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DTSTART:20230312T070000
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DTSTART;TZID=America/Toronto:20231113T143000
SEQUENCE:0
TRANSP:TRANSPARENT
DTEND;TZID=America/Toronto:20231113T153000
URL:https://uwaterloo.ca/pure-mathematics/events/colloquium-34
SUMMARY:Colloquium
CLASS:PUBLIC
DESCRIPTION:ILA VARMA\, UNIVERSITY OF TORONTO\n\n\"COUNTING NUMBER FIELDS
  AND PREDICTING ASYMPTOTIC\"\n\nA guiding question in number theory\, 
 specifically in arithmetic\nstatistics\, is: Fix a degree n and a Galois g
 roup G in S_n. How does\nthe count of number fields of degree n whose n
 ormal closure has\nGalois group G grow as their discriminants tend to infi
 nity? In this\ntalk\, we will discuss the history of this question and tak
 e a closer\nlook at the story in the case that n = 4\, i.e. the counts of\
 nquartic fields.\n\nMC 5501
DTSTAMP:20260505T133117Z
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