Results 181 to 190 of about 47,314 (210)
Some of the next articles are maybe not open access.
A Note on Bernoulli-Goss Polynomials
Canadian Mathematical Bulletin, 1984AbstractIn an important series of papers ([3], [4], [5]), (see also Rosen and Galovich [1], [2]), D. Goss has developed the arithmetic of cyclotomic function fields. In particular, he has introduced Bernoulli polynomials and proved a non-existence theorem for an analogue to Fermat’s equation for regular “exponent”. For each odd prime p and integer n, l
Ireland, K., Small, D.
openaire +1 more source
The Integrality of the Values of Bernoulli Polynomials and of Generalised Bernoulli Numbers
Bulletin of the London Mathematical Society, 1997\textit{G. Almkvist} and \textit{A. Meurman} [C. R. Math. Acad. Sci., Soc. R. Can. 13, 104-108 (1991; Zbl 0731.11014)] proved a result on the values of the Bernoulli polynomials at rational values of the argument. Subsequently \textit{B. Sury} [Bull. Lond. Math. Soc. 25, 327-329 (1993; Zbl 0807.11014)] and \textit{K. Bartz} and \textit{J. Rutkowski} [C.
Clarke, Francis, Slavutskii, I. Sh.
openaire +2 more sources
Convolutions of Bernoulli and Euler Polynomials
Sarajevo Journal of MathematicsBy means of the generating function technique, several convolution identities are derived for the polynomials of Bernoulli and Euler. 2000 Mathematics Subject Classification.
CHU, Wenchang, ZHOU R. R.
openaire +2 more sources
A New Formula for the Bernoulli Polynomials
Results in Mathematics, 2010The author defines \(r\)-Whitney numbers \(w_{m,r}(n,k)\) and \(W_{m,r}(n,k)\) of the first and second kind by the equalities \[ m^nx^{\underline{n}}=\sum_{k=0}^nw_{m,r}(n,k)(mx+r)^k \] and \[ (mx+r)^n=\sum_{k=0}^nm^kW_{m,r}(n,k)x^{\underline{k}} \] with \(x^{\underline{n}}=x(x-1)\cdots(x-n+1)\) denoting falling factorials. These numbers are also given
openaire +2 more sources
Generalization of Bernoulli polynomials
International Journal of Mathematical Education in Science and Technology, 2002The Bernoulli polynomials are generalized and some properties of the resulting generalizations are presented.
Qi, Feng, Guo, Bai-Ni
openaire +1 more source
Formulas for Bernoulli Numbers and Polynomials
Results in MathematicsSpecial polynomials and numbers possess much importance in multifarious areas of sciences such as physics, mathematics, applied sciences, engineering, and other related research fields covering differential equations, number theory, functional analysis, quantum mechanics, mathematical analysis, mathematical physics, and so on.
Ulrich Abel, Horst Alzer
openaire +2 more sources
Probabilistic Bernoulli and Euler Polynomials
Russian Journal of Mathematical PhysicszbMATH Open Web Interface contents unavailable due to conflicting licenses.
Kim, T., Kim, D. S.
openaire +2 more sources
p-Bernoulli and geometric polynomials
International Journal of Number Theory, 2018We relate geometric polynomials and [Formula: see text]-Bernoulli polynomials with an integral representation, then obtain several properties of [Formula: see text]-Bernoulli polynomials. These results yield new identities for Bernoulli numbers. Moreover, we evaluate a Faulhaber-type summation in terms of [Formula: see text]-Bernoulli polynomials ...
openaire +1 more source
Bernoulli and Euler Polynomials
2021Focus of this chapter are Bernoulli numbers and polynomials, and Euler numbers and polynomials in the complex domain. For the evaluation several methods can be used in dependence of the polynomial degree and argument: Direct integration, direct integration in combination with argument transformations, or expansions with respect to trigonometric series.
openaire +1 more source