Isometries and Collineations of the Cayley Surface
Abstract
Let F be Cayley's ruled cubic surface in a projective three-space over any commutative field K. We determine all collineations fixing F, as a set, and all cubic forms defining F. For both problems the cases |K|=2,3 turn out to be exceptional. On the other hand, if |K|≥ 4 then the set of simple points of F can be endowed with a non-symmetric distance function. We describe the corresponding circles, and we establish that each isometry extends to a unique projective collineation of the ambient space.
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