On Some Sets of Dictionaries Whose omega-Powers Have a Given Complexity

Abstract

A dictionary is a set of finite words over some finite alphabet X. The omega-power of a dictionary V is the set of infinite words obtained by infinite concatenation of words in V. Lecomte studied in [Omega-powers and descriptive set theory, JSL 2005] the complexity of the set of dictionaries whose associated omega-powers have a given complexity. In particular, he considered the sets W(0k) (respectively, W(0k), W(11)) of dictionaries V ⊂eq 2 whose omega-powers are 0k-sets (respectively, 0k-sets, Borel sets). In this paper we first establish a new relation between the sets W(02) and W(11), showing that the set W(11) is "more complex" than the set W(02). As an application we improve the lower bound on the complexity of W(11) given by Lecomte. Then we prove that, for every integer k≥ 2, (respectively, k≥ 3) the set of dictionaries W(0k+1) (respectively, W(0k+1)) is "more complex" than the set of dictionaries W(0k) (respectively, W(0k)) .