Abstract
Traditionally, the Riemannian geometry of tangent and unit tangent bundles was related to the Sasaki metric. The study of the relationship between the geometry of a manifold (M,g) and that of its tangent bundle TM equipped with the Sasaki metric g s had shown some kinds of rigidity. The concept of naturality allowed O.Kowalski and M.Sekizawa to introduce a wide class of metrics on TM naturally constructed from some classical and non-classical lifts of g. This class contains the Sasaki metric as well as the well known Cheeger-Gromoll metric and the metrics of Oproiu-type. We review some of the most interesting results, obtained recently, concerning the geometry of the tangent and the unit tangent bundles equipped with an arbitrary Riemannian g-natural metric.
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