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Abstract
In this paper, the generalized Riemann Zeta function is defined on the right half-plane. In particular, this allows us to prove for every $\tau\in \mathbb{R}$ there exists at most one point $r\in (0,1)$ such that $|\zeta(r+i\tau) |=0$.
Non trivial zeros of the generalized Zeta function
21 October 2024, Version 11
Working Paper
Authors
This content is an early or alternative research output and has not been peer-reviewed by Cambridge University Press at the time of posting.
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