Biharmonic hypersurfaces with three distinct principal curvatures in spheres

Abstract

We obtain a complete classification of proper biharmonic hypersurfaces with at most three distinct principal curvatures in sphere spaces with arbitrary dimension. Precisely, together with known results of Balmus-Montaldo-Oniciuc, we prove that compact orientable proper biharmonic hypersurfaces with at most three distinct principal curvatures in sphere spaces Sn+1 are either the hypersphere Sn(1/2) or the Clifford hypersurface Sn1(1/2)× Sn2(1/2) with n1+n2=n and n1≠ n2. Moreover, we also show that there does not exist proper biharmonic hypersurface with at most three distinct principal curvatures in hyperbolic spaces Hn+1.