Zeros of derivatives of L-functions in the Selberg class on (s)<1/2
Abstract
In this article, we show that the Riemann hypothesis for an L-function F belonging to the Selberg class implies that all the derivatives of F can have at most finitely many zeros on the left of the critical line with imaginary part greater than a certain constant. This was shown for the Riemann zeta function by Levinson and Montgomery in 1974.
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