Add to ORKGThis dissertation is a collection of four research articles devoted tothe study of Kummer theory for commutative algebraic groups. In numbertheory, Kummer theory refers to the study of field extensions generatedby n-th roots of some base field. Its generalization to commutativealgebraic groups involves fields generated by the division points of afixed algebraic group, such as an elliptic curve or a higher dimensionalabelian variety. Of particular interest in this dissertation is the degreeof such field extensions. In the first two chapter, classical results forelliptic curves are improved by providing explicitly computable bounds anduniform and explicit bounds over the field of rational numbers. In thelast two chapters a general framework f...
peer reviewedFor all number fields the failure of maximality for the Kummer extensions is bounded in...
Let K be a number field, and let G be a finitely generated and torsion-free subgroup of K*. We consi...
This work presents branches of class field theory. Special and general approaches to class field the...
This dissertation is a collection of four research articles devoted tothe study of Kummer theory for...
In this work we generalize the concept of injective module and develop a theory of divisibility for ...
In this work we generalize the concept of injective module and develop a theory of divisibility for ...
This thesis consists of four research articles that treat different aspects of Kummer theory for com...
This thesis consists of four research articles that treat different aspects of Kummer theory for com...
AbstractLet k be an algebraic number field containing a primitive m th root of unity. An extension K...
Let K be a finite field or a finite extension of Qp for some prime number p. If G is a finitely gene...
A Kummer variety is the quotient of an abelian variety by the automorphism (−1) acting on it. Kummer...
Abstract. A Kummer variety is the quotient of an abelian variety by the automorphism (−1) acting on ...
A Kummer variety is the quotient of an abelian variety by the automorphism $(-1)$ acting on it. Kumm...
Intended for graduate courses or for independent study, this book presents the basic theory of field...
For all number fields the failure of maximality for the Kummer extensions is bounded in a very stron...
peer reviewedFor all number fields the failure of maximality for the Kummer extensions is bounded in...
Let K be a number field, and let G be a finitely generated and torsion-free subgroup of K*. We consi...
This work presents branches of class field theory. Special and general approaches to class field the...
This dissertation is a collection of four research articles devoted tothe study of Kummer theory for...
In this work we generalize the concept of injective module and develop a theory of divisibility for ...
In this work we generalize the concept of injective module and develop a theory of divisibility for ...
This thesis consists of four research articles that treat different aspects of Kummer theory for com...
This thesis consists of four research articles that treat different aspects of Kummer theory for com...
AbstractLet k be an algebraic number field containing a primitive m th root of unity. An extension K...
Let K be a finite field or a finite extension of Qp for some prime number p. If G is a finitely gene...
A Kummer variety is the quotient of an abelian variety by the automorphism (−1) acting on it. Kummer...
Abstract. A Kummer variety is the quotient of an abelian variety by the automorphism (−1) acting on ...
A Kummer variety is the quotient of an abelian variety by the automorphism $(-1)$ acting on it. Kumm...
Intended for graduate courses or for independent study, this book presents the basic theory of field...
For all number fields the failure of maximality for the Kummer extensions is bounded in a very stron...
peer reviewedFor all number fields the failure of maximality for the Kummer extensions is bounded in...
Let K be a number field, and let G be a finitely generated and torsion-free subgroup of K*. We consi...
This work presents branches of class field theory. Special and general approaches to class field the...