Counting rational points on cubic hypersurfaces
Abstract
Let X be a geometrically integral projective cubic hypersurface defined over the rationals, with dimension D and singular locus of dimension at most D-4. For any ε>0, we show that X contains O(BD+ε) rational points of height at most B. The implied constant in this estimate depends upon the choice of ε and the coefficients of the cubic form defining X.
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