George Szekeres described some subsets of {1,..., n} without arithmetic progressions of length p for odd primes p, obtained by a greedy algorithm. Let r(k)(n) denote the size of the largest subset of {1,..., n} without arithmetic progressions of length k. In this paper, the history of results based on the constructions by Szekeres is briefly surveyed. New inequalities for r(k) (n) and van der Waerden numbers are derived by generalizing these constructions. In particular, for any odd prime p, we prove that r(p)(p(2)) >= (p - 1)(2) + t(p), where lim(p ->infinity) t(p)/In pi*) = 1.

• 出版日期2013-11
• 单位广西科学院