AbstractA (finite) Fibonacci string Fn is defined as follows: F0 = b, F1 = a; for every integer n ⩾ 2, Fn = Fn − 1Fn − 2. For n ⩾ 1, the length of Fn is denoted by ƒn = ¦Fn¦. The infinite Fibonacci string F is the string which contains every Fn, n ⩾ 1, as a prefix. Apart from their general theoretical importance, Fibonacci strings are often cited as worst-case examples for algorithms which compute all the repetitions or all the “Abelian squares” in a given string. In this paper we provide a characterization of all the squares in F, hence in every prefix Fn; this characterization naturally gives rise to a Θ(ƒn) algorithm which specifies all the squares of Fn in an appropriate encoding. This encoding is made possible by the fact that the squa...
In 1985, Simion and Schmidt showed that |Sn(τ3)|, the cardinality of the set of all length n permuta...
Abstract. We introduce a representation of subwords of the infinite Fibonacci word f ∞ by a specific...
A (finite) Fibonacci stringFn is defined as follows: F0 = b, F1 = a; for every integer n ⩾ 2, Fn = F...
AbstractA (finite) Fibonacci string Fn is defined as follows: F0 = b, F1 = a; for every integer n ⩾ ...
AbstractAll our words (sequences) are binary. A square is a subword of the form uu (concatenation). ...
Fibonacci strings turn out to constitute worst cases for a number of computer algorithms which find ...
AbstractWe exhibit and study various regularity properties of the sequence (R(n))n⩾1 which counts th...
In this paper we apply a simple representation of Sturmian strings, which we call a "reduction seque...
AbstractIn this paper we apply a simple representation of Sturmian strings, which we call a “reducti...
The aim of this note is to survey the factorizations of the Fibonacci infinite word that make use of...
We implement a decision procedure for answering questions about a class of infinite words that might...
Abstract. Denote by sq(w) the number of distinct squares in a string w and let S be the class of sta...
Part 2: Regular PapersInternational audienceWe provide some interesting relations involving k-genera...
AbstractLet τ=(5-1)/2. Let a, b be two distinct letters. The infinite Fibonacci word is the infinite...
The Fibonacci sequence (1, 1, 2, 3, 5, 8, 13, 21, 34, 55, 89 144 233 277, ...) is perhaps the most f...
In 1985, Simion and Schmidt showed that |Sn(τ3)|, the cardinality of the set of all length n permuta...
Abstract. We introduce a representation of subwords of the infinite Fibonacci word f ∞ by a specific...
A (finite) Fibonacci stringFn is defined as follows: F0 = b, F1 = a; for every integer n ⩾ 2, Fn = F...
AbstractA (finite) Fibonacci string Fn is defined as follows: F0 = b, F1 = a; for every integer n ⩾ ...
AbstractAll our words (sequences) are binary. A square is a subword of the form uu (concatenation). ...
Fibonacci strings turn out to constitute worst cases for a number of computer algorithms which find ...
AbstractWe exhibit and study various regularity properties of the sequence (R(n))n⩾1 which counts th...
In this paper we apply a simple representation of Sturmian strings, which we call a "reduction seque...
AbstractIn this paper we apply a simple representation of Sturmian strings, which we call a “reducti...
The aim of this note is to survey the factorizations of the Fibonacci infinite word that make use of...
We implement a decision procedure for answering questions about a class of infinite words that might...
Abstract. Denote by sq(w) the number of distinct squares in a string w and let S be the class of sta...
Part 2: Regular PapersInternational audienceWe provide some interesting relations involving k-genera...
AbstractLet τ=(5-1)/2. Let a, b be two distinct letters. The infinite Fibonacci word is the infinite...
The Fibonacci sequence (1, 1, 2, 3, 5, 8, 13, 21, 34, 55, 89 144 233 277, ...) is perhaps the most f...
In 1985, Simion and Schmidt showed that |Sn(τ3)|, the cardinality of the set of all length n permuta...
Abstract. We introduce a representation of subwords of the infinite Fibonacci word f ∞ by a specific...
A (finite) Fibonacci stringFn is defined as follows: F0 = b, F1 = a; for every integer n ⩾ 2, Fn = F...