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DTSTART:20260308T070000
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DTSTART;TZID=America/Toronto:20260406T143000
SEQUENCE:0
TRANSP:TRANSPARENT
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URL:https://uwaterloo.ca/pure-mathematics/events/pure-math-colloquium-65
SUMMARY:Pure Math Colloquium
CLASS:PUBLIC
DESCRIPTION:HONG WANG\, NYU COURANT\n\n_Kakeya sets in R^3_\n\nA Kakeya
  set is a compact subset of R^n that contains a unit line\nsegment point
 ing in every direction.  Kakeya set conjecture asserts\nthat every Kak
 eya set has Minkowski and  Hausdorff dimension n. We\nprove this conject
 ure in R^3 as a consequence of a more general\nstatement about union of
  tubes. This is joint work with Josh Zahl.\n\nM3 1006
DTSTAMP:20260406T163426Z
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