English

Monochromatic Hilbert cubes and arithmetic progressions

Combinatorics 2018-05-24 v1 Number Theory

Abstract

The Van der Waerden number W(k,r)W(k,r) denotes the smallest nn such that whenever [n][n] is rr--colored there exists a monochromatic arithmetic progression of length kk. Similarly, the Hilbert cube number h(k,r)h(k,r) denotes the smallest nn such that whenever [n][n] is rr--colored there exists a monochromatic affine kk--cube, that is, a set of the form{x0+bBb:BA}\left\{x_0 + \sum_{b \in B} b : B \subseteq A\right\} for some A=k|A|=k and x0Zx_0 \in \mathbb{Z}. We show the following relation between the Hilbert cube number and the Van der Waerden number. Let k3k \geq 3 be an integer. Then for every ϵ>0\epsilon >0, there is a c>0c > 0 such that h(k,4)min{W(ck2,2),2k2.5ϵ}.h(k,4) \ge \min\{W(\lfloor c k^2\rfloor, 2), 2^{k^{2.5-\epsilon}}\}. Thus we improve upon state of the art lower bounds for h(k,4)h(k,4) conditional on W(k,2)W(k,2) being significantly larger than 2k2^k. In the other direction, this shows that the if the Hilbert cube number is close its state of the art lower bounds, then W(k,2)W(k,2) is at most doubly exponential in kk. We also show the optimal result that for any Sidon set AZA \subset \mathbb{Z}, one has {bBb:BA}=Ω(A3).\left|\left\{\sum_{b \in B} b : B \subseteq A\right\}\right| = \Omega( |A|^3) .

Keywords

Cite

@article{arxiv.1805.08938,
  title  = {Monochromatic Hilbert cubes and arithmetic progressions},
  author = {József Balogh and Mikhail Lavrov and George Shakan and Adam Zsolt Wagner},
  journal= {arXiv preprint arXiv:1805.08938},
  year   = {2018}
}
R2 v1 2026-06-23T02:05:08.603Z