Non-Stable K1-Functors of Discrete Valuation Rings Containing a Field
Abstract
Let k be a field, and let G be a simply connected semisimple k-group which is isotropic and contains a strictly proper parabolic k-subgroup P. Let D be a discrete valuation ring which is a local ring of a smooth algebraic curve over k. Let K be the fraction field of D. We show that the corresponding non-stable K1-functor (for G and P, also called the Whitehead group of G) coincide over D and K. As a consequence, KG1 (D) coincides with the (generalized) Manin's R-equivalence class group of G(D).
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