Large orbits on Markoff-type K3 surfaces over finite fields
Abstract
We study the surface Wk : x2 + y2 + z2 + x2 y2 z2 = k x y z in (P1)3, a tri-involutive K3 (TIK3) surface. We explain a phenomenon noticed by Fuchs, Litman, Silverman, and Tran: over a finite field of order 1 mod 8, the points of W4 do not form a single large orbit under the group generated by the three involutions fixing two variables and a few other obvious symmetries, but rather admit a partition into two -invariant subsets of roughly equal size. The phenomenon is traced to an explicit double cover of the surface.
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