We document the discovery of two generating functions forzeta(2n+2), analogous to earlier work for zeta(2n+1) and zeta(4n+3),initiated by Koecher and pursued further by Borwein, Bradley andothers
By application of the Markov-WZ method, we prove a more general form of a bivariate generating fun...
In this thesis the zeta functions in analytic number theory are stud-ied. The distribution of primes...
In this note we present an elementary method of determining values of the zeta function ()zζ for 0, ...
We document the discovery of two generating functions for zeta(2n+2), analogous to earlier work for...
We document the discovery of two generating functions for ζ(2n+2), analogous to earlier work for ζ(2...
Multiple zeta values are the numbers defined by the convergent series ζ(s1,s2,…,sk)=∑n1>n2>⋯>nk>0(1/...
Abstract. We prove a very general identity, conjectured by Henri Cohen, involving the generating fun...
International audienceWe study some classical identities for multiple zeta values and show that they...
We present two new families of identities for the multiple zeta (star) values: The first one general...
Article submitted to the Journal of Number Theory In this article, we present a variety of evaluatio...
Bernoulli numbers appear as special values of zeta functions at integers and identities relating the...
International audienceZeta values in Tate algebras were introduced by Pellarin in 2012. They are gen...
CombinatoricsBy application of the Markov-WZ method, we prove a more general form of a bivariate gen...
AbstractIn this note, we obtain the following identities,∑a+b+c=nζ(2a,2b,2c)=58ζ(2n)−14ζ(2)ζ(2n−2),f...
Abstract. A generating function for specified sums of multiple zeta values is defined and a differen...
By application of the Markov-WZ method, we prove a more general form of a bivariate generating fun...
In this thesis the zeta functions in analytic number theory are stud-ied. The distribution of primes...
In this note we present an elementary method of determining values of the zeta function ()zζ for 0, ...
We document the discovery of two generating functions for zeta(2n+2), analogous to earlier work for...
We document the discovery of two generating functions for ζ(2n+2), analogous to earlier work for ζ(2...
Multiple zeta values are the numbers defined by the convergent series ζ(s1,s2,…,sk)=∑n1>n2>⋯>nk>0(1/...
Abstract. We prove a very general identity, conjectured by Henri Cohen, involving the generating fun...
International audienceWe study some classical identities for multiple zeta values and show that they...
We present two new families of identities for the multiple zeta (star) values: The first one general...
Article submitted to the Journal of Number Theory In this article, we present a variety of evaluatio...
Bernoulli numbers appear as special values of zeta functions at integers and identities relating the...
International audienceZeta values in Tate algebras were introduced by Pellarin in 2012. They are gen...
CombinatoricsBy application of the Markov-WZ method, we prove a more general form of a bivariate gen...
AbstractIn this note, we obtain the following identities,∑a+b+c=nζ(2a,2b,2c)=58ζ(2n)−14ζ(2)ζ(2n−2),f...
Abstract. A generating function for specified sums of multiple zeta values is defined and a differen...
By application of the Markov-WZ method, we prove a more general form of a bivariate generating fun...
In this thesis the zeta functions in analytic number theory are stud-ied. The distribution of primes...
In this note we present an elementary method of determining values of the zeta function ()zζ for 0, ...