Spectre et g\'eom\'etrie conforme des vari\'et\'es compactes \`a bord

Abstract

We prove that on any compact manifold Mn with boundary, there exist a conformal class C such that for any riemannian metric g∈ C, λ1(Mn,g)Vol(Mn,g)2/n< n.Vol(Sn,gcan)2/n and σ1(M,g,) M(∂ M)Vol(M)2-nn<n.Vol(Sn,gcan)2/n, where λ1(Mn,g) denotes the first positive eigenvalue of the Neumann laplacian on (M,g), σ1(M,g,) the first positive Steklov eigenvalue for the density on ∂ M, and M(∂ M)=∫∂ M dvg. The proof relies on a handle decomposition of the manifold. We also prove that the conformal volume of (M,C) is Vol(Sn,gcan), and that the Friedlander-Nadirashvili and the M\"obius volume of M are equal to those of the sphere. If M is a domain in a space form, C is the conformal class of the canonical metric.