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SUMMARY:Kakeya sets in R^3 [Hausdorff Colloquium]
DTSTART:20250429T131500Z
DTEND:20250429T143000Z
DTSTAMP:20260416T074700Z
UID:indico-event-285@math-events.uni-bonn.de
DESCRIPTION:Speakers: Hong Wang (NYU\, USA)\n\nA Kakeya set is a compact s
 ubset of R^n that contains a unit line segment pointing in every direction
 .  Kakeya set conjecture asserts that every Kakeya set has Minkowski and 
 Hausdorff dimension n.  We prove this conjecture in R^3 as a consequence 
 of a more general statement about union of tubes. This is joint work with 
 Josh Zahl.\nWebsite of the Hausdorff Colloquium\n\nhttps://math-events.uni
 -bonn.de/event/285/
LOCATION:Endenicher Allee 60/1-016 - Lipschitzsaal (Mathezentrum)
URL:https://math-events.uni-bonn.de/event/285/
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