Abstract. In the algebraic theory of codes and formal languages, the set Q of all primitive words over some alphabet Σ has received special inter-est. With this survey article we give an overview about relevant research to this topic during the last twenty years including own investigations and some new results. In Section 1 after recalling the most important notions from formal language theory we illustrate the connection between coding theory and primitive words by some facts. We define primitive words as words having only a trivial representation as the power of another word. Nonprimitive words (without the empty word) are exactly the periodic words. Every nonempty word is a power of an uniquely determined prim-itive word which is called...
For those regular and context-free languages, which consist only of palindromic words, there exist f...
If L is a language, the automaticity function AL(n) (resp. NL(n)) of L counts the number of states o...
A word p, over the alphabet of variables E, is a pattern of a word w over A if there exists a non-er...
AbstractA word is primitive if it is not a proper power of a shorter word. We prove that the set Q o...
Primitive word is a word that can not be represented by any repetition of shorter words. Since every...
For any language L over an alphabet X, we define the root set, root(L) and the degree set, deg(L) as...
Let be an alphabet of size n ≥ 2. Our goal in this paper is to give a complete description of primi...
Given a (finite or infinite) subset X of the free monoid A∗ over a finite alphabet A, the rank of X ...
Given a (finite or infinite) subset X of the free monoid A⁎ over a finite alphabet A, the rank of X ...
AbstractPrimitive words, or strings over a finite alphabet that cannot be written as a power of anot...
peer reviewedWe investigate Abelian primitive words, which are words that are not Abelian powers. We...
AbstractIn this paper we prove that the language of all primitive (strongly primitive) words over a ...
This work presents an algebraic method, based on rational transductions, to study the sequential and...
Based on the general operation of words, called bw_operation, the notions of primitive words, close...
A word is primitive if it is not a proper power of a shorter word. A Lyndon word is a primitive word...
For those regular and context-free languages, which consist only of palindromic words, there exist f...
If L is a language, the automaticity function AL(n) (resp. NL(n)) of L counts the number of states o...
A word p, over the alphabet of variables E, is a pattern of a word w over A if there exists a non-er...
AbstractA word is primitive if it is not a proper power of a shorter word. We prove that the set Q o...
Primitive word is a word that can not be represented by any repetition of shorter words. Since every...
For any language L over an alphabet X, we define the root set, root(L) and the degree set, deg(L) as...
Let be an alphabet of size n ≥ 2. Our goal in this paper is to give a complete description of primi...
Given a (finite or infinite) subset X of the free monoid A∗ over a finite alphabet A, the rank of X ...
Given a (finite or infinite) subset X of the free monoid A⁎ over a finite alphabet A, the rank of X ...
AbstractPrimitive words, or strings over a finite alphabet that cannot be written as a power of anot...
peer reviewedWe investigate Abelian primitive words, which are words that are not Abelian powers. We...
AbstractIn this paper we prove that the language of all primitive (strongly primitive) words over a ...
This work presents an algebraic method, based on rational transductions, to study the sequential and...
Based on the general operation of words, called bw_operation, the notions of primitive words, close...
A word is primitive if it is not a proper power of a shorter word. A Lyndon word is a primitive word...
For those regular and context-free languages, which consist only of palindromic words, there exist f...
If L is a language, the automaticity function AL(n) (resp. NL(n)) of L counts the number of states o...
A word p, over the alphabet of variables E, is a pattern of a word w over A if there exists a non-er...