This paper gives conditions for algebraic independence of a collection of functions satisfying a certain kind of algebraic difference relations. As applications, we show algebraic independence of two collections of special functions: (1) Vignéras’ multiple gamma functions and derivatives of the gamma function, (2) the logarithmic function, q-exponential functions and q-polylogarithm functions. In a similar way, we give a generalization of Ostrowski’s theorem
AbstractWe consider the linear independence of the values of solutions of certain functional equatio...
AbstractLet ψ(x) denote the digamma function. We study the linear independence of ψ(x) at rational a...
International audienceIn this paper, the algebraic independence of values of the functionG d (z) := ...
In the frame of Mahler's method for algebraic independence we show that the algebraic relations over...
For any Q-linearly independent complex numbers α1,...,αn, there are at least n numbers among α1,...,...
International audienceWe develop a new method for proving algebraic independence of $G$-functions. O...
International audienceWe develop a new method for proving algebraic independence of G-functions. Our...
The aim of this note is to give short and almost elementary proofs of two theorems, by Papanikolas a...
This paper uses elementary algebraic methods to obtain new proofs for theorems on algebraic relation...
For a certain class of power series, infinite products, and Lambert type series, we establish a nece...
AbstractWe consider the values at proper fractions of the arithmetic gamma function and the values a...
AbstractThe main theorem of this paper, proved using Mahler's method, gives a necessary and sufficie...
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...
The paper is concerned with the transcendental numbers. The aim is to prove the algebraic independen...
AbstractWe consider the linear independence of the values of solutions of certain functional equatio...
AbstractLet ψ(x) denote the digamma function. We study the linear independence of ψ(x) at rational a...
International audienceIn this paper, the algebraic independence of values of the functionG d (z) := ...
In the frame of Mahler's method for algebraic independence we show that the algebraic relations over...
For any Q-linearly independent complex numbers α1,...,αn, there are at least n numbers among α1,...,...
International audienceWe develop a new method for proving algebraic independence of $G$-functions. O...
International audienceWe develop a new method for proving algebraic independence of G-functions. Our...
The aim of this note is to give short and almost elementary proofs of two theorems, by Papanikolas a...
This paper uses elementary algebraic methods to obtain new proofs for theorems on algebraic relation...
For a certain class of power series, infinite products, and Lambert type series, we establish a nece...
AbstractWe consider the values at proper fractions of the arithmetic gamma function and the values a...
AbstractThe main theorem of this paper, proved using Mahler's method, gives a necessary and sufficie...
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...
The paper is concerned with the transcendental numbers. The aim is to prove the algebraic independen...
AbstractWe consider the linear independence of the values of solutions of certain functional equatio...
AbstractLet ψ(x) denote the digamma function. We study the linear independence of ψ(x) at rational a...
International audienceIn this paper, the algebraic independence of values of the functionG d (z) := ...