Abstract
We show that over any field$F$of characteristic 2 and 2-rank$n$, there exist$2^{n}$bilinear$n$-fold Pfister forms that have no slot in common. This answers a question of Becher [‘Triple linkage’,Ann.$K$-Theory, to appear] in the negative. We provide an analogous result also for quadratic Pfister forms.
Publisher
Cambridge University Press (CUP)
Cited by
2 articles.
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