The Existence of G-Invariant constant mean curvature Hypersurfaces

Abstract

In this paper, we consider a closed Riemannian manifold Mn+1 with dimension 3≤ n+1≤ 7, and a compact Lie group G acting as isometries on M with cohomogeneity at least 3. Suppose the union of non-principal orbits M Mreg is a smooth embedded submanifold of M without boundary and dim(M Mreg)≤ n-2 . Then for any c∈R, we show the existence of a nontrivial, smooth, closed, G-equivariant almost embedded G-invariant hypersurface n of constant mean curvature c.