Lines Missing Every Random Point

A.S. Besicovitch; A.S. Besicovitch; A.S. Besicovitch; A.S. Besicovitch; A.S. Besicovitch; B. Kjos-Hanssen; C.-P. Schnorr; J. Ville; J.H. Lutz; J.H. Lutz; K.J. Falconer; M. Fujiwara; O. Perron; P.J. Couch; R. Dougherty; R. Rettinger; R.C. Harkins; R.O. Davies; S. Kakeya; T.H. McNicholl

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Lines Missing Every Random Point

Authors: A.S. Besicovitch
A.S. Besicovitch
A.S. Besicovitch
A.S. Besicovitch
A.S. Besicovitch
B. Kjos-Hanssen
C.-P. Schnorr
J. Ville
J.H. Lutz
J.H. Lutz
K.J. Falconer
M. Fujiwara
O. Perron
P.J. Couch
R. Dougherty
R. Rettinger
R.C. Harkins
R.O. Davies
S. Kakeya
T.H. McNicholl
Publication date: 1 January 2014
Publisher
Doi

Abstract

We prove that there is, in every direction in Euclidean space, a line that misses every computably random point. We also prove that there exist, in every direction in Euclidean space, arbitrarily long line segments missing every double exponential time random point.Comment: Added a section: "Betting in Doubly Exponential Time.

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info:doi/10.1007%2F978-3-319-0...

Last time updated on 01/04/2019