Regular bi-interpretability and finite axiomatizability of Chevalley groups
Abstract
In this paper we consider Chevalley groups over commutative rings with~1, constructed by irreducible root systems of rank >1. We always suppose that for the systems A2, B, C, F4, G2 our rings contain 1/2 and for the system G2 also 1/3. Under these assumptions we prove that the central quotients of Chevalley groups are regularly bi-interpretable with the corresponding rings, the class of all central quotients of Chevalley groups of a given type is elementarily definable and even finitely axiomatizable (see Definition~2.2). The same holds for adjoint Chevalley groups and for bondedly generated Chevalley groups. We also give an example of Chevalley group with infinite center, which is not bi-interpretable with the corresponding ring and is elementarily equivalent to a group that is not a Chevalley group itself.
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