Existence of multiple closed CMC hypersurfaces with small mean curvature

Abstract

Let (Mn+1,g) be a closed Riemannian manifold, n+1≥ 3. We will prove that for all m ∈ N, there exists c*(m)>0, which depends on g, such that if 0<c<c*(m), (M,g) contains at least m many closed c-CMC hypersurfaces with optimal regularity. More quantitatively, there exists a constant γ0, depending on g, such that for all c>0, there exist at least γ0c-1n+1 many closed c-CMC hypersurfaces (with optimal regularity) in (M,g). This extends the theorem of Zhou and Zhu, where they proved the existence of at least one closed c-CMC hypersurface in (M,g).