Types of Linkage of Quadratic Pfister Forms

Abstract

Given a field F of positive characteristic p, θ ∈ Hpn-1(F) and β,γ ∈ F×, we prove that if the symbols θ d ββ and θ d γγ in Hpn(F) share the same factors in Hp1(F) then the symbol θ d ββ d γγ in Hpn+1(F) is trivial. We conclude that when p=2, every two totally separably (n-1)-linked n-fold quadratic Pfister forms are inseparably (n-1)-linked. We also describe how to construct non-isomorphic n-fold Pfister forms which are totally separably (or inseparably) (n-1)-linked, i.e. share all common (n-1)-fold quadratic (or bilinear) Pfister factors.