The Green-Tao Theorem on arithmetic progressions in the primes: an ergodic point of view (2005)

by Bryna Kra
Citations:18 - 2 self

Active Bibliography

5 Obstructions to uniformity, and arithmetic patterns in the primes, preprint – Terence Tao
1 Ergodic methods in additive combinatorics – Bryna Kra
Quelques problemes . . . – Qing Chu - 2011
Convergence of multiple . . . – BERNARD HOST - 2006
5 MULTIPLE RECURRENCE AND CONVERGENCE FOR SEQUENCES RELATED TO THE PRIME NUMBERS – Nikos Frantzikinakis, Bernard Host, Bryna Kra
4 What is good mathematics – Terence Tao - 2007
12 The ergodic and combinatorial approaches to Szemerédi’s theorem – Terence Tao - 2006
34 A quantitative ergodic theory proof of Szemerédi’s theorem – Terence Tao - 2004
150 The primes contain arbitrarily long arithmetic progressions – Ben Green, Terence Tao
An inverse theorem for the Gowers U³(G) norm – Ben Green, Terence Tao - 2006
1 Ergodic Ramsey theory: a dynamical approach to static theorems – Vitaly Bergelson
4 A HARDY FIELD EXTENSION OF SZEMERÉDI’S THEOREM – NIKOS FRANTZIKINAKIS , MÁTÉ WIERDL - 2008
19 The dichotomy between structure and randomness, arithmetic progressions, and the primes – Terence Tao
9 Multiple ergodic averages for three polynomials and applications – Nikos Frantzikinakis - 2006
3 Arithmetic progressions and the primes - El Escorial lectures – Terence Tao
5 Powers of Sequences and Recurrence – Nikos Frantzikinakis, Emmanuel Lesigne, Máté Wierdl - 2008
30 The primes contain arbitrarily long polynomial progressions – Terence Tao, Tamar Ziegler
Additive Combinatorics with a view towards Computer Science and Cryptography An – Khodakhast Bibak - 2011
17 A new proof of the density Hales-Jewett theorem – D. H. J. Polymath - 2009