Maximum number of Fq-rational points on nonsingular threefolds in P4
Abstract
We determine the maximum number of Fq-rational points that a nonsingular threefold of degree d in a projective space of dimension 4 defined over Fq may contain. This settles a conjecture by Homma and Kim concerning the maximum number of points on a hypersurface in a projective space of even dimension in this particular case.
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