A decidable expansion of (,+,F) with the independence property
Abstract
Let (,+,F) be a finitely generated Z[F]-module where F is an injective endomorphism of the abelian group . We restrict ourselves to a finite automa presentable subclass, introduced by J. Bell and R. Moosa in "F-sets and finite automata. J. Th\'eor. Nombres Bordeaux 31 (2019), no. 1, 101-130" and define an expansion containing the F-sets defined by R. Moosa and T. Scanlon in "Am. J. Math. 126 (2004), no. 3, p. 473-522", where every automatic subset is definable.
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