AbstractExpressions for the polygamma function ψ(k)(x) for the arguments x=14 and x=14 are given in terms of Bernoulli numbers, Euler numbers, the Riemann zeta function for odd integer arguments, and the related series of reciprocal powers of integers β(m)
In this expository article1, we review some aspects of poly-Bernoulli numbers and related zeta funct...
Euler finds the values of ζ(2n), where ζ is now named as the Riemann zeta function. He introduces th...
Euler finds the values of ζ(2n), where ζ is now named as the Riemann zeta function. He introduces th...
AbstractExpressions for the polygamma function ψ(k)(x) for the arguments x=14 and x=14 are given in ...
The connection is considered between integrals and series involving polygamma ψ(z) and zeta ζ(z,s) f...
The polygamma functions ψ(r)(x) are defined for all x>0 and r∈N. In this paper, the concepts of neut...
The polygamma functions ψ(r)(x) are defined for all x>0 and r∈N. In this paper, the concepts of neut...
AbstractLiouville's fractional integration is used to define polygamma functions ψ(n)(Z) for negativ...
Liouville's fractional integration is used to define polygamma functions ψ(n)(Z) for negative intege...
Gauss in 1812, in his celebrated memoir on the hypergeometric series, presented a remarkable formula...
The Arakawa-Kaneko zeta function has been introduced ten years ago by T. Arakawa and M. Kaneko in [2...
Many interesting solutions of the so-called Basler problem of evaluating the Riemann zeta function ζ...
Maximon has recently given an excellent summary of the properties of the Euler dilogarithm function ...
Maximon has recently given an excellent summary of the properties of the Euler dilogarithm function ...
In this expository article1, we review some aspects of poly-Bernoulli numbers and related zeta funct...
In this expository article1, we review some aspects of poly-Bernoulli numbers and related zeta funct...
Euler finds the values of ζ(2n), where ζ is now named as the Riemann zeta function. He introduces th...
Euler finds the values of ζ(2n), where ζ is now named as the Riemann zeta function. He introduces th...
AbstractExpressions for the polygamma function ψ(k)(x) for the arguments x=14 and x=14 are given in ...
The connection is considered between integrals and series involving polygamma ψ(z) and zeta ζ(z,s) f...
The polygamma functions ψ(r)(x) are defined for all x>0 and r∈N. In this paper, the concepts of neut...
The polygamma functions ψ(r)(x) are defined for all x>0 and r∈N. In this paper, the concepts of neut...
AbstractLiouville's fractional integration is used to define polygamma functions ψ(n)(Z) for negativ...
Liouville's fractional integration is used to define polygamma functions ψ(n)(Z) for negative intege...
Gauss in 1812, in his celebrated memoir on the hypergeometric series, presented a remarkable formula...
The Arakawa-Kaneko zeta function has been introduced ten years ago by T. Arakawa and M. Kaneko in [2...
Many interesting solutions of the so-called Basler problem of evaluating the Riemann zeta function ζ...
Maximon has recently given an excellent summary of the properties of the Euler dilogarithm function ...
Maximon has recently given an excellent summary of the properties of the Euler dilogarithm function ...
In this expository article1, we review some aspects of poly-Bernoulli numbers and related zeta funct...
In this expository article1, we review some aspects of poly-Bernoulli numbers and related zeta funct...
Euler finds the values of ζ(2n), where ζ is now named as the Riemann zeta function. He introduces th...
Euler finds the values of ζ(2n), where ζ is now named as the Riemann zeta function. He introduces th...
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