English

Topics in Ramsey Theory

Combinatorics 2014-04-30 v1

Abstract

Ramsey theory is the study of conditions under which mathematical objects show order when partitioned. Ramsey theory on the integers concerns itself with partitions of [1,n][1,n] into rr subsets and asks the question whether one (or more) of these rr subsets contains a kk-term member of F\mathcal{F}, where [1,n]={1,2,3,,n}[1,n]=\{1,2,3,\ldots,n\} and F\mathcal{F} is a certain family of subsets of Z+\mathbb{Z}^+. When F\mathcal{F} is fixed to be the set of arithmetic progressions, the corresponding Ramsey-type numbers are called the van der Waerden numbers. I started the project choosing F\mathcal{F} to be the set of semi-progressions of scope mm. A semi-progression of scope mZ+m\in \mathbb{Z}^+ is a set of integers {x1,x2,,xk}\{x_1,x_2,\ldots,x_k\} such that for some dZ+d\in\mathbb{Z}^+, xixi1{d,2d,,md}x_{i}-x_{i-1}\in\{d,2d,\ldots,md\} for all i{2,3,,k}i\in\{2,3,\ldots,k\}. The exact values of Ramsey-type functions corresponding to semi-progressions are not known. We use SPm(k)SP_m(k) to denote these numbers as a Ramsey-type function of kk for a fixed scope mm. During this project, I used the probabilistic method to get an exponential lower bound for any fixed mm. The first chapter starts with a brief introduction to Ramsey theory and then explains the problem considered. In the second chapter, I give the results obtained on semi-progressions. In the third chapter, I will discuss the lower bound obtained on Q1(k)Q_1(k). When F\mathcal{F} is chosen to be quasi-progressions of diameter nn, the corresponding Ramsey-type numbers obtained are denoted as Qn(k)Q_n(k). The last chapter gives an exposition of advanced probabilistic techniques, in particular concentration inequalities and how to apply them.

Keywords

Cite

@article{arxiv.1404.7348,
  title  = {Topics in Ramsey Theory},
  author = {Mano Vikash Janardhanan},
  journal= {arXiv preprint arXiv:1404.7348},
  year   = {2014}
}

Comments

56 pages, MS thesis (completed in 2014), Supervisor: S. Vijay

R2 v1 2026-06-22T04:01:45.701Z