On the A1-invariance of K2 modeled on linear and even orthogonal groups

Abstract

Let k be an arbitrary field. In this paper we show that in the linear case (=A, ≥ 4) and even orthogonal case ( = D, ≥ 7, char(k)≠ 2) the unstable functor K2(, -) possesses the A1-invariance property in the geometric case, i. e. K2(, R[t]) = K2(, R) for a regular ring R containing k. As a consequence, the unstable K2 groups can be represented in the unstable A1-homotopy category H(k) as fundamental groups of the simply-connected Chevalley--Demazure group schemes G(,-). Our invariance result can be considered as the K2-analogue of the geometric case of Bass--Quillen conjecture. We also show for a semilocal regular k-algebra A that K2(, A) embeds as a subgroup into KM2(Frac\,A).

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