Relations for Bernoulli--Barnes Numbers and Barnes Zeta Functions

Abstract

The Barnes ζ-function is \[ ζn (z, x; ) := Σ ∈ 0n 1(x + m1 a1 + … + mn an )z \] defined for (x) > 0 and (z) > n and continued meromorphically to . Specialized at negative integers -k, the Barnes ζ-function gives \[ ζn (-k, x; ) = (-1)n k!(k+n)! \, Bk+n (x; ) \] where Bk(x; ) is a Bernoulli--Barnes polynomial, which can be also defined through a generating function that has a slightly more general form than that for Bernoulli polynomials. Specializing Bk(0; ) gives the Bernoulli--Barnes numbers. We exhibit relations among Barnes ζ-functions, Bernoulli--Barnes numbers and polynomials, which generalize various identities of Agoh, Apostol, Dilcher, and Euler.