Triple Linkage of Quadratic Pfister Forms
Abstract
Given a field F of characteristic 2, we prove that if every three quadratic n-fold Pfister forms have a common quadratic (n-1)-fold Pfister factor then Iqn+1 F=0. As a result, we obtain that if every three quaternion algebras over F share a common maximal subfield then u(F) is either 0,2 or 4. We also prove that if F is a nonreal field with char(F) ≠ 2 and u(F)=4, then every three quaternion algebras share a common maximal subfield.
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