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SUMMARY:Dyadic approximation in the Cantor set - Sam Chow (Warwick Univers
 ity)
DTSTART:20191119T143000Z
DTEND:20191119T153000Z
UID:TALK132712@talks.cam.ac.uk
CONTACT:Jack Thorne
DESCRIPTION:One variation of Furstenberg's times 2 times 3 phenomenon is t
 hat the base 2 and base 3 expansions of a number are roughly independent. 
 We present a manifestation in metric diophantine approximation. For a typi
 cal element of the middle-third Cantor set\, we examine the rate of approx
 imation by dyadic rationals. This is joint with Demi Allen (Bristol) and H
 an Yu (Cambridge).
LOCATION:MR13
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