Languages invariant under more symmetries: overlapping factors versus palindromic richness

Abstract

Factor complexity C and palindromic complexity P of infinite words with language closed under reversal are known to be related by the inequality P(n) + P(n+1) ≤ 2 + C(n+1)-C(n) for any n∈ N\,. Word for which the equality is attained for any n is usually called rich in palindromes. In this article we study words whose languages are invariant under a finite group G of symmetries. For such words we prove a stronger version of the above inequality. We introduce notion of G-palindromic richness and give several examples of G-rich words, including the Thue-Morse sequence as well.