On the absence of remainders in the Wiener-Ikehara and Ingham-Karamata theorems: a constructive approach

Abstract

We construct explicit counterexamples that show that it is impossible to get any remainder, other than the classical ones, in the Wiener-Ikehara theorem and the Ingham-Karamata theorem under just an additional analytic continuation hypothesis to a half-plane (or even to the whole complex plane).