Terence Tao: The Erdős Discrepancy Problem
ฝัง
- เผยแพร่เมื่อ 8 ต.ค. 2015
- UCLA Mathematics Colloquium
"The Erdős Discrepancy Problem"
Terence Tao, UCLA
Abstract. The discrepancy of a sequence f(1), f(2), ... of numbers is defined to be the largest value of |f(d) + f(2d) + ... + f(nd)| as n,d range over the natural numbers. In the 1930s, Erdős posed the question of whether any sequence consisting only of +1 and -1 could have bounded discrepancy. In 2010, the collaborative Polymath5 project showed (among other things) that the problem could be effectively reduced to a problem involving completely multiplicative sequences. Finally, using recent breakthroughs in the asymptotics of completely multiplicative sequences by Matomaki and Radziwill, as well as a surprising application of the Shannon entropy inequalities, the Erdős discrepancy problem was solved this September. In this talk I will discuss this solution and its connection to the Chowla and Elliott conjectures in number theory.
Institute for Pure and Applied Mathematics, UCLA
October 8, 2015
For more information: www.ipam.ucla.edu/news/terry-t.... - วิทยาศาสตร์และเทคโนโลยี
