On complete hypersurfaces with constant mean and scalar curvatures in Euclidean spaces

Abstract

Generalizing a theorem of Huang, Cheng and Wan classified the complete hypersurfaces of R4 with non-zero constant mean curvature and constant scalar curvature. In our work, we obtain results of this nature in higher dimensions. In particular, we prove that if a complete hypersurface of R5 has constant mean curvature H≠ 0 and constant scalar curvature R≥23H2, then R=H2, R=89H2 or R=23H2. Moreover, we characterize the hypersurface in the cases R=H2 and R=89H2, and provide an example in the case R=23H2. The proofs are based on the principal curvature theorem of Smyth-Xavier and a well known formula for the Laplacian of the squared norm of the second fundamental form of a hypersurface in a space form.