On third homology of SL2 and weak homotopy invariance

Abstract

The goal of the paper is to achieve - in the special case of the linear group SL2 - some understanding of the relation between group homology and its A1-invariant replacement. We discuss some of the general properties of A1-invariant group homology, such as stabilization sequences and Grothendieck-Witt module structures. Together with very precise knowledge about refined Bloch groups, these methods allow to deduce that in general there is a rather large difference between group homology and its A1-invariant version. In other words, weak homotopy invariance fails for SL2 over many families of non-algebraically closed fields.