RT - Journal Article
T1 - $L_1$-Biharmonic Hypersurfaces in Euclidean Spaces with Three Distinct Principal Curvatures
JF - IJMSI
YR - 2018
JO - IJMSI
VO - 13
IS - 2
UR - http://ijmsi.ir/article-1-816-en.html
SP - 59
EP - 70
K1 - Linearized operators $L_r$
K1 - $L_1$-biharmonic hypersurfaces
K1 - $1$-minimal
AB - Chen's biharmonic conjecture is well-known and stays open: The only biharmonic submanifolds of Euclidean spaces are the minimal ones. In this paper, we consider an advanced version of the conjecture, replacing $Delta$ by its extension, $L_1$-operator ($L_1$-conjecture). The $L_1$-conjecture states that any $L_1$-biharmonic Euclidean hypersurface is 1-minimal. We prove that the $L_1$-conjecture is true for $L_1$-biharmonic hypersurfaces with three distinct principal curvatures and constant mean curvature of a Euclidean space of arbitrary dimension.
LA eng
UL http://ijmsi.ir/article-1-816-en.html
M3
ER -