Counting rational points on smooth quartic and quintic surfaces

Abstract

Let X⊂eq P3 be a smooth projective surface of degree d 4 defined over a number field K, and let NX(B) be the number of rational points of X of height at most B that do not lie on lines contained in X. Assuming a suitable hypothesis on the size of the rank of Abelian varieties, we show that NX(B)K,d, B4/3+ for any fixed >0. This improves an unconditional bound from Salberger for d=4 and d=5. The proof, based on an argument of Heath-Brown, consists of cutting X by projective planes and using a uniform version of Faltings's Theorem, due to Dimitrov, Gao, and Habegger, to bound the number of rational points on the plane sections of X. More generally, we prove that if X⊂eq Pn is a non-degenerate non-uniruled smooth projective surface defined over K, then NX(B)K,n,d,Bn+1n+.

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