On a question of Davenport and diagonal cubic forms over Fq(t)

Abstract

Given a non-singular diagonal cubic hypersurface X⊂Pn-1 over Fq(t) with char (Fq)≠ 3, we show that the number of rational points of height at most |P| is O(|P|3+) for n=6 and O( P 2+) for n=4. In fact, if n=4 and char(Fq) >3 we prove that the number of rational points away from any rational line contained in X is bounded by O(|P|3/2+). From the result in 6 variables we deduce weak approximation for diagonal cubic hypersurfaces for n≥ 7 over Fq(t) when char(Fq)>3 and handle Waring's problem for cubes in 7 variables over Fq(t) when char(Fq)≠ 3. Our results answer a question of Davenport regarding the number of solutions of bounded height to x13+x23+x33 = x43+x53+x63 with xi ∈ Fq[t].