Existence of multiple constant mean curvature hypersurfaces for varying Riemannian metrics

Abstract

Given a closed Riemannian manifold (Mn+1,g),3≤ n+1≤7.In this paper,we will prove that for any c>0,suppose the number of closed c-CMC hypersurfaces is finite,then there exists a metric h on M such that the c-CMC hypersurfaces in (M,g) are also c-CMC hypersurfaces in (M,h) and the number of c-CMC hypersurfaces in (M,h) is strictly greater than the number of c-CMC hypersurfaces in (M,g).Moreover,we will give a precise upper bound for the Ln+12 norm of (g-h),which depends on the metric g and the number of c-CMC hypersurfaces in (M,g).

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