Eventual tightness of projective dimension growth bounds: quadratic in the degree

Abstract

In projective dimension growth results, one bounds the number of rational points of height at most H on an irreducible hypersurface in Pn of degree d>3 by C(n)d2 Hn-1( H)M(n), where the quadratic dependence in d has been recently obtained by Binyamini, Cluckers and Kato in 2024 [1]. For these bounds, it was already shown by Castryck, Cluckers, Dittmann and Nguyen in 2020 [3] that one cannot do better than a linear dependence in d. In this paper we show that, for the mentioned projective dimension growth bounds, the quadratic dependence in d is eventually tight when n grows. More precisely the upper bounds cannot be better than c(n)d2-2/n Hn-1 in general. Note that for affine dimension growth (for affine hypersurfaces of degree d, satisfying some extra conditions), the dependence on d is also quadratic by [1], which is already known to be optimal by [3]. Our projective case thus complements the picture of tightness for dimension growth bounds for hypersurfaces.