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In the classical Witt theory over a field F, the study of quadratic forms begins with two simple invariants: the dimension of a form modulo 2, called the dimension index and denoted e⁰: W(F) → ℤ/2, and the discriminant e¹ with values in k₁(F) = F*/F*², which behaves well on the fundamental ideal I(F)= ker(e⁰). Here a more sophisticated situation is considered, of quadratic forms over a scheme and, more generally, over an exact category with duality. Our purposes are: ...

Fonctions polylogarithmes, nombres polyzêtas et groupes pro-unipotents

Pierre Cartier (2000/2001)

Séminaire Bourbaki

Formules explicites pour le caractère de Chern en $K$ -théorie algébrique

Grégory Ginot (2004)

Annales de l'Institut Fourier

Dans cet article on donne une formule explicite pour le caractère de Chern reliant la $K$ - théorie algébrique et l’homologie cyclique négative. On calcule le caractère de Chern des symboles de Steinberg et de Loday et on donne une preuve élémentaire du fait que le caractère de Chern est multiplicatif.

Galois module structure of Milnor $K$ -theory in characteristic $p$ .

Bhandari, Ganesh, Lemire, Nicole, Mináč, Ján, Swallow, John (2008)

The New York Journal of Mathematics [electronic only]

Galois module structure of Milnor $K$ -theory mod $p^{s}$ in characteristic $p$ .

Mináč, Ján, Schultz, Andrew, Swallow, John (2008)

The New York Journal of Mathematics [electronic only]

Generalized Artin-Hasse and Iwasawa formulas for the Hilbert symbol in a higher local field. II.

Zinov'ev, A.N. (2005)

Journal of Mathematical Sciences (New York)

Homology stability for orthogonal groups over algebraically closed fields

Jean-Louis Cathelineau (2007)

Annales scientifiques de l'École Normale Supérieure

Isotropy of quadratic spaces in finite and infinite dimension.

Becher, Karim Johannes, Hoffmann, Detlev W. (2007)

Documenta Mathematica

Kato homology of arithmetic schemes and higher class field theory over local fields.

Jannsen, Uwe, Saito, Shuji (2003)

Documenta Mathematica

La conjecture de Milnor

Bruno Kahn (1996/1997)

Séminaire Bourbaki

Milnor’s conjecture on quadratic forms and $m o d; 2$ motivic complexes

Fabien Morel (2005)

Rendiconti del Seminario Matematico della Università di Padova

On the cycle map for products of elliptic curves over a p-adic field

Toshiro Hiranouchi, Seiji Hirayama (2013)

Acta Arithmetica

On the Milnor $K$ -groups of complete discrete valuation fields.

Nakamura, Jinya (2000)

Documenta Mathematica

On the structure of Milnor $K$ -groups of certain complete discrete valuation fields

Masato Kurihara (2004)

Journal de Théorie des Nombres de Bordeaux

For a typical example of a complete discrete valuation field $K$ of type II in the sense of [12], we determine the graded quotients ${gr}^{i} K_{2} (K)$ for all $i > 0$ . In the Appendix, we describe the Milnor $K$ -groups of a certain local ring by using differential modules, which are related to the theory of syntomic cohomology.

Some algebraic aspects of quadratic forms over fields of characteristic two.

Baeza, Ricardo (2001)

Documenta Mathematica

Symbol lengths in Milnor $K$ -theory.

Becher, Karim Johannes, Hoffmann, Detlev W. (2004)

Homology, Homotopy and Applications

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