The Green-Tao Theorem on arithmetic progressions in the primes: an ergodic point of

The Green-Tao Theorem on arithmetic progressions in the primes: an ergodic point of (2006)

by Bryna Kra

Citations:

15 - 1 self

Datum	Value	Source
TITLE	The Green-Tao Theorem on arithmetic progressions in the primes: an ergodic point of	INFERENCE
AUTHOR NAME	Bryna Kra	SVM HeaderParse 0.2
ABSTRACT	Abstract. A long-standing and almost folkloric conjecture is that the primes contain arbitrarily long arithmetic progressions. Until recently, the only progress on this conjecture was due to van der Corput, who showed in 1939 that there are infinitely many triples of primes in arithmetic progression. In an amazing fusion of methods from analytic number theory and ergodic theory, Ben Green and Terence Tao showed that for any positive integer k, there exist infinitely many arithmetic progressions of length k consisting only of prime numbers. This is an introduction to some of the ideas in the proof, concentrating on the connections to ergodic theory. 1. Background For hundreds of years, mathematicians have made conjectures about patterns in the primes: one of the simplest to state is that the primes contain arbitrarily long arithmetic progressions. It is not clear exactly when this conjecture was first formalized, but as early as 1770 Lagrange and Waring studied the problem of how large the common difference of an arithmetic progression of k primes must be. A	SVM HeaderParse 0.2
YEAR	2006	INFERENCE
PAGES	43	INFERENCE
CITATIONS	31 found	ParsCit 1.0