AbstractWe focus on infinite words with languages closed under reversal. If frequencies of all factors are well defined, we show that the number of different frequencies of factors of length n+1 does not exceed 2ΔC(n)+1, where ΔC(n) is the first difference of factor complexity C(n) of the infinite word
International audienceIn this paper, we consider smooth words over 2-letter alphabets {a, b}, where ...
International audienceFor an extensive range of infinite words, and the associated symbolic dynamica...
AbstractIn this article, we construct a family of infinite words, generated by countable automata an...
AbstractWe focus on infinite words with languages closed under reversal. If frequencies of all facto...
In this paper we prove that for any infinite word w whose set of factors is closed under reversal. t...
AbstractWe study the relation between the palindromic and factor complexity of infinite words. We sh...
summary:We show a connection between a recent conjecture of Shallit and an older conjecture of Rauzy...
AbstractIn this paper we prove that for any infinite word w whose set of factors is closed under rev...
The $\ell$-Rauzy graph of order $k$ for any infinite word is a directed graph in which an arc $(v_1,...
AbstractWe define several notions of language complexity for finite words, and use them to define an...
AbstractBrlek and Reutenauer conjectured that any infinite word u with language closed under reversa...
AbstractIn this note, we state a conjecture, and prove it in the periodic case, which is an equality...
AbstractIn this paper, we study the infinite words such that limnp(n)/n=1, by using the Rauzy graphs...
AbstractA description is obtained for the factor graphs, or Rauzy graphs, of uniform marked circular...
AbstractIn this paper we study generalization of the reversal mapping realized by an arbitrary invol...
International audienceIn this paper, we consider smooth words over 2-letter alphabets {a, b}, where ...
International audienceFor an extensive range of infinite words, and the associated symbolic dynamica...
AbstractIn this article, we construct a family of infinite words, generated by countable automata an...
AbstractWe focus on infinite words with languages closed under reversal. If frequencies of all facto...
In this paper we prove that for any infinite word w whose set of factors is closed under reversal. t...
AbstractWe study the relation between the palindromic and factor complexity of infinite words. We sh...
summary:We show a connection between a recent conjecture of Shallit and an older conjecture of Rauzy...
AbstractIn this paper we prove that for any infinite word w whose set of factors is closed under rev...
The $\ell$-Rauzy graph of order $k$ for any infinite word is a directed graph in which an arc $(v_1,...
AbstractWe define several notions of language complexity for finite words, and use them to define an...
AbstractBrlek and Reutenauer conjectured that any infinite word u with language closed under reversa...
AbstractIn this note, we state a conjecture, and prove it in the periodic case, which is an equality...
AbstractIn this paper, we study the infinite words such that limnp(n)/n=1, by using the Rauzy graphs...
AbstractA description is obtained for the factor graphs, or Rauzy graphs, of uniform marked circular...
AbstractIn this paper we study generalization of the reversal mapping realized by an arbitrary invol...
International audienceIn this paper, we consider smooth words over 2-letter alphabets {a, b}, where ...
International audienceFor an extensive range of infinite words, and the associated symbolic dynamica...
AbstractIn this article, we construct a family of infinite words, generated by countable automata an...