The power-saving Manin-Peyre's conjectures for a senary cubic

Abstract

Using recent work of the first author~Bet, we prove a strong version of the Manin-Peyre's conjectures with a full asymptotic and a power-saving error term for the two varieties respectively in P2 × P2 with bihomogeneous coordinates [x1:x2:x3],[y1:y2,y3] and in P1× P1 × P1 with multihomogeneous coordinates [x1:y1],[x2:y2],[x3:y3] defined by the same equation x1y2y3+x2y1y3+x3y1y2=0. We thus improve on recent work of Blomer, Br\"udern and Salberger BBS and provide a different proof based on a descent on the universal torsor of the conjectures in the case of a del Pezzo surface of degree 6 with singularity type A1 and three lines (the other existing proof relying on harmonic analysis CLT). Together with~Blomer2014 or with recent work of the second author Dest2, this settles the study of the Manin-Peyre's conjectures for this equation.