On Avoiding Sufficiently Long Abelian Squares
Abstract
A finite word w is an abelian square if w = xx with x a permutation of x. In 1972, Entringer, Jackson, and Schatz proved that every binary word of length k2 + 6k contains an abelian square of length ≥ 2k. We use Cartesian lattice paths to characterize abelian squares in binary sequences, and construct a binary word of length q(q+1) avoiding abelian squares of length ≥ 22q(q+1) or greater. We thus prove that the length of the longest binary word avoiding abelian squares of length 2k is (k2).
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