Add to ORKGThe purpose of this note is to present some results on the arithmetic of dihedral algebraic function fields
In this paper, we study number fields K with the property that every prime factor of the degree of K...
International audienceAs an analogous of a conjecture of Artin, we show that, if $ Y\longrightarrow ...
AbstractWe consider here a number of topics concerning the theory of division algebras over the func...
The purpose of this note is to present some results on the arithmetic of dihedral algebraic function...
AbstractLet LK be a Galois extension of algegraic function fields in one variable with Galois group ...
This thesis covers the factorization properties of number fields, and presents the structures necess...
AbstractThe structure of ideal class groups of number fields is investigated in the following three ...
AbstractIn this study, the class number for a hyperelliptic function field of genus g, constant fiel...
In this thesis, we study some congruences on the odd prime factors of the class number of the number...
AbstractWe present a non-abelian mirror-type principle relating the p-ranks of class groups of subfi...
We discuss isomorphism questions concerning the Hopf algebras that yield Hopf–Galois structures for ...
AbstractConditions for divisibility of class numbers of algebraic number fields by prime powers are ...
AbstractThis paper gives some restrictions on finite groups that can occur as Galois groups of exten...
It should be one of the most interesting themes of algebraic number theory to make clear the mutual ...
AbstractLet q be a power of a prime number p. Let k=Fq(t) be the rational function field with consta...
In this paper, we study number fields K with the property that every prime factor of the degree of K...
International audienceAs an analogous of a conjecture of Artin, we show that, if $ Y\longrightarrow ...
AbstractWe consider here a number of topics concerning the theory of division algebras over the func...
The purpose of this note is to present some results on the arithmetic of dihedral algebraic function...
AbstractLet LK be a Galois extension of algegraic function fields in one variable with Galois group ...
This thesis covers the factorization properties of number fields, and presents the structures necess...
AbstractThe structure of ideal class groups of number fields is investigated in the following three ...
AbstractIn this study, the class number for a hyperelliptic function field of genus g, constant fiel...
In this thesis, we study some congruences on the odd prime factors of the class number of the number...
AbstractWe present a non-abelian mirror-type principle relating the p-ranks of class groups of subfi...
We discuss isomorphism questions concerning the Hopf algebras that yield Hopf–Galois structures for ...
AbstractConditions for divisibility of class numbers of algebraic number fields by prime powers are ...
AbstractThis paper gives some restrictions on finite groups that can occur as Galois groups of exten...
It should be one of the most interesting themes of algebraic number theory to make clear the mutual ...
AbstractLet q be a power of a prime number p. Let k=Fq(t) be the rational function field with consta...
In this paper, we study number fields K with the property that every prime factor of the degree of K...
International audienceAs an analogous of a conjecture of Artin, we show that, if $ Y\longrightarrow ...
AbstractWe consider here a number of topics concerning the theory of division algebras over the func...
