Balanced word: Difference between revisions
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== Properties == | == Properties == | ||
* A balanced word or necklace in ''N'' letters has a [[maximum variety]] bound of <math> N \choose {\lceil N/2 \rceil}</math>. | * A balanced word or necklace in ''N'' letters has a [[maximum variety]] bound of <math> N \choose {\lceil N/2 \rceil}</math>. | ||
* If ''w'' is an aperiodic infinite balanced word, then ''w'' is constructed via a finite sequence of ''congruence substitutions'' from infinite balanced words on 2 letters. | * If ''w'' is an aperiodic infinite balanced word, then ''w'' is constructed via a finite sequence of ''congruence substitutions'' from infinite balanced words on 2 letters.<ref>Brauner, N., Crama, Y., Delaporte, E., Jost, V., & Libralesso, L. (2019). Do balanced words have a short period?. Theoretical Computer Science, 793, 169-180.</ref> | ||
** A congruence word is a word u where the set of occurrences of each letter m in u is of the form <math>\{a_m n + b_m : n \in \mathbb{N}\},</math> for integers a_m and b_m. | ** A congruence word is a word u where the set of occurrences of each letter m in u is of the form <math>\{a_m n + b_m : n \in \mathbb{N}\},</math> for integers a_m and b_m. | ||
** A congruence substitution involves replacing the ''k''th occurrence of a fixed letter ''j'' in ''w'' with the ''k''th letter of ''u'' where ''u'' is a | ** A congruence substitution involves replacing the ''k''th occurrence of a fixed letter ''j'' in ''w'' with the ''k''th letter of ''u'' where ''u'' is a congruence word over a set of letters disjoint from that of ''w'' for all positive integers ''k''. | ||
== Generalizations == | == Generalizations == | ||
Revision as of 12:23, 31 December 2023
Let d ≥ 0. A word or necklace s is balanced if its balance satisfies the following:
[math]\displaystyle{ \operatorname{balance}(s) := \max \big\{ \big| |w|_{x_i} - |w'|_{x_i} \big| : x_i \text{ is a letter of }s\text{ and }k = \operatorname{len}(w) = \operatorname{len}(w') \big\} \leq 1, }[/math]
where |u|xi is the number of occurrences of the letter xi in the word u.
Properties
- A balanced word or necklace in N letters has a maximum variety bound of [math]\displaystyle{ N \choose {\lceil N/2 \rceil} }[/math].
- If w is an aperiodic infinite balanced word, then w is constructed via a finite sequence of congruence substitutions from infinite balanced words on 2 letters.[1]
- A congruence word is a word u where the set of occurrences of each letter m in u is of the form [math]\displaystyle{ \{a_m n + b_m : n \in \mathbb{N}\}, }[/math] for integers a_m and b_m.
- A congruence substitution involves replacing the kth occurrence of a fixed letter j in w with the kth letter of u where u is a congruence word over a set of letters disjoint from that of w for all positive integers k.
Generalizations
References
- ↑ Brauner, N., Crama, Y., Delaporte, E., Jost, V., & Libralesso, L. (2019). Do balanced words have a short period?. Theoretical Computer Science, 793, 169-180.