In a recent work, the authors established new results about general linear Mahler systems in several variables from the perspective of transcendental number theory, such as a multivariate extension of Nishioka's theorem. Working with functions of several variables and with different Mahler transformations leads to a number of complications, including the need to prove a general vanishing theorem and to use tools from ergodic Ramsey theory and Diophantine approximation (e.g., a variant of the p-adic Schmidt subspace theorem). These complications make the proof of the main results proved in rather intricate. In this article, we describe our new approach in the special case of linear Mahler systems in one variable. This leads to a new, element...
39 pages.-- MSC2000 codes: Primary: 30E10, 42C05; Secondary: 41A20.-- ArXiv pre-print available at: ...
This paper proves the existence of an universal nontrivial minorant of the set of the Mahler measure...
The thesis is devoted to Multiplicity Estimates, a type of results widely used in transcendence theo...
In a recent work, the authors established new results about general linear Mahler systems in several...
International audienceIn 1990, Ku. Nishioka proved a fundamental theorem for Mahler's method, which ...
Cette thèse se situe dans le domaine de la théorie des nombres. Nous étudions la transcendance et l...
This paper is an introduction to Mahler's method for transcendence and algebraic independence, with ...
International audienceLet K be a function field of characteristic p > 0. We recently established the...
International audienceThis paper is devoted to the study of the analytic properties of Mahler system...
We provide a general result for the algebraic independence of Mahler functions by a new method based...
In this thesis, we investigate topics belonging to number theory, and especially to transcendental n...
This paper is devoted to the study of the analytic properties of Mahler systems at 0. We give an eff...
In this paper, we give a new proof of a result due to Bèzivin that a D-finite Mahler function is nec...
This thesis is part of Number Theory. It deals with transcendence and algebraic independence of valu...
International audienceThe guiding thread of the present work is the following result, in the vain of...
39 pages.-- MSC2000 codes: Primary: 30E10, 42C05; Secondary: 41A20.-- ArXiv pre-print available at: ...
This paper proves the existence of an universal nontrivial minorant of the set of the Mahler measure...
The thesis is devoted to Multiplicity Estimates, a type of results widely used in transcendence theo...
In a recent work, the authors established new results about general linear Mahler systems in several...
International audienceIn 1990, Ku. Nishioka proved a fundamental theorem for Mahler's method, which ...
Cette thèse se situe dans le domaine de la théorie des nombres. Nous étudions la transcendance et l...
This paper is an introduction to Mahler's method for transcendence and algebraic independence, with ...
International audienceLet K be a function field of characteristic p > 0. We recently established the...
International audienceThis paper is devoted to the study of the analytic properties of Mahler system...
We provide a general result for the algebraic independence of Mahler functions by a new method based...
In this thesis, we investigate topics belonging to number theory, and especially to transcendental n...
This paper is devoted to the study of the analytic properties of Mahler systems at 0. We give an eff...
In this paper, we give a new proof of a result due to Bèzivin that a D-finite Mahler function is nec...
This thesis is part of Number Theory. It deals with transcendence and algebraic independence of valu...
International audienceThe guiding thread of the present work is the following result, in the vain of...
39 pages.-- MSC2000 codes: Primary: 30E10, 42C05; Secondary: 41A20.-- ArXiv pre-print available at: ...
This paper proves the existence of an universal nontrivial minorant of the set of the Mahler measure...
The thesis is devoted to Multiplicity Estimates, a type of results widely used in transcendence theo...