A generalized palindromization map in free monoids

Abstract

The palindromization map in a free monoid A* was introduced in 1997 by the first author in the case of a binary alphabet A, and later extended by other authors to arbitrary alphabets. Acting on infinite words, generates the class of standard episturmian words, including standard Arnoux-Rauzy words. In this paper we generalize the palindromization map, starting with a given code X over A. The new map X maps X* to the set PAL of palindromes of A*. In this way some properties of are lost and some are saved in a weak form. When X has a finite deciphering delay one can extend X to Xω, generating a class of infinite words much wider than standard episturmian words. For a finite and maximal code X over A, we give a suitable generalization of standard Arnoux-Rauzy words, called X-AR words. We prove that any X-AR word is a morphic image of a standard Arnoux-Rauzy word and we determine some suitable linear lower and upper bounds to its factor complexity. For any code X we say that X is conservative when X(X*)⊂eq X*. We study conservative maps X and conditions on X assuring that X is conservative. We also investigate the special case of morphic-conservative maps X, i.e., maps such that φ = X φ for an injective morphism φ. Finally, we generalize X by replacing palindromic closure with θ-palindromic closure, where θ is any involutory antimorphism of A*. This yields an extension of the class of θ-standard words introduced by the authors in 2006.