Embedded constant mth mean curvature hypersurfaces on spheres
Abstract
In this paper, we study n-dimensional hypersurfaces with constant mth mean curvature Hm in a unit sphere Sn+1(1) and prove that if the mth mean curvature Hm takes value between 1( πk)m and k2-2n(k2+m-2n-m)m-22 for 1≤ m≤ n-1 and any integer k≥ 2, then there exists at least one n-dimensional compact nontrivial embedded hypersurface with constant Hm>0 in Sn+1(1). When m=1, our results reduce to the results of Perdomo [P]; when m=2 and m=4, our results reduce to the results of Cheng-Li-Wei [WCL].
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