An explicit formula for the generalized Bernoulli polynomials

The 'degenerate' Bernoulli numbers tim(2) can be defined by means of the exponential generating function x((1 + 2x) 1/~ -1)-1. L. Carlitz proved an analogue of the Staudt-Clausen theorem for these numbers, and he showed that/3m(2) is a polynomial in 2 of degree ~< m. In this paper we find explicit f

An explicit formula for establishing the relationship between the original coeficients of a single-variable polynomial and the coeficients of the transformed polynomial upon application of the general bilinear transformation is derived. The derivation is based on an alternative approach which is sim

We introduce an :-calculus with the help of the generalized Bernoulli polynomials. The parameter : is the order of a Bessel function of the first kind. The differential :-calculus can be put in a general context where the concept of supporting function is an important tool for practical purposes. Ou