In mathematics, a double vector bundle is the combination of two compatible vector bundle structures, which contains in particular the tangent of a vector bundle and the double tangent bundle .
Definition and first consequences
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A double vector bundle consists of , where
- the side bundles and are vector bundles over the base ,
- is a vector bundle on both side bundles and ,
- the projection, the addition, the scalar multiplication and the zero map on E for both vector bundle structures are morphisms.
Double vector bundle morphism
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A double vector bundle morphism consists of maps , , and such that is a bundle morphism from to , is a bundle morphism from to , is a bundle morphism from to and is a bundle morphism from to .
The 'flip of the double vector bundle is the double vector bundle .
If is a vector bundle over a differentiable manifold then is a double vector bundle when considering its secondary vector bundle structure.
If is a differentiable manifold, then its double tangent bundle is a double vector bundle.
Mackenzie, K. (1992), "Double Lie algebroids and second-order geometry, I", Advances in Mathematics, 94 (2): 180–239, doi:10.1016/0001-8708(92)90036-k