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On quadratic forms of height two and a theorem of Wadsworth

Authors:	Detlev W Hoffmann

Institution:	Aindorferstr. 84, D-80689 Munich, Germany

Abstract:	Let $\varphi$ and $\psi$ be anisotropic quadratic forms over a field of characteristic not . Their function fields $F(% \varphi )$ and $F(\psi )$ are said to be equivalent (over ) if $% \varphi \otimes F(\psi )$ and $\psi \otimes F(% \varphi )$ are isotropic. We consider the case where $\dim % \varphi =2^n$ and $% \varphi$ is divisible by an -fold Pfister form. We determine those forms $\psi$ for which $% \varphi$ becomes isotropic over $F(\psi )$ if $n\leq 3$ , and provide partial results for $n\geq 4$ . These results imply that if $F(% \varphi )$ and $F(\psi )$ are equivalent and $\dim % \varphi =\dim \psi$ , then $% \varphi$ is similar to $\psi$ over . This together with already known results yields that if $% \varphi$ is of height and degree or , and if $\dim % \varphi =\dim \psi$ , then $F(% \varphi )$ and $F(\psi )$ are equivalent iff $F(% \varphi )$ and $F(\psi )$ are isomorphic over .

Keywords:	Quadratic forms of height 2 function fields of quadratic forms equivalence of function fields isomorphism of function fields

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