Location: Hill 425
Date & time: Tuesday, 05 December 2017 at 2:00PM - 3:00PM
It is known that the Riemann Hypothesis for the completed Riemann zeta function \(xi(s)\) implies the Riemann Hypothesis for its higher derivatives. Conrey investigated the proportion of zeros of higher derivatives on the critical line and proved that this proportion approaches 1 as the order of the derivative becomes large. On the other hand, vertical distribution of zeros of the Riemann zeta function has also attracted a lot of attention. In this talk, we discuss the distribution of imaginary parts of zeros of derivatives of \(xi(s)\), and the proportion of zeros of combinations of these derivatives on the critical line.