The van der Waerden Number and Colorings of Hypergraphs

Series
Combinatorics Seminar
Time
Friday, November 16, 2012 - 3:05pm for 1 hour (actually 50 minutes)
Location
Skiles 005
Speaker
Dmitry Shabanov – Moscow State University and Yandex Corporate
Organizer
Prasad Tetali
The talk is devoted to the classical problem of estimating the Van der Waerden number W(n,k). The famous Van der Waerden theorem states that, for any integers n\ge 3, k\ge 2, there exists the smallest integer W(n,k) such that in any k-coloring of the set {1,2,...,W(n,k)}, there exists a monochromatic arithmetic progression of length n. Our talk is focused on the lower bounds for the van der Waerden number. We shall show that estimating W(n,k) from below is closely connected with extremal problems concerning colorings of uniform hypergraphs with large girth. We present a new lower bound for W(n,k), whose proof is based on a continuous-time random recoloring process.