150

The primes contain arbitrarily long arithmetic progressions
– Ben Green, Terence Tao

133

Some problems of ‘Partitio Numerorum’ III: On the expression of a number as a sum of primes
– G H Hardy, J E Littlewood
 1922

42

On certain sets of positive density
– P Varnavides
 1959

34

A quantitative ergodic theory proof of Szemerédi’s theorem
– Terence Tao
 2004

138

On certain sets of integers
– K F Roth
 1953

140

Ergodic behavior of diagonal measures and a theorem of Szemerédi on arithmetic progressions
– H Furstenberg
 1977

110

A NEW PROOF OF SZEMERÉDI’S THEOREM FOR ARITHMETIC PROGRESSIONS OF LENGTH FOUR
– W. T. Gowers
 1998

19

Small differences between prime numbers
– H Maier
 1988

232

On sets of integers containing no k elements in arithmetic progression, Acta Arithmetica 27
– E Szemerédi
 1975

137

A NEW PROOF OF SZEMERÉDI’S THEOREM
– W. T. Gowers
 2001

25

On the distribution of primes in short intervals, Mathematika 23
– P X Gallagher
 1976

24

On the differences of consecutive primes
– P Erdös
 1935

21

Small difference between prime
– E Bombieri, H Davenport
 1966

52

On sets of integers containing no four elements in arithmetic progression
– E Szemerédi
 1969

7

Small gaps between primes
– D. A. Goldston, C. Y. Yildirim

78

Nonconventional ergodic averages and nilmanifolds
– B Host, B Kra

7

On Snirel’man’s constant, Ann
– O Ramaré
 1995

9

Additive properties of dense subsets of sifted sequences
– O Ramaré, I Ruzsa

12

A mean ergodic theorem for (1/N) ∑N n=1 f(T nx)g(T n2x). Convergence in ergodic theory and probability 92
– H Furstenberg et B Weiss
 1993
