Index: A B C D E F G H I J K L M N O P Q R S T U V W X Y Z

Home > Pullback

:This article discusses the pullback in differential geometry. For the pullback in category theory see pullback (category theory).

In mathematics, the pullback of smooth map f : M → N between differentiable manifolds is a smooth vector bundle morphism f* : T*N → T*M, for which the following digram commutes:

Here T*M and T*N are the cotangent bundles of M and N respectively, and π_M and π_N are the natural projections. The article on cotangent spaces has the precise definition.

More generally, one can construct the pullback map between the exterior bundle s Λ^kT*N and Λ^kT*M. The pullback map is such that it maps smooth sections to smooth sections. That is, the pullback of a differential form on N is a differential form on M.

The pullback map gives rise to a contravariant functor from the category of smooth manifolds to the category of smooth vector bundles via the maps M ↦ T*M and (f : M → N) ↦ (f* : T*N → T*M).

This article is a stub. You can help Wikipedia by [ ṣlocalurl: : |action=edit}} expanding it].

Differential geometry

Read more »

<Hide>

Topics: Pullback (category Theory), Guides, Tutorials...

PullbackThis article discusses the pullback in differential geometry. For the pullback in category theory see pullback (category theory). In mathematics, the pullback of smooth map f : M → N between differentiable manifolds is a smooth vector bundle morphism

Pullback (category theory)In category theory, a branch of mathematics, the pullback (also called the fiber product is the limit of a diagram consisting of two morphisms f : X → Z and g : Y → Z with a common codomain. Explicitly, the pullback of the morphisms f and g cons

Non User