Modified N\"orlund polynomials

Abstract

The modified Bernoulli numbers Bn* considered by Zagier are generalized to modified N\"orlund polynomials Bn()*. For ∈N, an explicit expression for the generating function for these polynomials is obtained. Evaluations of some spectacular integrals involving Chebyshev polynomials, and of a finite sum involving integrals of the Hurwitz zeta function are also obtained. New results about the -fold convolution of the square hyperbolic secant distribution are obtained, such as a differential-difference equation satisfied by a logarithmic moment and a closed-form expression in terms of the Barnes zeta function.