Chevalley groups of polynomial rings over Dedekind domains
Abstract
Let R be a Dedekind domain, and let G be a simply connected Chevalley-Demazure group scheme of rank =>2. We prove that G(R[x1,...,xn])=G(R)E(R[x1,...,xn]) for any n=>1. This extends the corresponding results of A. Suslin and F. Grunewald, J. Mennicke, and L. Vaserstein for G=SLn, Sp2n. We also deduce some corollaries of the above result for regular rings R of higher dimension and discrete Hodge algebras over R.
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