Add to ORKGAbelian varieties with complex multiplication lie at the origins of class field theory, and they play a central role in the contemporary theory of Shimura varieties. They are special in characteristic 0 and ubiquitous over finite fields. This book explores the relationship between such abelian varieties over finite fields and over arithmetically interesting fields of characteristic 0 via the study of several natural CM lifting problems which had previously been solved only in special cases. In addition to giving complete solutions to such questions, the authors provide numerous examples to illustrate the general theory and present a detailed treatment of many fundamental results and concepts in the arithmetic of abelian varieties, such as t...
In this paper, we use the theory of theta functions to generalize to all abelian varieties the usual...
We study base field extensions of ordinary abelian varieties defined over finite fields using the mo...
The canonical height h ̂ on an abelian variety A defined over a global field k is an object of funda...
The theory of complex multiplication makes it possible to construct certain class fields and abelian...
As a prelude to the general theory of complex multiplication of abelian varieties, we discuss the ar...
The theory of complex multiplication makes it possible to construct certain class fields and abelian...
The aim of global class field theory is the description of abelian extensions of a finitely generate...
The book represents an introduction to the theory of abelian varieties with a view to arithmetic. Th...
In this talk we discuss the question whether any abelian variety A0 defined over a finite field κ = ...
One of the aims of algebraic number theory is to describe the field of algebraic numbers and the ex...
The first half of this thesis involves the study of Weil-numbers and their properties. Using charact...
In [S, Ch. IV, §18] the Main Theorem of complex multiplication is proved in a manner that uses some ...
It is known that an abelian variety over a finite field may not admit a lifting to an abelian variet...
It is known that an abelian variety over a finite field may not admit a lifting to an abelian variet...
AbstractTextThe purpose of this paper is to show that the reflex fields of a given CM-field K are eq...
In this paper, we use the theory of theta functions to generalize to all abelian varieties the usual...
We study base field extensions of ordinary abelian varieties defined over finite fields using the mo...
The canonical height h ̂ on an abelian variety A defined over a global field k is an object of funda...
The theory of complex multiplication makes it possible to construct certain class fields and abelian...
As a prelude to the general theory of complex multiplication of abelian varieties, we discuss the ar...
The theory of complex multiplication makes it possible to construct certain class fields and abelian...
The aim of global class field theory is the description of abelian extensions of a finitely generate...
The book represents an introduction to the theory of abelian varieties with a view to arithmetic. Th...
In this talk we discuss the question whether any abelian variety A0 defined over a finite field κ = ...
One of the aims of algebraic number theory is to describe the field of algebraic numbers and the ex...
The first half of this thesis involves the study of Weil-numbers and their properties. Using charact...
In [S, Ch. IV, §18] the Main Theorem of complex multiplication is proved in a manner that uses some ...
It is known that an abelian variety over a finite field may not admit a lifting to an abelian variet...
It is known that an abelian variety over a finite field may not admit a lifting to an abelian variet...
AbstractTextThe purpose of this paper is to show that the reflex fields of a given CM-field K are eq...
In this paper, we use the theory of theta functions to generalize to all abelian varieties the usual...
We study base field extensions of ordinary abelian varieties defined over finite fields using the mo...
The canonical height h ̂ on an abelian variety A defined over a global field k is an object of funda...