An application of random plane slicing to counting Fq-points on hypersurfaces
Abstract
Let X be an absolutely irreducible hypersurface of degree d in An, defined over a finite field Fq. The Lang-Weil bound gives an interval that contains #X(Fq). We exhibit explicit intervals, which do not contain #X(Fq), and which overlap with the Lang-Weil interval. In particular, we sharpen the best known lower and upper bounds for #X(Fq). The proof uses a combinatorial probabilistic technique.
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