The Erdős discrepancy problem
由 T Tao 著作 · 2015 · 被引用 50 次 — This answers a question of Erdős. In fact the argument also applies to sequences f taking values in the unit sphere of a real or complex Hilbert space. The ... ,由 RL Bras 著作 · 2014 · 被引用 9 次 — According to the Erdős discrepancy conjecture, for any infinite -pm 1 sequence, there exists a homogeneous arithmetic progression of unbounded ...
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The Erdős discrepancy problem 相關參考資料
Sign sequence - Wikipedia
https://en.wikipedia.org The Erdos discrepancy problem
由 T Tao 著作 · 2015 · 被引用 50 次 — This answers a question of Erdős. In fact the argument also applies to sequences f taking values in the unit sphere of a real or complex Hilbert space. The ... https://arxiv.org On the Erdos Discrepancy Problem
由 RL Bras 著作 · 2014 · 被引用 9 次 — According to the Erdős discrepancy conjecture, for any infinite -pm 1 sequence, there exists a homogeneous arithmetic progression of unbounded ... https://arxiv.org [1903.01881] Good weights for the Erdős discrepancy problem
由 N Frantzikinakis 著作 · 2019 — The Erdős discrepancy problem, now a theorem by T. Tao, asks whether every sequence with values plus or minus one has unbounded ... https://arxiv.org A Magical Answer to an 80-Year-Old Puzzle | Quanta Magazine
2015年10月1日 — Terence Tao of the University of California, Los Angeles, has proposed a solution to the long-standing Erdős discrepancy problem. Kyle ... https://www.quantamagazine.org The Erdős Discrepancy Problem - Simons Foundation
The Erdős Discrepancy Problem on Simons Foundation. ... In this lecture, Terence Tao will discuss his general solution to the problem, published last year, and ... https://www.simonsfoundation.o On the Erdős Discrepancy Problem | SpringerLink
由 R Le Bras 著作 · 2014 · 被引用 9 次 — According to the Erdős discrepancy conjecture, for any infinite ±1 sequence, there exists a homogeneous arithmetic progression of unbounded discrepancy. https://link.springer.com |