Discrete Mathematics & Theoretical Computer Science (Feb 2020)

The repetition threshold for binary rich words

  • James D. Currie,
  • Lucas Mol,
  • Narad Rampersad

DOI
https://doi.org/10.23638/DMTCS-22-1-6
Journal volume & issue
Vol. vol. 22 no. 1, no. Analysis of Algorithms

Abstract

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A word of length $n$ is rich if it contains $n$ nonempty palindromic factors. An infinite word is rich if all of its finite factors are rich. Baranwal and Shallit produced an infinite binary rich word with critical exponent $2+\sqrt{2}/2$ ($\approx 2.707$) and conjectured that this was the least possible critical exponent for infinite binary rich words (i.e., that the repetition threshold for binary rich words is $2+\sqrt{2}/2$). In this article, we give a structure theorem for infinite binary rich words that avoid $14/5$-powers (i.e., repetitions with exponent at least 2.8). As a consequence, we deduce that the repetition threshold for binary rich words is $2+\sqrt{2}/2$, as conjectured by Baranwal and Shallit. This resolves an open problem of Vesti for the binary alphabet; the problem remains open for larger alphabets.

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