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SUMMARY:Wanlin Li (Washington University\, St. Louis)
DTSTART:20221012T210000Z
DTEND:20221012T223000Z
DTSTAMP:20260423T023049Z
UID:UBC_NTS/5
DESCRIPTION:Title: <a href="https://researchseminars.org/talk/UBC_NTS/5/">
 A generalization of Elkies' theorem</a>\nby Wanlin Li (Washington Universi
 ty\, St. Louis) as part of UBC (online) Number Theory Seminar\n\n\nAbstrac
 t\nElkies proved that for a fixed elliptic curve E defined over Q\, there 
 exist infinitely many primes at which the reductions of E are supersingula
 r. In this talk\, we give the first generalization of Elkies' theorem to c
 urves of genus >2. We consider families of cyclic covers of the projective
  line ramified at 4 points parametrized by a Shimura curve. This is joint 
 work in progress with Elena Mantovan\, Rachel Pries\, and Yunqing Tang.\n\
 nZoom link:\nhttps://ubc.zoom.us/j/67936242498?pwd=ZDZOdzZTcDBpZ3d4c1YvSUc
 5M1Z0QT09\n
LOCATION:https://researchseminars.org/talk/UBC_NTS/5/
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