AbstractThe main theorem of this paper is a quantitative result on the algebraic independence of numbers related to the exponential map of a commutative algebraic group defined over a number field. The qualitative version of this theorem improves an earlier result of M. Waldschmidt. In the elliptic case we improve upon previous lower bounds for the transcendence degree over Q of families of the type {P(xiyj), i, j} or {yj, P(xiyj), i, j} where P is a Weierstrass elliptic curve defined over Q
Elliptic curves are fundamental objects in number theory and algebraic geometry, whose points over a...
RésuméWe describe here the state of the art in transcendence methods, proving in an abstract setting...
Thesis (Ph. D.)--University of Washington, 2003The Mordell-Weil theorem states that the points of an...
AbstractThe purpose of this paper is to study the algebraic independence of numbers associated with ...
Theory of transcendental numbers has been considered in the paper. The estimation of the transcenden...
AbstractWe provide a measure for the algebraic independence of some special values of the Weierstras...
AbstractWe continue our investigation into the algebraic independence of two numbers associated with...
Let G be a commutative connected algebraic group over a number field K, let A be a finitely generate...
Peer Reviewedhttp://deepblue.lib.umich.edu/bitstream/2027.42/46230/1/208_2005_Article_BF01450920.pd
Abstract. In this paper we study the surjectivity of the power maps g → gn for algebraic groups ove...
AbstractWe give a variation of a theorem of Gelfond. One of the corollaries is Schneider's conjectur...
This dissertation is a collection of four research articles devoted tothe study of Kummer theory for...
We prove a transcendence theorem concerning values of holomorphic maps from a disk to a quasi-projec...
In this thesis, we give a brief survey on elliptic curves over finite fields, complex multiplication...
Abstract. An elliptic curve is a specific type of algebraic curve on which one may impose the struct...
Elliptic curves are fundamental objects in number theory and algebraic geometry, whose points over a...
RésuméWe describe here the state of the art in transcendence methods, proving in an abstract setting...
Thesis (Ph. D.)--University of Washington, 2003The Mordell-Weil theorem states that the points of an...
AbstractThe purpose of this paper is to study the algebraic independence of numbers associated with ...
Theory of transcendental numbers has been considered in the paper. The estimation of the transcenden...
AbstractWe provide a measure for the algebraic independence of some special values of the Weierstras...
AbstractWe continue our investigation into the algebraic independence of two numbers associated with...
Let G be a commutative connected algebraic group over a number field K, let A be a finitely generate...
Peer Reviewedhttp://deepblue.lib.umich.edu/bitstream/2027.42/46230/1/208_2005_Article_BF01450920.pd
Abstract. In this paper we study the surjectivity of the power maps g → gn for algebraic groups ove...
AbstractWe give a variation of a theorem of Gelfond. One of the corollaries is Schneider's conjectur...
This dissertation is a collection of four research articles devoted tothe study of Kummer theory for...
We prove a transcendence theorem concerning values of holomorphic maps from a disk to a quasi-projec...
In this thesis, we give a brief survey on elliptic curves over finite fields, complex multiplication...
Abstract. An elliptic curve is a specific type of algebraic curve on which one may impose the struct...
Elliptic curves are fundamental objects in number theory and algebraic geometry, whose points over a...
RésuméWe describe here the state of the art in transcendence methods, proving in an abstract setting...
Thesis (Ph. D.)--University of Washington, 2003The Mordell-Weil theorem states that the points of an...