The maximal number of cubic runs in a word
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摘要
A run is an inclusion maximal occurrence in a word (as a subinterval) of a factor in which the period repeats at least twice. The maximal number of runs in a word of length n has been thoroughly studied, and is known to be between 0.944n and 1.029n. The proofs are very technical. In this paper we investigate cubic runs, in which the period repeats at least three times. We show the upper bound on their maximal number, cubic-runs(n), in a word of length n: cubic-runs(n)<0.5n. The proof of linearity of cubic-runs(n) utilizes only simple properties of Lyndon words and is considerably simpler than the corresponding proof for general runs. For binary words, we provide a better upper bound cubic-runs2(n)<0.48n which requires computer-assisted verification of a large number of cases. We also construct an infinite sequence of words over a binary alphabet for which the lower bound is 0.41n.
论文关键词:Run in a word,Lyndon word,Fibonacci word
论文评审过程:Received 19 September 2010, Revised 18 April 2011, Accepted 17 November 2011, Available online 27 December 2011.
论文官网地址:https://doi.org/10.1016/j.jcss.2011.12.005