Letter frequency in infinite repetition-free words
نویسنده
چکیده
We estimate the extremal letter frequency in infinite words over a finite alphabet avoiding some repetitions. For ternary square-free words, we improve the bounds of Tarannikov on the minimal letter frequency, and prove that the maximal letter frequency is 255 653 . Kolpakov et al. have studied the function ρ such that ρ(x) is the minimal letter frequency in an infinite binary x-free word. In particular, they have shown that ρ is discontinuous at 73 and at every integer at least 3. We answer one of their question by providing some other points of discontinuity for ρ. Finally, we propose stronger versions of Dejean’s conjecture on repetition threshold in which unequal letter frequencies are required.
منابع مشابه
On the Frequency and Periodicity of Infinite Words On the Frequency and Periodicity of Infinite Words
This work contributes to two aspects of the understanding of infinite words: the frequency of letters in a morphic sequence and periodicity considerations on infinite words. First, we develop a necessary and sufficient criteria for the existence of the frequency of a letter in a morphic sequence, and give some applications of this result. We show that the frequencies of all letters exist in pur...
متن کاملUnequal letter frequencies in ternary square-free words
We consider the set S of triples (x, y, z) corresponding to the frequency of each alphabet letter in some infinite ternary square-free word (so x + y+ z = 1). We conjecture that this set is convex. We obtain bounds on S by with a generalization of our method to bound the extremal frequency of one letter. This method uses weights on the alphabet letters. Finally, we obtain positive results, that...
متن کاملFinite repetition threshold for large alphabets
We investigate the finite repetition threshold for k-letter alphabets, k ≥ 4, that is the smallest number r for which there exists an infinite r+-free word containing a finite number of r-powers. We show that there exists an infinite Dejean word on a 4-letter alphabet (i.e. a word without factors of exponent more than 7 5 ) containing only two 7 5 -powers. For a 5-letter alphabet, we show that ...
متن کاملSmooth infinite words over $n$-letter alphabets having same remainder when divided by $n$
Brlek et al. (2008) studied smooth infinite words and established some results on letter frequency, recurrence, reversal and complementation for 2-letter alphabets having same parity. In this paper, we explore smooth infinite words over n-letter alphabet {a1, a2, · · · , an}, where a1 < a2 < · · · < an are positive integers and have same remainder when divided by n. And let ai = n · qi + r, qi ...
متن کاملFinite-Repetition threshold for infinite ternary words
The exponent of a word is the ratio of its length over its smallest period. The repetitive threshold r(a) of an a-letter alphabet is the smallest rational number for which there exists an infinite word whose finite factors have exponent at most r(a). This notion was introduced in 1972 by Dejean who gave the exact values of r(a) for every alphabet size a as it has been eventually proved in 2009....
متن کاملذخیره در منابع من
با ذخیره ی این منبع در منابع من، دسترسی به آن را برای استفاده های بعدی آسان تر کنید
عنوان ژورنال:
- Theor. Comput. Sci.
دوره 380 شماره
صفحات -
تاریخ انتشار 2007