Arithmetic Properties of Bernoulli–Padé Numbers and Polynomials

An algebraic theory of residues is used to evaluate summations of the form Various identities involving Bernoulli numbers and polynomials are derived.

In this paper, we find simple 2-adic congruences mod 2 [nÂ2]+1 for the No rlund numbers B (n) n and for the Bernoulli numbers of the second kind b n . These congruences improve F. T. Howard's mod 8 congruences (in ``Applications of Fibonacci Numbers, '' Vol. 5, pp. 355 366, Kluwer Academic, Dordrech

We prove congruences of shape E kþh E k Á E h ðmod NÞ modulo powers N of small prime numbers p; thereby refining the well-known Kummer-type congruences modulo these p of the normalized Eisenstein series E k : The method uses Serre's theory of Iwasawa functions and p-adic Eisenstein series; it presen

Conditional Bernoulli (in short ``CB'') models have been recently applied to many statistical fields including survey sampling, logistic regression, case-control studies, lottery, signal processing and Poisson-Binomial distributions. In this paper, we present several general properties of CB models

Polynomial and Pade representations of the kinetic energy component ẃ x w x T of the correlation energy density functional E are presented in this article. Two c c w x approximate local formulas similar to the Wigner form for E are investigated for c w x T . Applications of these formulas along with