An Eigenvalue Pinching Theorem for Compact Hypersurfaces in A Sphere

Abstract

In this article, we prove an eigenvalue pinching theorem for the first eigenvalue of the Laplacian on compact hypersurfaces in a sphere. Let (Mn,g) be a closed, connected and oriented Riemannian manifold isometrically immersed by φ into n+1. Let q>n and A>0 be some real numbers satisfying |M|1n(1+\|B\|q)≤ A. Suppose that φ(M)⊂ B(p0,R), where p0 is a center of gravity of M and radius R<π2. We prove that there exists a positive constant depending on q, n, R and A such that if n(1+\|H\|∞2)-≤ 1, then M is diffeomorphic to n. Furthermore, φ(M) is starshaped with respect to p0, Hausdorff close and almost-isometric to the geodesic sphere S\(p0,R0\), where R0=11+\|H\|∞2.