La conjecture de Manin pour une famille de vari\'et\'es en dimension sup\'erieure

TL;DR

This paper proves Manin's conjecture in its strong form for a family of higher-dimensional projective varieties defined by a specific symmetric equation, extending previous work through a novel method inspired by La Bretèche.

Contribution

It generalizes existing methods to establish Manin's conjecture for an infinite family of higher-dimensional varieties, using a new approach based on unique factorization.

Findings

Proves Manin's conjecture for the specified family of varieties.

Extends previous results to higher dimensions.

Introduces a novel method inspired by La Bretèche.

Abstract

Inspired by a method of La Bret\`eche relying on some unique factorisation, we generalize work of Blomer, Br\"udern, and Salberger to prove Manin's conjecture in its strong form conjectured by Peyre for some infinite family of varieties of higher dimension. The varieties under consideration in this paper correspond to the projective varieties defined by the following equation $$ x_1 y_2y_3\cdots y_n+x_2y_1y_3 \cdots y_n+ \cdots+x_n y_1 y_2 \cdots y_{n-1}=0. $$ in $\mathbb{P}^{2n-1}_{\mathbb{Q}}$ for all $n \geqslant 3$. This paper comes with an Appendix by Per Salberger.