Click here to flash read.
arXiv:2404.16352v1 Announce Type: new
Abstract: In this short note, we prove that the one-dimensional Kronecker sequence $i\alpha \bmod 1, i=0,1,2,\ldots,$ is quasi-uniform if and only if $\alpha$ is a badly approximable number. Our elementary proof relies on a result on the three-gap theorem for Kronecker sequences due to Halton (1965).
Click here to read this post out
ID: 823042; Unique Viewers: 0
Unique Voters: 0
Total Votes: 0
Votes:
Latest Change: April 26, 2024, 7:32 a.m.
Changes:
Dictionaries:
Words:
Spaces:
Views: 8
CC:
No creative common's license
No creative common's license
Comments: