Combinatorial Properties of primitive words with Non-primitive Product

Abstract

Let A be an alphabet of size n 2. In this paper, we give a complete description of primitive words p≠ q over an alphabet A of size n≥2 such that pq is non-primitive and |p|=2|q|. In particular, if l is s a positive integer, we count the cardinality of the set E(l,A) of all couples (p,q) of primitive words such that |p|=2|q|=2l and pq is non-primitive. Then we give a combinatorial formula for this cardinality and its asymptotic behavior, as l or n goes to infinity.