A Constructive Lower Bound on Szemer\'edi's Theorem

Abstract

Let rk(n) denote the maximum cardinality of a set A ⊂ \1,2, …, n \ such that A does not contain a k-term arithmetic progression. In this paper, we give a method of constructing such a set and prove the lower bound n1-ckk k < rk(n) where k is prime, and ck → 1 as k → ∞. This bound is the best known for an increasingly large interval of n as we choose larger and larger k. We also demonstrate that one can prove or disprove a conjecture of Erdos on arithmetic progressions in large sets once tight enough bounds on rk(n) are obtained.