Resumen de On the relation between conformally invariant operators and some geometric tensors
Paolo Mastrolia, Dario D. Monticelli
In this note we introduce and study some new tensors on general Riemannian manifolds which provide a link between the geometry of the underlying manifold and conformally invariant operators (up to order four). We study some of their properties and their relations with well-known geometric objects, such as the scalar curvature, the Q-curvature, the Paneitz operator and the Schouten tensor, and with the elementary conformal tensors {Tum,α} and {Xum,μ} on Euclidean space introduced in [7] and [6].
