Regular bi-interpretability of Chevalley groups over local rings

Abstract

In this paper we prove that if G(R)=Gπ (,R) (E(R)=Eπ(, R)) is an (elementary) Chevalley group of rank > 1, R is a local ring (with 12 for the root systems A2, Bl, Cl, F4, G2 and with 13 for G2), then the group G(R) (or (E(R)) is regularly bi-interpretable with the ring~R. As a consequence of this theorem, we show that the class of all Chevalley groups over local rings (with the listed restrictions) is elementary definable, i.\,e., if for an arbitrary group~H we have H Gπ(, R), than there exists a ring R' R such that H Gπ(,R').