Generalized Thue-Morse words and palindromic richness

Abstract

We prove that the generalized Thue-Morse word tb,m defined for b ≥ 2 and m ≥ 1 as tb,m = (sb(n) m)n=0+∞, where sb(n) denotes the sum of digits in the base-b representation of the integer n, has its language closed under all elements of a group Dm isomorphic to the dihedral group of order 2m consisting of morphisms and antimorphisms. Considering simultaneously antimorphisms ∈ Dm, we show that tb,m is saturated by -palindromes up to the highest possible level. Using the terminology generalizing the notion of palindromic richness for more antimorphisms recently introduced by the author and E. Pelantov\'a, we show that tb,m is Dm-rich. We also calculate the factor complexity of tb,m.