New lower bounds for van der Waerden numbers

Abstract

We show that there is a red-blue colouring of [N] with no blue 3-term arithmetic progression and no red arithmetic progression of length eC( N)3/4( N)1/4. Consequently, the two-colour van der Waerden number w(3,k) is bounded below by kb(k), where b(k) = c ( k k )1/3. Previously it had been speculated, supported by data, that w(3,k) = O(k2).