A regularity lemma and twins in words

Abstract

For a word S, let f(S) be the largest integer m such that there are two disjoints identical (scattered) subwords of length m. Let f(n, ) = \f(S): S is of length n, over alphabet \. Here, it is shown that \[2f(n, \0,1\) = n-o(n)\] using the regularity lemma for words. I.e., any binary word of length n can be split into two identical subwords (referred to as twins) and, perhaps, a remaining subword of length o(n). A similar result is proven for k identical subwords of a word over an alphabet with at most k letters.