BEGIN:VCALENDAR
VERSION:2.0
PRODID:researchseminars.org
CALSCALE:GREGORIAN
X-WR-CALNAME:researchseminars.org
BEGIN:VEVENT
SUMMARY:Borys Kadets (MIT)
DTSTART:20200428T180000Z
DTEND:20200428T190000Z
DTSTAMP:20260422T213017Z
UID:UW-Seattle-NTS/1
DESCRIPTION:Title: <a href="https://researchseminars.org/talk/UW-Seattle-N
 TS/1/">Number of points on abelian varieties over finite fields</a>\nby Bo
 rys Kadets (MIT) as part of University of Washington number theory seminar
 \n\nAbstract: TBA\n
LOCATION:https://researchseminars.org/talk/UW-Seattle-NTS/1/
END:VEVENT
BEGIN:VEVENT
SUMMARY:Samantha Fairchild (University of Washington)
DTSTART:20200512T180000Z
DTEND:20200512T190000Z
DTSTAMP:20260422T213017Z
UID:UW-Seattle-NTS/2
DESCRIPTION:Title: <a href="https://researchseminars.org/talk/UW-Seattle-N
 TS/2/">A geometric Euler totient function associated to non-uniform lattic
 es in SL(2\,R)</a>\nby Samantha Fairchild (University of Washington) as pa
 rt of University of Washington number theory seminar\n\n\nAbstract\nWe def
 ine a generalization of the Euler totient function associated to \\Gamma\,
  a subgroup of SL(2\,\\R) which is discrete\, and whose quotient is non-co
 mpact but finite volume. When \\Gamma = SL(2\,Z) the generalization reduce
 s to the classical Euler totient function. We will first discuss a countin
 g result from the study of translation surfaces where the function arises.
  Next I will share an application of the counting result to understand a g
 eneralization of the Gauss circle problem\, and propose further questions 
 about the geometric Euler totient function.\n
LOCATION:https://researchseminars.org/talk/UW-Seattle-NTS/2/
END:VEVENT
END:VCALENDAR