Cylinder type and p-divisible sets in Fp3
Abstract
A set of points S ⊂eq Fpn is called p-divisible if every affine hyperplane in Fpn intersects S in 0 p points. The Strong Cylinder Conjecture of Ball asserts that if S is a p-divisible set of p2 points in Fp3, then S is a cylinder. In this paper, we show that every p-divisible multiset S is both a Fp-linear and Z-linear combination of characteristic functions of cylinders. In addition, the multisets of size p2 are -linear combinations of a plane and weighted differences of parallel lines.
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