On finite and elementary generation of SL2(R)

Abstract

Motivated by a question of A. Rapinchuk concerning general reductive groups, we are investigating the following question: Given a finitely generated integral domain R with field of fractions F, is there a finitely generated subgroup of SL2(F) containing SL2(R)? We shall show in this paper that the answer to this question is negative for any polynomial ring R of the form R = R0[s,t], where R0 is a finitely generated integral domain with infinitely many (non--associate) prime elements. The proof applies Bass--Serre theory and reduces to analyzing which elements of SL2(R) can be generated by elementary matrices with entries in a given finitely generated R--subalgbra of F. Using Bass--Serre theory, we can also exhibit new classes of rings which do not have the GE2 property introduced by P.M. Cohn.