Add to ORKGUsing both hypergeometric series and integrals, we discuss several constructions of diophantine approximations to logarithms of rational or algebraic numbers
We present a hypergeometric construction of rational approximations to ζ(2) and ζ(3) which allows on...
$\bullet $ The monodromy’s study of Fuchsian hypergeometric differential equation provides a natural...
Abstract. We compute upper and lower bounds for the approxi-mation of certain values ξ of hyperbolic...
20 pages. See also : http://www.math.jussieu.fr/~miw/articles/Debrecen.htmlWe first propose two conj...
AbstractWe propose hypergeometric constructions of simultaneous approximations to polylogarithms. Th...
The field of transcendance has a variety of subfields including : the transcendence of individual nu...
An account of effective methods in transcendental number theory and Diophantine geometry by eminent ...
AbstractBy decomposing rational functions into partial fractions, we will establish several striking...
In [M. Asakura, N. Otsubo and T. Terasoma, An algebro-geometric study of special values of hypergeom...
The method of Frobenius is a standard technique to construct series solutions of an ordinary linear ...
We compute upper and lower bounds for the approximation of certain values ξ of hyperbolic and trigon...
We relate a previous result of ours on families of diophantine equations having only trivial solutio...
summary:Integrals of logarithmic and hypergeometric functions are intrinsically connected with Euler...
The monodromy’s study of Fuchsian hypergeometric differential equation provides a natural framework ...
eingereicht von Ingrid VukusicLiteraturverzeichnis: Blatt 65-66Paris-Lodron-Universität Salzburg, Ma...
We present a hypergeometric construction of rational approximations to ζ(2) and ζ(3) which allows on...
$\bullet $ The monodromy’s study of Fuchsian hypergeometric differential equation provides a natural...
Abstract. We compute upper and lower bounds for the approxi-mation of certain values ξ of hyperbolic...
20 pages. See also : http://www.math.jussieu.fr/~miw/articles/Debrecen.htmlWe first propose two conj...
AbstractWe propose hypergeometric constructions of simultaneous approximations to polylogarithms. Th...
The field of transcendance has a variety of subfields including : the transcendence of individual nu...
An account of effective methods in transcendental number theory and Diophantine geometry by eminent ...
AbstractBy decomposing rational functions into partial fractions, we will establish several striking...
In [M. Asakura, N. Otsubo and T. Terasoma, An algebro-geometric study of special values of hypergeom...
The method of Frobenius is a standard technique to construct series solutions of an ordinary linear ...
We compute upper and lower bounds for the approximation of certain values ξ of hyperbolic and trigon...
We relate a previous result of ours on families of diophantine equations having only trivial solutio...
summary:Integrals of logarithmic and hypergeometric functions are intrinsically connected with Euler...
The monodromy’s study of Fuchsian hypergeometric differential equation provides a natural framework ...
eingereicht von Ingrid VukusicLiteraturverzeichnis: Blatt 65-66Paris-Lodron-Universität Salzburg, Ma...
We present a hypergeometric construction of rational approximations to ζ(2) and ζ(3) which allows on...
$\bullet $ The monodromy’s study of Fuchsian hypergeometric differential equation provides a natural...
Abstract. We compute upper and lower bounds for the approxi-mation of certain values ξ of hyperbolic...