučující
- Prof. Kazimierz Szymiczek (přednášející), prof. RNDr. Radan Kučera, DSc. (zástupce)
- Garance
- prof. RNDr. Radan Kučera, DSc.
Ústav matematiky a statistiky – Ústavy – Přírodovědecká fakulta
Kontaktní osoba: prof. RNDr. Radan Kučera, DSc. - Omezení zápisu do předmětu
- Předmět je otevřen studentům libovolného oboru.
- Cíle předmětu
- The course is intended to be an accessible introduction to the fundamental concept of the Witt ring of bilinear (or quadratic) forms over a field for a student who already knows the rudiments of groups, rings, fields and vector spaces.
- Osnova
- Part 1 of the course (4 hours) gives an introduction to the geometry of bilinear spaces and can be viewed as a continuation of the first course in linear algebra.
- Part 2 of the course (6 hours) is devoted to the fundamental concept of the Witt ring of bilinear forms over an arbitrary field of characteristic not two. It offers a complete treatment of the most significant structural results for Witt rings.
- Part 3 of the course (2 hours) explains the techniques of finite dimensional algebras and their applications to quadratic forms. This includes the construction of the Brauer group of a field and a discussion of two fundamental invariants: the Hasse invariant (of equivalence of quadratic forms) and the Witt invariant (of similarity of quadratic forms).
- Part 1: Bilinear spaces
- Bases and matrices of bilinear spaces.
- Isometries of bilinear spaces.
- Nonsingular bilinear spaces.
- Diagonalization of bilinear spaces.
- Witt's cancellation theorem.
- Witt's chain isometry theorem.
- Symmetric spaces over some fields.
- Real and nonreal fields with small square class groups.
- Classification of symmetric spaces.
- Part 2: Witt rings
- Hyperbolic spaces and Witt decomposition of symmetric spaces. The Witt group of a field.
- Tensor products.
- The Witt ring of a field.
- Pfister forms.
- Multiplicative properties.
- The level of a nonreal field.
- Witt ring of a nonreal field.
- Formally real fields and ordered fields.
- Prime ideals of the Witt ring.
- Units and zero divisors in Witt rings.
- Pythagorean fields.
- Witt equivalence of fields.
- Equivalence of fields with respect to quadratic forms.
- Part 3: Invariants
- Algebras.
- Central simple algebras.
- Hamilton quaternions.
- Quaternion algebras.
- Tensor product of algebras.
- Internal direct product of subalgebras.
- The Hasse algebra.
- The reciprocal algebra.
- Brauer group of a field.
- Wedderburn's uniqueness theorem.
- Hasse invariant.
- Witt invariant.
- Arason-Pfister property.
- Harrison's criterion.
- Literatura
- SZYMICZEK, Kazimierz. Bilinear algebra. An introduction to the algebraic theory of quadratic forms. Amsterdam: Gordon and Breach Science Publishers, 1997, 486 s. ISBN 90-5699-076-4. info
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- Statistika zápisu (podzim 2011 - akreditace, nejnovější)
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