Ins-Robust Primitive Words

Abstract

Let Q be the set of primitive words over a finite alphabet with at least two symbols. We characterize a class of primitive words, QI, referred to as ins-robust primitive words, which remain primitive on insertion of any letter from the alphabet and present some properties that characterizes words in the set QI. It is shown that the language QI is dense. We prove that the language of primitive words that are not ins-robust is not context-free. We also present a linear time algorithm to recognize ins-robust primitive words and give a lower bound on the number of n-length ins-robust primitive words.