On generalized Stanley sequences

Abstract

Let N denote the set of all nonnegative integers. Let k 3 be an integer and A0 = \a1, …, at\ (a1 < …< at) be a nonnegative set which does not contain an arithmetic progression of length k. We denote A = \a1, a2, …\ defined by the following greedy algorithm: if l t and a1, …, al have already been defined, then al+1 is the smallest integer a > al such that \a1, …, al\ \a\ also does not contain a k-term arithmetic progression. This sequence A is called the Stanley sequence of order k generated by A0. In this paper, we prove some results about various generalizations of the Stanley sequence.