For more information about this meeting, contact Robert Vaughan.
|Title:||Zeros of $\zeta$, of $\zeta'$, and of Siegel|
|Seminar:||Algebra and Number Theory Seminar|
|Speaker:||Maksym Radziwill, Stanford University|
|Motivated by applications to the class number problem and the non-existence of Siegel zeros, Farmer and Ki have recently conjectured a precise relationship between the vertical distribution of the zeros of the Riemann zeta-function and the horizontal distribution of the zeros of \zeta'(s).
I will describe the ideas behind my proof of Farmer and Ki's conjecture, the connection between the distribution of the three sets of zeros (of $\zeta$, $\zeta'$ and of Siegel), and the relevance of each to number-theoretic problems.|
Room Reservation Information
|Date:||04 / 25 / 2013|
|Time:||11:15am - 12:05pm|