Harmonic sections of tangent bundles equipped with Riemannian g-natural metrics

Abstract

Let (M,g) be a Riemannian manifold. When M is compact and the tangent bundle TM is equipped with the Sasaki metric gs, the only vector fields which define harmonic maps from (M,g) to (TM,gs), are the parallel ones. The Sasaki metric, and other well known Riemannian metrics on TM, are particular examples of g-natural metrics. We equip TM with an arbitrary Riemannian g-natural metric G, and investigate the harmonicity of a vector field V of M, thought as a map from (M,g) to (TM,G). We then apply this study to the Reeb vector field and, in particular, to Hopf vector fields on odd-dimensional spheres.