Let P be a hereditary property of words, i.e., an infinite class of finite words such that every subword (block) of a word belonging to P is also in P. Extending the classical Morse-Hedlund theorem, we show that either P contains at least n+1 words of length n for every n or, for some N, it contains at most N words of length n for every n. More importantly, we prove the following quantitative extension of this result: if P has m ≤ n words of length n then, for every k ≥ n + m, it contains at most ⌈(m + 1)/2⌉⌈(m + 1)/2⌈ words of length k
Lutz Priese raised the following conjecture: Almost all words of length n over a finite alphabet A w...
AbstractA set of words X over a finite alphabet A is said to be unavoidable if all but finitely many...
International audienceIn 1999 Lyngsø and Pedersen proposed a conjecture stating that every binary ci...
Let P be a hereditary property of words, i.e., an infinite class of finite words such that every sub...
Given an infinite word over the alphabet $\{0,1,2,3\}$, we define a class of bipartite hereditary gr...
A finite word w of length n contains at most n + 1 distinct palindromic factors. If the bound n + 1 ...
Motivated by a conjecture of Frid, Puzynina, and Zamboni, we investigate infi-nite words with the pr...
AbstractLet Q be an alphabet on q letters. Let W : Z ≥0 → Q be a word such that each letter of Q occ...
We show that there exist binary circular 5/2 power free words of every length. Keywords: Combinato...
Sturmian words (balanced, non ultimately periodic, innite words) have been widely studied since the ...
Given a finite word u, we define its palindromic length |u|pal to be the least number n such that u ...
In their 1938 seminal paper on symbolic dynamics, Morse and Hedlund proved that every aperiodic infi...
We prove that the minimal length of a word S n having the property that it contains exactly Fm+2 dis...
AbstractIn this paper, we study combinatorial and structural properties of a new class of finite and...
AbstractPartial words are sequences over a finite alphabet that may contain wildcard symbols, called...
Lutz Priese raised the following conjecture: Almost all words of length n over a finite alphabet A w...
AbstractA set of words X over a finite alphabet A is said to be unavoidable if all but finitely many...
International audienceIn 1999 Lyngsø and Pedersen proposed a conjecture stating that every binary ci...
Let P be a hereditary property of words, i.e., an infinite class of finite words such that every sub...
Given an infinite word over the alphabet $\{0,1,2,3\}$, we define a class of bipartite hereditary gr...
A finite word w of length n contains at most n + 1 distinct palindromic factors. If the bound n + 1 ...
Motivated by a conjecture of Frid, Puzynina, and Zamboni, we investigate infi-nite words with the pr...
AbstractLet Q be an alphabet on q letters. Let W : Z ≥0 → Q be a word such that each letter of Q occ...
We show that there exist binary circular 5/2 power free words of every length. Keywords: Combinato...
Sturmian words (balanced, non ultimately periodic, innite words) have been widely studied since the ...
Given a finite word u, we define its palindromic length |u|pal to be the least number n such that u ...
In their 1938 seminal paper on symbolic dynamics, Morse and Hedlund proved that every aperiodic infi...
We prove that the minimal length of a word S n having the property that it contains exactly Fm+2 dis...
AbstractIn this paper, we study combinatorial and structural properties of a new class of finite and...
AbstractPartial words are sequences over a finite alphabet that may contain wildcard symbols, called...
Lutz Priese raised the following conjecture: Almost all words of length n over a finite alphabet A w...
AbstractA set of words X over a finite alphabet A is said to be unavoidable if all but finitely many...
International audienceIn 1999 Lyngsø and Pedersen proposed a conjecture stating that every binary ci...