Title of article :
Proper Lk-biharmonic Hypersurfaces in The Euclidean Sphere with Two Principal Curvatures
Author/Authors :
Aminian ، Mehran DEPARTMENT OF MATHEMATICS - Rafsanjan University of Vali-e-Asr , Namjoo ، Mehran DEPARTMENT OF MATHEMATICS - Rafsanjan University of Vali-e-Asr
Abstract :
In this paper we classify proper Lk-biharmonic hypersurfaces M, in the unit Euclidean sphere should have two principal curvatures and we show that they are open pieces of standard products of spheres. Also we study proper Lk- biharmonic compact hypersurfacesM with respect to tr(S² o Pk) and Hk where S is the shape operator, Pk is the Newton transformation and Hk is the k-th mean curvature ofM, and by definiteness assumption of Pk, we show that Hk+1 is constant.
Keywords :
Lk operator , biharmonic hypersurfaces , Chen conjecture
Journal title :
Journal of Mahani Mathematical Research Center
Journal title :
Journal of Mahani Mathematical Research Center
