AbstractLet w = w1 … wn be a word of maximal length n, and with a maximal number of distinct letters for this length, such that w has periods p1, …, pn but not period gcd(p1,…,pr). We provide a fast algorithm to compute n and w. We show that w is uniquely determined apart from isomorphism and that it is a palindrome. Furthermore we give lower and upper bounds for n as explicit functions of p1, …pr. For r = 2 the exact value of n is due to Fine and Wilf. In case the number of distinct letters in the extremal word equals r a formula for n had been given by Castelli, Mignosi and Restivo in case r = 3 and by Justin if r > 3
Abstract. The relationship between the length of a word and the maximum length of its unbordered fac...
International audienceWe regard a finite word u=u_1u_2 ... u_n up to word isomorphism as an equivale...
AbstractWe study the relation between the palindromic and factor complexity of infinite words. We sh...
Let w = w1 :::wn be a word of maximal length n, and with a maximal number of distinct letters for t...
AbstractLet w = w1 … wn be a word of maximal length n, and with a maximal number of distinct letters...
AbstractGiven positive integers n, and p1,…,pr, we establish a fast word combinatorial algorithm for...
AbstractThe well known Fine and Wilf's theorem for words states that if a word has two periods and i...
In this note we consider the longest word, which has periods p1,...,pn, and does not have the period...
Fine and Wilf’s well-known theorem states that any word having periods p, q and length at least p + ...
AbstractThe well-known Periodicity Lemma of Fine and Wilf states that if the word x of length n has ...
Given a finite word u, we define its palindromic length |u|pal to be the least number n such that u ...
AbstractThe problem of computing periods in words, or finite sequences of symbols from a finite alph...
The problem of computing periods in words, or finite sequences of symbols from a finite alphabet, ha...
A finite word w of length n contains at most n + 1 distinct palindromic factors. If the bound n + 1 ...
We present a method which displays all palindromes of a given length from De Bruijn words of a certa...
Abstract. The relationship between the length of a word and the maximum length of its unbordered fac...
International audienceWe regard a finite word u=u_1u_2 ... u_n up to word isomorphism as an equivale...
AbstractWe study the relation between the palindromic and factor complexity of infinite words. We sh...
Let w = w1 :::wn be a word of maximal length n, and with a maximal number of distinct letters for t...
AbstractLet w = w1 … wn be a word of maximal length n, and with a maximal number of distinct letters...
AbstractGiven positive integers n, and p1,…,pr, we establish a fast word combinatorial algorithm for...
AbstractThe well known Fine and Wilf's theorem for words states that if a word has two periods and i...
In this note we consider the longest word, which has periods p1,...,pn, and does not have the period...
Fine and Wilf’s well-known theorem states that any word having periods p, q and length at least p + ...
AbstractThe well-known Periodicity Lemma of Fine and Wilf states that if the word x of length n has ...
Given a finite word u, we define its palindromic length |u|pal to be the least number n such that u ...
AbstractThe problem of computing periods in words, or finite sequences of symbols from a finite alph...
The problem of computing periods in words, or finite sequences of symbols from a finite alphabet, ha...
A finite word w of length n contains at most n + 1 distinct palindromic factors. If the bound n + 1 ...
We present a method which displays all palindromes of a given length from De Bruijn words of a certa...
Abstract. The relationship between the length of a word and the maximum length of its unbordered fac...
International audienceWe regard a finite word u=u_1u_2 ... u_n up to word isomorphism as an equivale...
AbstractWe study the relation between the palindromic and factor complexity of infinite words. We sh...