Hidden automatic sequences

Abstract: An automatic sequence is a letter-to-letter coding of a fixed point of a uniform morphism. More generally, morphic sequences are letter-to-letter codings of fixed points of arbitrary morphisms. There are many examples where an, a priori, morphic sequence with a non-uniform morphism happens to be an automatic sequence. An example is the Lysënok morphism a → aca, b → d, c → b, d → c, the fixed point of which is also a 2-automatic sequence. Such an identification is useful for describing the dynamical systems gen… Show more

“…For example, the fixed point of the morphism defined on {a, b, c, d} by a → aca, b → d, c → aba, d → c (see [24,Theorem 4.1]) is not automatic. Namely, as noted in [17], the matrix of this morphism is primitive and its characteristic polynomial, which is equal to x 4 − 2x 3 − 2x 2 − x + 2, clearly has no rational root.…”

“…The lexicographically least sequence in the orbit closure of a q-automatic sequence is also q-automatic. Thus we get the following result: Theorem 27 ( [17]) Let x = (x n ) n≥0 be a sequence over some alphabet A. Let A ′ be a proper subset of A.…”

“…Remark 29 One of the referees of the paper [17] has just noted that Theorem 27 can also be deduced from Theorem A in [38]. Furthermore this approach does not need that A ′ be a proper subset of A.…”

“…Example 13 Theorem 12 was used in [17] to prove the non-automaticity of fixed points of morphisms related to Grigorchuk-like groups. For example, the fixed point of the morphism defined on {a, b, c, d} by a → aca, b → d, c → aba, d → c (see [24,Theorem 4.1]) is not automatic.…”

“…Example 28 Theorem 27 was used in [17] to prove that the two fixed points of morphisms respectively given in [26, Theorem 2.9] and [23,Theorem 4.5] are not q-automatic for any q ≥ 2, namely…”

How to prove that a sequence is not automatic

“…For example, the fixed point of the morphism defined on {a, b, c, d} by a → aca, b → d, c → aba, d → c (see [24,Theorem 4.1]) is not automatic. Namely, as noted in [17], the matrix of this morphism is primitive and its characteristic polynomial, which is equal to x 4 − 2x 3 − 2x 2 − x + 2, clearly has no rational root.…”

“…The lexicographically least sequence in the orbit closure of a q-automatic sequence is also q-automatic. Thus we get the following result: Theorem 27 ( [17]) Let x = (x n ) n≥0 be a sequence over some alphabet A. Let A ′ be a proper subset of A.…”

“…Remark 29 One of the referees of the paper [17] has just noted that Theorem 27 can also be deduced from Theorem A in [38]. Furthermore this approach does not need that A ′ be a proper subset of A.…”

“…Example 13 Theorem 12 was used in [17] to prove the non-automaticity of fixed points of morphisms related to Grigorchuk-like groups. For example, the fixed point of the morphism defined on {a, b, c, d} by a → aca, b → d, c → aba, d → c (see [24,Theorem 4.1]) is not automatic.…”

“…Example 28 Theorem 27 was used in [17] to prove that the two fixed points of morphisms respectively given in [26, Theorem 2.9] and [23,Theorem 4.5] are not q-automatic for any q ≥ 2, namely…”

How to prove that a sequence is not automatic

Automaticity and Parikh-Collinear Morphisms

Automatic Abelian Complexities of Parikh-Collinear Fixed Points