If (M, g) is a Riemannian manifold then there is the well-known base preserving vector bundle isomorphism TM → T*M given by v → g(v, –) between the tangent TM and the cotangent T*M bundles of M. In the present note first we generalize this isomorphism to the one J^rTM → J^rT*M between the r-th order prolongation J^rTM of tangent TM and the r-th order prolongation J^rT*M of cotangent T*M bundles of M. Further we describe all base preserving vector bundle maps D_M(g) : J^rTM → J^rT*M depending on a Riemannian metric g in terms of natural (in g) tensor fields on M.

Riemannian manifold; higher order prolongation of a vector bundle; natural tensor; natural operator

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