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 HalesJewett theorem
– D. H. J. Polymath
 2009
