This paper is an introduction to Mahler's method for transcendence and algebraic independence, with an emphasis on periods in positive characteristic
Abstract We present a completely explicit transcendence measure for e. This is a continuation and a...
ix, 308 leaves ; 30 cm. Includes bibliographical references. University of Otago department: Music.T...
The Mahler measure is a fascinating notion and an exciting topic in contemporary mathematics, interc...
International audienceHere we propose a survey on Mahler's theory for transcendence and algebraic in...
International audienceIn 1990, Ku. Nishioka proved a fundamental theorem for Mahler's method, which ...
In the last five years there has been very significant progress in the development of transcendence ...
This thesis is part of Number Theory. It deals with transcendence and algebraic independence of valu...
We provide a general result for the algebraic independence of Mahler functions by a new method based...
Cette thèse se situe dans le domaine de la théorie des nombres. Nous étudions la transcendance et l...
In a recent work, the authors established new results about general linear Mahler systems in several...
Algebraic independence of the values of Mahler functions satisfying implicit functional equations by...
Abstract We prove algebraic independence of functions satisfying a simple form of algebraic Mahler f...
AbstractA sightly improved classical transcendence measure for e will be given, by showing that the ...
RésuméWe describe here the state of the art in transcendence methods, proving in an abstract setting...
In this thesis, we investigate topics belonging to number theory, and especially to transcendental n...
Abstract We present a completely explicit transcendence measure for e. This is a continuation and a...
ix, 308 leaves ; 30 cm. Includes bibliographical references. University of Otago department: Music.T...
The Mahler measure is a fascinating notion and an exciting topic in contemporary mathematics, interc...
International audienceHere we propose a survey on Mahler's theory for transcendence and algebraic in...
International audienceIn 1990, Ku. Nishioka proved a fundamental theorem for Mahler's method, which ...
In the last five years there has been very significant progress in the development of transcendence ...
This thesis is part of Number Theory. It deals with transcendence and algebraic independence of valu...
We provide a general result for the algebraic independence of Mahler functions by a new method based...
Cette thèse se situe dans le domaine de la théorie des nombres. Nous étudions la transcendance et l...
In a recent work, the authors established new results about general linear Mahler systems in several...
Algebraic independence of the values of Mahler functions satisfying implicit functional equations by...
Abstract We prove algebraic independence of functions satisfying a simple form of algebraic Mahler f...
AbstractA sightly improved classical transcendence measure for e will be given, by showing that the ...
RésuméWe describe here the state of the art in transcendence methods, proving in an abstract setting...
In this thesis, we investigate topics belonging to number theory, and especially to transcendental n...
Abstract We present a completely explicit transcendence measure for e. This is a continuation and a...
ix, 308 leaves ; 30 cm. Includes bibliographical references. University of Otago department: Music.T...
The Mahler measure is a fascinating notion and an exciting topic in contemporary mathematics, interc...
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