On non-repetitive sequences of arithmetic progressions:the cases k ∈ \4,5,6,7,8\

Abstract

A d-subsequence of a sequence = x1… xn is a subsequence xi xi+d xi+2d …, for any positive integer d and any i, 1 i n. A k-Thue sequence is a sequence in which every d-subsequence, for 1 d k, is non-repetitive, i.e. it contains no consecutive equal subsequences. In 2002, Grytczuk proposed a conjecture that for any k, k+2 symbols are enough to construct a k-Thue sequences of arbitrary lengths. So far, the conjecture has been confirmed for k ∈ \1,2,3,5\. Here, we present two different proving techniques, and confirm it for all k, with 2 k 8.