On the splitting principle for cohomological invariants of reflection groups

Abstract

Let k0 be a field and W a finite orthogonal reflection group over k0. We prove Serre's splitting principle for cohomological invariants of W with values in Rost's cycle modules (over k0) if the characteristic of k0 is coprime to |W|. We then show that this principle for such groups holds also for Witt- and Milnor-Witt K-theory invariants.