Elementary Action of Classical Groups on Unimodular Rows Over Monoid Rings

Abstract

The elementary action of symplectic and orthogonal groups on unimodular rows of length 2n is transitive for 2n ≥ (4, d+2) in the symplectic case, and 2n ≥ (6, 2d+4) in the orthogonal case, over monoid rings R[M], where R is a commutative noetherian ring of dimension d, and M is commutative cancellative torsion free monoid. As a consequence, one gets the surjective stabilization bound for the K1 for classical groups. This is an extension of J. Gubeladze's results for linear groups.

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