Compactness of isospectral conformal metrics on 4-manifolds

Abstract

Let a sequence of conformal Riemannian metrics \gk=uk2g0\ be isospectral to g0 over a compact boundaryless smooth 4-dimension manifold (M,g0). We prove that the subsequence of conformal factors \uk\ converges to u weakly in W2,ploc(M S) for some p<2, where S is a finite set of points and u∈ W2,p(M,g0). Moreover, if the isospectral invariant ∫M R(gk)dVgk6Vol(M,gk) is strictly smaller than the Yamabe constant of the standard sphere S4, then the subsequence of distance functions \dk\ defined by \gk\ uniformly converges to du and the subsequence of metric spaces \(M,dk)\ converges to the metric space (M,du) in the Gromov-Hausdorff topology, where du is the distance function defined by u2g0.