On a problem of Erdos and Ingham
Abstract
We give a short and elementary argument answering a question of Erdos and Ingham negatively. Erdos and Ingham showed that a Tauberian estimate they considered was equivalent to the non-vanishing of 1+Σkak-1-it for any real number t and any sequence 1<a1<a2<·s of positive integers such that Σk ak-1<∞. We disprove this statement. In fact, we show that for any complex number λ and any non-zero real number t, there exists a sequence 1<a1<a2<·s of positive integers such that Σk ak-1<∞ and Σk ak-1-it = λ.
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