On the asymptotic behavior of Einstein manifolds with an integral bound on the Weyl curvature

Abstract

In this paper we consider the geometric behavior near infinity of some Einstein manifolds (Xn, g) with Weyl curvature belonging to a certain Lp space. Namely, we show that if (Xn, g), n ≥ 7, admits an essential set and has its Weyl curvature in Lp for some 1<p<n-12, then (Xn, g) must be asymptotically locally hyperbolic. One interesting application of this theorem is to show a rigidity result for the hyperbolic space under an integral condition for the curvature.