We introduce and study a complexity function on words cx(n), called cyclic complexity, which counts the number of conjugacy classes of factors of length n of an infinite word x. We extend the well-known Morse–Hedlund theorem to the setting of cyclic complexity by showing that a word is ultimately periodic if and only if it has bounded cyclic complexity. Unlike most complexity functions, cyclic complexity distinguishes between Sturmian words of different slopes. We prove that if x is a Sturmian word and y is a word having the same cyclic complexity of x, then up to renaming letters, x and y have the same set of factors. In particular, y is also Sturmian of slope equal to that of x. Since cx(n)=1 for some n≥1 implies x is periodic, it is natu...
Motivated by the extension of the critical factorization theorem to infinite words, we study the (lo...
Motivated by the extension of the critical factorization theorem to infinite words, we study the (lo...
Cassaigne et al. introduced the cyclic complexity function c_x(n), which gives the number of cyclic ...
We introduce and study a complexity function on words cx(n), called cyclic complexity, which counts ...
International audienceWe introduce and study a complexity function on words c x (n), called cyclic c...
International audienceWe introduce and study a complexity function on words c x (n), called cyclic c...
International audienceWe introduce and study a complexity function on words c x (n), called cyclic c...
International audienceWe introduce and study a complexity function on words c x (n), called cyclic c...
International audienceWe introduce and study a complexity function on words c x (n), called cyclic c...
International audienceWe introduce and study a complexity function on words c x (n), called cyclic c...
International audienceWe introduce and study a complexity function on words $c_x(n),$ called \emph{c...
International audienceWe introduce and study a complexity function on words $c_x(n),$ called \emph{c...
International audienceWe introduce and study a complexity function on words $c_x(n),$ called \emph{c...
International audienceWe introduce and study a complexity function on words $c_x(n),$ called \emph{c...
International audienceWe introduce and study a complexity function on words c x (n), called cyclic c...
Motivated by the extension of the critical factorization theorem to infinite words, we study the (lo...
Motivated by the extension of the critical factorization theorem to infinite words, we study the (lo...
Cassaigne et al. introduced the cyclic complexity function c_x(n), which gives the number of cyclic ...
We introduce and study a complexity function on words cx(n), called cyclic complexity, which counts ...
International audienceWe introduce and study a complexity function on words c x (n), called cyclic c...
International audienceWe introduce and study a complexity function on words c x (n), called cyclic c...
International audienceWe introduce and study a complexity function on words c x (n), called cyclic c...
International audienceWe introduce and study a complexity function on words c x (n), called cyclic c...
International audienceWe introduce and study a complexity function on words c x (n), called cyclic c...
International audienceWe introduce and study a complexity function on words c x (n), called cyclic c...
International audienceWe introduce and study a complexity function on words $c_x(n),$ called \emph{c...
International audienceWe introduce and study a complexity function on words $c_x(n),$ called \emph{c...
International audienceWe introduce and study a complexity function on words $c_x(n),$ called \emph{c...
International audienceWe introduce and study a complexity function on words $c_x(n),$ called \emph{c...
International audienceWe introduce and study a complexity function on words c x (n), called cyclic c...
Motivated by the extension of the critical factorization theorem to infinite words, we study the (lo...
Motivated by the extension of the critical factorization theorem to infinite words, we study the (lo...
Cassaigne et al. introduced the cyclic complexity function c_x(n), which gives the number of cyclic ...