Add to ORKGAbstract. Witt equivalent fields can be understood to be fields having the same symmetric bilinear form theory. Witt equivalence of finite fields, local fields and global fields is well understood. Witt equivalence of function fields of curves defined over archimedean local fields is also well understood. In the present paper, Witt equivalence of general function fields over global fields is studied. It is proved that for any two such fields K,L, any Witt equivalence K ∼ L induces a cannonical bijection v ↔ w between Abhyankar valuations v on K having residue field not finite of characteristic 2 and Abhyankar val-uations w on L having residue field not finite of characteristic 2. The main tool used in the proof is a method for constructing ...
AbstractIf k is a perfect field of characteristic p ≠ 0 and k(x) is the rational function field over...
quasihomogeneous cone). The aim of this paper is to describe the Witt ring of the function field of ...
AbstractLet K be a field of characteristic different from 2. In the algebraic theory of quadratic fo...
Two fields are Witt equivalent if, roughly speaking, they have the same quadratic form theory. Forma...
summary:The starting point of this note is the observation that the local condition used in the noti...
AbstractLet E, F be two fields of characteristic 2 and let W(E), W(F) be the Witt rings of non-singu...
Abstract. Harrison’s criterion characterizes the isomorphy of the Witt rings of two fields in terms ...
Let E, F be two fields of characteristic 2 and let W(E), W(F) be the Witt rings of non-singular symm...
International audienceHarrison's criterion characterizes the isomorphy of the Witt rings of two fiel...
AbstractThis paper investigates the connection between the Witt and Witt-Grothendieck rings of a fie...
This thesis is devoted to the study of different aspects of valuation theory. The first chapter fits...
This thesis assembles some new results in the field arithmetic of various classes of fields, includi...
In 1932, E. Witt showed how the collection of bilinear forms over a field $E$ can be made into a rin...
Using the higher tame symbol and Kawada and Satake’s Witt vector method, A.N. Parshin developed clas...
AbstractThe Witt ring of a field serves as an effective medium to study certain arithmetical invaria...
AbstractIf k is a perfect field of characteristic p ≠ 0 and k(x) is the rational function field over...
quasihomogeneous cone). The aim of this paper is to describe the Witt ring of the function field of ...
AbstractLet K be a field of characteristic different from 2. In the algebraic theory of quadratic fo...
Two fields are Witt equivalent if, roughly speaking, they have the same quadratic form theory. Forma...
summary:The starting point of this note is the observation that the local condition used in the noti...
AbstractLet E, F be two fields of characteristic 2 and let W(E), W(F) be the Witt rings of non-singu...
Abstract. Harrison’s criterion characterizes the isomorphy of the Witt rings of two fields in terms ...
Let E, F be two fields of characteristic 2 and let W(E), W(F) be the Witt rings of non-singular symm...
International audienceHarrison's criterion characterizes the isomorphy of the Witt rings of two fiel...
AbstractThis paper investigates the connection between the Witt and Witt-Grothendieck rings of a fie...
This thesis is devoted to the study of different aspects of valuation theory. The first chapter fits...
This thesis assembles some new results in the field arithmetic of various classes of fields, includi...
In 1932, E. Witt showed how the collection of bilinear forms over a field $E$ can be made into a rin...
Using the higher tame symbol and Kawada and Satake’s Witt vector method, A.N. Parshin developed clas...
AbstractThe Witt ring of a field serves as an effective medium to study certain arithmetical invaria...
AbstractIf k is a perfect field of characteristic p ≠ 0 and k(x) is the rational function field over...
quasihomogeneous cone). The aim of this paper is to describe the Witt ring of the function field of ...
AbstractLet K be a field of characteristic different from 2. In the algebraic theory of quadratic fo...