Sheaf of derivations of a manifold: Difference between revisions

Revision as of 20:57, 5 April 2008

This article defines a sheaf that can be associated to a differential manifold. The global analog of this sheaf, which is also the same as the object of the sheaf associated to the whole manifold, is: Lie algebra of global derivations

Definition

Definition in terms of the tangent bundle

Let $M$ be a differential manifold. The sheaf of derivations of $M$ is defined as the sheaf of smooth sections of the tangent bundle of the manifold. In other words:

For every open subset $U$ of $M$ , the associated object is the vector space of all smooth sections of the tangent bundle on $U$ , i.e. smooth vector fields on $U$
The restriction map is the restriction of a vector field from a larger open subset to a smaller open subset

Definition in terms of algebraic theory of derivations

Let $M$ be a differential manifold. The sheaf of derivations of $M$ is defined as the algebra-theoretic sheaf of derivations for the sheaf of infinitely differentiable functions on $M$ .

Revision as of 22:38, 3 April 2008 (view source) Vipul (talk \| contribs) (New page: ==Definition== ===Definition in terms of the tangent bundle=== Let <math>M</math> be a differential manifold. The '''sheaf of derivations''' of <math>M</math> is defined as the sheaf...)		Revision as of 20:57, 5 April 2008 (view source) Vipul (talk \| contribs) No edit summary Newer edit →
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			{{global analog\|Lie algebra of global derivations}}
	==Definition==		==Definition==