A cohomological invariant for algebras of degree 8 and exponent 2 in characteristic 2

Abstract

Our aim in this paper is to extend a work of Sivatski to characteristic 2. More precisely, for F a field of characteristic 2 and a central simple algebra A of exponent 2 that splits over a triquadratic extension of F of separability degree at least 4, we attach a cohomological invariant ∈v(A) ∈ H23(F) / G, where H23(F) is the third Kato-Milno cohomology group and G is a subgroup of H23(F) divisible by the Brauer class of A. As an application, we will relate the decomposability of the algebra in degree 8 to the vanishing of ∈v(A). Moreover, we will use this invariant to prove some descent results for central simple algebras and quadratic forms over biquadratic extensions.