On expansions of non-abelian free groups by cosets of a finite index subgroup

Abstract

Let F be a finitely generated non-abelian free group and Q a finite quotient. Denote by LQ the language obtained by adding unary predicates Pq, q∈ Q to the language of groups. Using a slight generalization of some of the techniques involved in Zlil Sela's solution to Tarski\'s problem on the elementary theory of non-abelian free groups, we provide a few basic results on the validity of first order entences in the LQ-expansion of F in which every Pq is interpreted as the preimage of q in F. In particular we prove an analogous result to Sela's generalization of Merzlyakov's theorem on ∀∃-sentences and show that the positive theory depends only on Q and neither on the rank of F nor the particular quotient map.