Burt Totaro
Published 2006-08-03Version 1
We determine the automorphism group for a large class of affine quadric hypersurfaces over a field, viewed as affine algebraic varieties. In particular, we find that the group of real polynomial automorphisms of the n-sphere is just the orthogonal group O(n+1) whenever n is a power of 2. It is not known whether the same is true for arbitrary n. The proof uses Karpenko's theorem that certain projective quadrics over a field are not ruled. That is, they are not birational over the given field to the product of any variety with the projective line. We also formulate a general result on automorphisms of affine varieties. We conclude by conjecturing a converse to Karpenko's theorem, predicting exactly which projective quadrics are ruled.
Comments: 9 pages, to appear in Math. Proc. Camb. Phil. Soc
The automorphism group of a rigid affine variety
Is the affine space determined by its automorphism group?
Problems from the workshop on "Automorphisms of Curves" (Leiden, August, 2004)
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