Binary Words Containing Few Abelian Squares
Abstract
Fici and Saarela ([2]) conjectured that a binary word of length n contains at least n/4 abelian squares. We slightly extend this conjecture and show that it holds in some special cases. In all other cases we have the following: given a Parikh vector over a two letter alphabet we produce a word with that Parikh vector which we conjecture contains the least possible number of abelian squares.
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