A Characterization of Morphic Words with Polynomial Growth

Abstract

A morphic word is obtained by iterating a morphism to generate an infinite word, and then applying a coding. We characterize morphic words with polynomial growth in terms of a new type of infinite word called a zigzag word. A zigzag word is represented by an initial string, followed by a finite list of terms, each of which repeats for each n ≥ 1 in one of three ways: it grows forward [t(1)\ t(2)\ …m\ t(n)], backward [t(n)\ …m\ t(2)\ t(1)], or just occurs once [t]. Each term can recursively contain subterms with their own forward and backward repetitions. We show that an infinite word is morphic with growth (nk) iff it is a zigzag word of depth k. As corollaries, we obtain that the morphic words with growth O(n) are exactly the ultimately periodic words, and the morphic words with growth O(n2) are exactly the multilinear words.