Eva Bayer-Fluckiger, Nivedita Bhaskhar, Raman Parimala
Published 2013-05-14Version 1
Let k be a global field of characteristic not 2. The classical Hasse-Minkowski theorem states that if two quadratic forms become isomorphic over all the completions of k, then they are isomorphic over k as well. It is natural to ask whether this is also true for G-quadratic forms, where G is a finite group. In the case of number fields the Hasse principle for G-quadratic forms does not hold in general, as shown by Jorge Morales. The aim of this paper is to study this question when k is a global field of positive characteristic. We give a sufficient criterion for the Hasse principle to hold, and also counter examples : note that these are of different nature than those for number fields.
Comments: To appear in Documenta Mathematica
Failure of the Hasse principle for Chatelet surfaces in characteristic 2
A comparison of L-groups for covers of split reductive groups
Interpolation of hypergeometric ratios in a global field of positive characteristic
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