Elekes-Szab\'o for collinearity on cubic surfaces
Abstract
We study the orchard problem on cubic surfaces. We classify possibly reducible cubic surfaces X⊂eq P3() with smooth components on which there exist families of finite sets (of unbounded size) with quadratically many 3-rich lines which do not concentrate (in a natural sense) on any projective plane. Namely, we prove that such a family exists precisely when X is a union of three planes sharing a common line. Along the way, we obtain a general result about nilpotency of groups admitting an algebraic action satisfying an Elekes-Szab\'o condition, and we prove the following purely algebrogeometric statement: if the composition of four Geiser involutions through sufficiently generic points a,b,c,d on a smooth irreducible cubic surface has infinitely many fixed points, then a single plane contains a,b,c,d and all but finitely many of the fixed points.
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