Improved injective stability for relative K1Sp-groups

Abstract

We prove a relative version of Vorst's theorem concerning the equality of the group of all invertible matrices and the group of all elementary matrices over R[X] with respect to an ideal I⊂ R such that R/I is regular, where R is a regular k-spot. We then introduce a relative version of the symplectic elementary Witt group and show that it fits into a relative version of the Karoubi periodicity sequence. Combining these results, we improve the existing injective stability bounds for relative linear and symplectic K1-groups of smooth affine algebras over various base fields.