Milnor-Witt motivic cohomology and linear algebraic groups

Abstract

This article presents two key computations in MW-motivic cohomology. Firstly, we compute the MW-motivic cohomology of the symplectic groups Sp2n for any n∈N using the Sp-orientation and the associated Borel classes. Secondly, following the classical computations and using the analogue in A1-homotopy of the Leray spectral sequence, we compute the η-inverted MW-motivic cohomology of general Stiefel varieties, obtaining in particular the computation of the η-inverted MW-motivic cohomology of the general linear groups GLn and the special linear groups SLn for any n∈N. Finally, we determine the multiplicative structures of these total cohomology groups.