Croissance asymptotique de nombres de Weil appartenant \`a un corps de nombres fix\'e

Abstract

We prove an asymptotic formula as x +∞ for the number of algebraic integers α belonging to a fixed CM number field and satisfying αα≤ x. This problem is related to the height zeta function Zh(XK,s) associated to the anticanonical class of a certain toric variety XK over Q and we show that Zh(XK,s) has a meromorphic continuation to the half-plane \(s)>12\ where it is holomorphic except at s=1. Along the way we obtain a new proof of Manin's conjecture on the asymptotic growth of points on XK(Q) of bounded height.