On triharmonic hypersurfaces in space forms

Abstract

In this paper we study triharmonic hypersurfaces immersed in a space form Nn+1(c). We prove that any proper CMC triharmonic hypersurface in the sphere Sn+1 has constant scalar curvature; any CMC triharmonic hypersurface in the hyperbolic space Hn+1 is minimal. Moreover, we show that any CMC triharmonic hypersurface in the Euclidean space Rn+1 is minimal provided that the multiplicity of the principal curvature zero is at most one. In particular, we are able to prove that every CMC triharmonic hypersurface in the Euclidean space R6 is minimal.These results extend some recent works due to Montaldo-Oniciuc-Ratto and Chen-Guan, and give affirmative answer to the generalized Chen's conjecture.