Stability of submanifolds with parallel mean curvature in calibrated manifolds

Abstract

On a Riemannian manifold Mm+n with an (m+1)-calibration , we prove that an m-submanifold M with constant mean curvature H and calibrated extended tangent space RH TM is a critical point of the area functional for variations that preserve the enclosed -volume. This recovers the case described by Barbosa, do Carmo and Eschenburg, when n=1 and is the volume element of M. To the second variation we associate an -Jacobi operator and define -stablility. Under natural conditions, we prove that the Euclidean m-spheres are the unique -stable submanifolds of Rm+n. We study the -stability of geodesic m-spheres of a fibred space form Mm+n with totally geodesic (m+1)-dimensional fibres.