Variational characterizations of -submanifolds in the Eulicdean space m+p

Abstract

-submanifold in the Euclidean space m+p is a natural extension of the concept of self-shrinker to the mean curvature flow in m+p. It is also a generalization of the λ-hypersurface defined by Q.-M. Cheng et al to arbitrary codimensions. In this paper, some characterizations for -submanifolds are established. First, it is shown that a submanifold in m+p is a -submanifold if and only if its modified mean curvature is parallel when viewed as a submanifold in the Gaussian space (m+p,e-|x|2m·,·); Then, two weighted volume functionals V and V are introduced and it is proved that -submanifolds can be characterized as the critical points of these two functionals; Also, the corresponding second variation formulas are computed and the (W-)stability properties for -submanifolds are systematically studied. In particular, it is proved that m-planes are the only properly immersed, complete W-stable -submanifolds with flat normal bundle under a technical condition. It would be interesting if this additional restriction could be removed.