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SUMMARY:Lisa Hartung (Johannes Gutenberg University Mainz)
DTSTART:20201201T153000Z
DTEND:20201201T163000Z
DTSTAMP:20260513T195539Z
UID:OxfordRMT/9
DESCRIPTION:Title: <a href="https://researchseminars.org/talk/OxfordRMT/9/
 ">Maxima of a random model of the Riemann zeta function on longer interval
 s (and branching random walks)</a>\nby Lisa Hartung (Johannes Gutenberg Un
 iversity Mainz) as part of Oxford Random Matrix Theory Seminars\n\n\nAbstr
 act\nWe study the maximum of a random model for the Riemann zeta function 
 (on the critical line  at height T) on the interval $[−(\\log T)^\\theta
 \,(\\log T)^\\theta)$\, where $\\theta=(\\log\\log T)−a$\, with $0 < a <
  1$.  We obtain the leading order as well as the logarithmic correction of
  the maximum. \n\nAs it turns out a good toy model is a collection of inde
 pendent BRW’s\, where the number of independent copies depends on θ. In
  this talk I will try to motivate our results by mainly focusing on this t
 oy model. The talk is based on joint work in progress with L.-P. Arguin an
 d G. Dubach.\n
LOCATION:https://researchseminars.org/talk/OxfordRMT/9/
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