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[Tao/Green]素数含有任意长度的等差数列

Posted by haifeng on 2012-12-28 13:39:14 last update 2015-04-25 10:47:56 | Answers (0) | 收藏


http://annals.math.princeton.edu/2008/167-2/p03


The primes contain arbitrarily long arithmetic progressions

Pages 481-547 from Volume 167 (2008), Issue 2 by Ben Green, Terence Tao

Abstract

We prove that there are arbitrarily long arithmetic progressions of primes. There are three major ingredients. The first is Szemerédi’s theorem, which asserts that any subset of the integers of positive density contains progressions of arbitrary length. The second, which is the main new ingredient of this paper, is a certain transference principle. This allows us to deduce from Szemerédi’s theorem that any subset of a sufficiently pseudorandom set (or measure) of positive relative density contains progressions of arbitrary length. The third ingredient is a recent result of Goldston and Yıldırım, which we reproduce here. Using this, one may place (a large fraction of) the primes inside a pseudorandom set of “almost primes” (or more precisely, a pseudorandom measure concentrated on almost primes) with positive relative density.

 
Primary: 11N13 Secondary: 11A41, 11B25, 37A45
10.4007/annals.2008.167.481
Received: 9 April 2004
Revised: 2 June 2005
Accepted: 12 September 2005

Authors

Ben Green

Center for Mathematical Sciences
University of Cambridge
Cambridge CB3 0WB
United Kingdom

 

Terence Tao

Department of Mathematics
University of California at Los Angeles
Los Angeles, CA 90095
United States

 


主要定理:

素数集合中包含无穷多长度为 $k$ (对所有 $k$ 都对) 的等差数列(arithmetic progression).

换句话说:

对任意 $k$, 存在各项都是素数的等差数列

\[
a_1,\ a_1+d,\ a_1+2d,\ \ldots,\ a_1+(k-1)d.
\]