Conformal-biharmonic hypersurfaces in spheres and product spaces

Abstract

The conformal-bienergy functional E2c is a modified version of the classical bienergy functional E2 and it is conformally invariant in the case of a four-dimensional domain. The critical points of E2c are called conformal-biharmonic and denoted c-biharmonic. In the first part of the paper we study the c-biharmonic hypersurfaces Mm with constant principal curvatures in the product space Lm() × R , where Lm() denotes a space form of constant sectional curvature . Specifically, we demonstrate that Mm is either totally geodesic or a cylindrical hypersurface of the form Mm-1 × R , where Mm-1 is an iso\-parametric c-biharmonic hypersurface in Lm() . In the second part of this article we obtain a full description of isoparametric c-biharmonic hypersurfaces in Sm+1 and a complete classification of c-biharmonic hypersurfaces with constant scalar curvature in Sm+1, m=2,3 and m=4 with an additional assumption. In this context, we shall also prove a global result for compact c-biharmonic immersions in S5. In the final part of the paper, as a preliminary effort to understand c-biharmonic hypersurfaces in Lm() × R with non-constant mean curvature, we establish that a totally umbilical c-biharmonic hypersurface must necessarily be totally geodesic.

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