Add to ORKGIn this paper ∗ we consider Milnor K-theory of fields [Mi]. Let F be a field of characteristic different from 2 and let L be an extension of degree two with generator σ of Gal(L|F). The purpose of this paper is to prov
Intended for graduate courses or for independent study, this book presents the basic theory of field...
A valued field K is called p-henselian, if its valuation extends uniquely to the maximal Galois p-ex...
This volume contains previously unpublished papers on algebraic K-theory written by Leningrad mathem...
Let E be a cyclic extension of degree p n of a field F of characteristic p. We determine kmE, the Mi...
This work is on the structure of the Galois groups of the maximal 2-extensions of a field. This work...
We give a simple presentation of the additive Milnor-Witt K-theory groups KMWn(F) of the field F, fo...
In this paper, semilocal Milnor K-theory of fields is introduced and studied. A strongly convergent ...
AbstractLet p be a prime number, let K be a field with characteristic different from p containing th...
International audienceLet F be a field, let G = Gal(¯ F /F) be its absolute Galois group, and let R(...
AbstractWe show that operations in Milnor K-theory modp of a field are spanned by divided power oper...
Abstract. For K a field containing the finite field F9 we give explicitly the whole family of Galois...
We discussed some details of a construction used in the proof of the generalized Milnor conjecture. ...
For K a field containing the finite field $\mathbb{F}_9$ we give explicitly the whole family of Galo...
In this thesis, we give a presentation for Milnor K-theory of a field F whose generators are tuples ...
Let K be a difference field of zero characteristic with a basic set σ = {α1,..., αn}, that is, a fie...
Intended for graduate courses or for independent study, this book presents the basic theory of field...
A valued field K is called p-henselian, if its valuation extends uniquely to the maximal Galois p-ex...
This volume contains previously unpublished papers on algebraic K-theory written by Leningrad mathem...
Let E be a cyclic extension of degree p n of a field F of characteristic p. We determine kmE, the Mi...
This work is on the structure of the Galois groups of the maximal 2-extensions of a field. This work...
We give a simple presentation of the additive Milnor-Witt K-theory groups KMWn(F) of the field F, fo...
In this paper, semilocal Milnor K-theory of fields is introduced and studied. A strongly convergent ...
AbstractLet p be a prime number, let K be a field with characteristic different from p containing th...
International audienceLet F be a field, let G = Gal(¯ F /F) be its absolute Galois group, and let R(...
AbstractWe show that operations in Milnor K-theory modp of a field are spanned by divided power oper...
Abstract. For K a field containing the finite field F9 we give explicitly the whole family of Galois...
We discussed some details of a construction used in the proof of the generalized Milnor conjecture. ...
For K a field containing the finite field $\mathbb{F}_9$ we give explicitly the whole family of Galo...
In this thesis, we give a presentation for Milnor K-theory of a field F whose generators are tuples ...
Let K be a difference field of zero characteristic with a basic set σ = {α1,..., αn}, that is, a fie...
Intended for graduate courses or for independent study, this book presents the basic theory of field...
A valued field K is called p-henselian, if its valuation extends uniquely to the maximal Galois p-ex...
This volume contains previously unpublished papers on algebraic K-theory written by Leningrad mathem...