Compactness of Conformal Metrics with \(Lp\)-Bounded \(Q\)-Curvature on Closed Smooth Riemannian Manifolds

Abstract

Let \((Mn,g)\) be a smooth closed Riemannian manifold of dimension \(n 5\) with positive Yamabe invariant and semi-positive \(Q\)-curvature. We establish a precompactness result in the \(Cα\)-H\"older topologie on the space of Riemannian metrics, for some \(α>0\), for the set of metrics \(g\) conformal to \(g\), with volume equal to that of the standard sphere \(Sn\), whose \(Q\)-curvature is nonnegative and uniformly bounded in \(Lp(M,g)\) for some \(p > n4\), and whose first positive eigenvalue of the Laplace-Beltrami operator satisfies \( λ1(M,g) n + 1 \) for some positive constant \(\).