Extremal Eigenvalues Of The Conformal Laplacian Under Sire-Xu Normalization

Abstract

Let (Mn,g) be a closed Riemannian manifold of dimension n 3. We study the variational properties of the k-th eigenvalue functional g∈[g] λk(L g) under a non-volume normalization proposed by Sire-Xu. We discuss necessary conditions for the existence of extremal eigenvalues under such normalization. Also, we discuss the general existence problem when k=1.