Introduzione


Abstract


En
The tangent and cotangent spaces of a bundle \eta \equiv (E,p,M) are considered, analysing their affine structure on the horizontal and the vertical spaces,respectively. When the bundle \eta is affine or linear, further structures are considered. These results are specialised for \eta \equiv TM or \eta \equiv T^*M, finding interesting endomorphisms and isomorphisms. The Lie derivatives of tensors and the connections on bundle are introduced and analysed in strict relation with the affine structure of the tangent bundles.

DOI Code: �

Full Text: PDF
کاغذ a4

Creative Commons License
This work is licensed under a Creative Commons Attribuzione - Non commerciale - Non opere derivate 3.0 Italia License.