On the critical points of the energy functional on vector fields of a Riemannian manifold

Abstract

Given a compact Lie subgroup G of the isometry group of a compact Riemannian manifold M with a Riemannian connection ∇, it is introduced a G-symmetrization process of a vector field of M and it is proved that the critical points of the energy functional \[ F(X):=∫M ∇ X 2dM∫M X 2dM% \] on the space of \ G-invariant vector fields are critical points of F on the space of all vector fields of M, and that this inclusion may be strict in general. One proves that the infimum of F on S3 is not assumed by a S3-invariant vector field. It is proved that the infimum of F on a sphere Sn, n≥2, of radius 1/k, is k2, and is assumed by a vector field invariant by the isotropy subgroup of the isometry group of Sn at any given point of S% n. It is proved that if G is a compact Lie subgroup of the isometry group of a compact rank 1 symmetric space M which leaves pointwise fixed a totally geodesic submanifold of dimension bigger than or equal to 1 then all the critical points of F are assumed by a G-invariant vector field. Finally, it is obtained a characterization of the spheres by proving that on a certain class of Riemannian compact manifolds M that contains rotationally symmetric manifolds and rank 1 symmetric spaces, with positive Ricci curvature *RicM, F has the lower bound *RicM/( n-1) among the G- invariant vector fields, where G is the isotropy subgroup of the isometry group of M at a point of M, and that his lower bound is attained if and only if M is a sphere of radius 1/*RicM.