Sheaf of sections of a vector bundle: Difference between revisions

Latest revision as of 20:09, 18 May 2008

Let $M$ be a differential manifold, and $π : E \to M$ be a smooth vector bundle over $M$ . The sheaf of sections of $E$ is defined as follows:

To every open subset $U$ of $M$ , it associates the vector space of all smooth sections of the bundle $π^{- 1} (U) \to U$
The restriction map is section restriction

The sheaf of sections for the trivial one-dimensional bundle over a differential manifold is the sheaf of infinitely differentiable functions. This is more than just a sheaf of vector spaces: it is in fact a sheaf of $R$ -algebras.
The sheaf of sections for the tangent bundle is the sheaf of derivations (derivations are also termed vector fields). This is the same as the algebra-theoretic sheaf of derivations of the sheaf of infinitely differentiable functions.
The sheaf of sections for the cotangent bundle is the sheaf of differential 1-forms.

Revision as of 19:02, 5 April 2008 (view source) Vipul (talk \| contribs) (New page: ==Definition== Let <math>M</math> be a differential manifold, and <math>\pi:E \to M</math> be a smooth vector bundle over <math>M</math>. The '''sheaf of sections''' of <math>E</m...)	Latest revision as of 20:09, 18 May 2008 (view source) Vipul (talk \| contribs) m (1 revision)
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