International audienceWe develop a new method for proving algebraic independence of $G$-functions. Our approach rests on the following observation: $G$-functions do not always come with a single linear differential equation, but also sometimes with an infinite family of linear difference equations associated with the Frobenius that are obtained by reduction modulo prime ideals. When these linear difference equations have order one, the coefficients of the $G$-function satisfy congruences reminiscent of a classical theorem of Lucas on binomial coefficients. We use this to derive a Kolchin-like algebraic independence criterion. We show the relevance of this criterion by proving, using p-adic tools, that many classical families of $G$-function...
If two motives are congruent, is it the case that the special values of their respective \(L\)-func...
Algebraic independence of the values of Mahler functions satisfying implicit functional equations by...
International audienceWe consider pairs of automorphisms (φ, σ) acting on fields of Laurent or Puise...
International audienceWe develop a new method for proving algebraic independence of G-functions. Our...
International audienceWe develop a new method for proving algebraic independence of $G$-functions. O...
A very rich interplay between arithmetic, geometry, transcendence and combinatorics arises in the st...
The paper proves results of linear independence over the ratonals, for values of G-functions at alge...
This paper gives conditions for algebraic independence of a collection of functions satisfying a cer...
Abstract We prove algebraic independence of functions satisfying a simple form of algebraic Mahler f...
In 1955 A.B. Shidlovski's general theorems were published. They allow us to reduce the problem of al...
This work is a collaboration with B. Adamczewski (ICJ, France), T. Dreyfus (IRMA, France) and M. Wib...
We prove the linear independence of the members of a large class of L-functions defined axiomaticall...
We consider a $G$-function $F(z)=\sum_{k=0}^{\infty} A_k z^k \in \mathbb{K}[[z]]$, where $\mathbb{K}...
In the frame of Mahler's method for algebraic independence we show that the algebraic relations over...
In the last five years there has been very significant progress in the development of transcendence ...
If two motives are congruent, is it the case that the special values of their respective \(L\)-func...
Algebraic independence of the values of Mahler functions satisfying implicit functional equations by...
International audienceWe consider pairs of automorphisms (φ, σ) acting on fields of Laurent or Puise...
International audienceWe develop a new method for proving algebraic independence of G-functions. Our...
International audienceWe develop a new method for proving algebraic independence of $G$-functions. O...
A very rich interplay between arithmetic, geometry, transcendence and combinatorics arises in the st...
The paper proves results of linear independence over the ratonals, for values of G-functions at alge...
This paper gives conditions for algebraic independence of a collection of functions satisfying a cer...
Abstract We prove algebraic independence of functions satisfying a simple form of algebraic Mahler f...
In 1955 A.B. Shidlovski's general theorems were published. They allow us to reduce the problem of al...
This work is a collaboration with B. Adamczewski (ICJ, France), T. Dreyfus (IRMA, France) and M. Wib...
We prove the linear independence of the members of a large class of L-functions defined axiomaticall...
We consider a $G$-function $F(z)=\sum_{k=0}^{\infty} A_k z^k \in \mathbb{K}[[z]]$, where $\mathbb{K}...
In the frame of Mahler's method for algebraic independence we show that the algebraic relations over...
In the last five years there has been very significant progress in the development of transcendence ...
If two motives are congruent, is it the case that the special values of their respective \(L\)-func...
Algebraic independence of the values of Mahler functions satisfying implicit functional equations by...
International audienceWe consider pairs of automorphisms (φ, σ) acting on fields of Laurent or Puise...