AbstractLet ψ(x) denote the digamma function. We study the linear independence of ψ(x) at rational arguments over algebraic number fields. We also formulate a variant of a conjecture of Rohrlich concerning linear independence of the log gamma function at rational arguments and report on some progress. We relate these conjectures to non-vanishing of certain L-series
AbstractWe consider the values at proper fractions of the arithmetic gamma function and the values a...
The paper deals with the so-called linearly unrelated se-quences. The criterion and the application ...
A very rich interplay between arithmetic, geometry, transcendence and combinatorics arises in the st...
AbstractLet ψ(x) denote the digamma function. We study the linear independence of ψ(x) at rational a...
For fixed complex with ||>1, the -logarithm is the meromorphic continuation of the series ∑>0/(−1)...
We obtain a necessary and sufficient condition for the linear independence of solutions of different...
AbstractLet ψ(x) denote the digamma function, that is, the logarithmic derivative of Euler's Γ-funct...
Abstract. Motivated by certain classical conjectures over number fields that logarithms of alge-brai...
In 1955 A.B. Shidlovski's general theorems were published. They allow us to reduce the problem of al...
International audienceIn this paper, the algebraic independence of values of the functionG d (z) := ...
We obtain a necessary and sufficient condition for the linear independence of solutions of differen...
Abstract: A criterion for linear independence, similar to that established in 2002 by Hančl in the ...
This paper gives conditions for algebraic independence of a collection of functions satisfying a cer...
The aim of this article is to provide an analogue of the Ball-Rivoal theorem for p-adic L-values of ...
The aim of this note is to give short and almost elementary proofs of two theorems, by Papanikolas a...
AbstractWe consider the values at proper fractions of the arithmetic gamma function and the values a...
The paper deals with the so-called linearly unrelated se-quences. The criterion and the application ...
A very rich interplay between arithmetic, geometry, transcendence and combinatorics arises in the st...
AbstractLet ψ(x) denote the digamma function. We study the linear independence of ψ(x) at rational a...
For fixed complex with ||>1, the -logarithm is the meromorphic continuation of the series ∑>0/(−1)...
We obtain a necessary and sufficient condition for the linear independence of solutions of different...
AbstractLet ψ(x) denote the digamma function, that is, the logarithmic derivative of Euler's Γ-funct...
Abstract. Motivated by certain classical conjectures over number fields that logarithms of alge-brai...
In 1955 A.B. Shidlovski's general theorems were published. They allow us to reduce the problem of al...
International audienceIn this paper, the algebraic independence of values of the functionG d (z) := ...
We obtain a necessary and sufficient condition for the linear independence of solutions of differen...
Abstract: A criterion for linear independence, similar to that established in 2002 by Hančl in the ...
This paper gives conditions for algebraic independence of a collection of functions satisfying a cer...
The aim of this article is to provide an analogue of the Ball-Rivoal theorem for p-adic L-values of ...
The aim of this note is to give short and almost elementary proofs of two theorems, by Papanikolas a...
AbstractWe consider the values at proper fractions of the arithmetic gamma function and the values a...
The paper deals with the so-called linearly unrelated se-quences. The criterion and the application ...
A very rich interplay between arithmetic, geometry, transcendence and combinatorics arises in the st...