Differential manifold: Difference between revisions

Revision as of 20:49, 26 December 2007

Definition

Definition in terms of atlases

A differential manifold or smooth manifold is the following data:

A topological manifold $M$ (in particular, $M$ is Hausdorff and second-countable)
An atlas of coordinate charts on $M$ to $\mathbb {R} ^{n}$ (in other words an open cover of $M$ with homeomorphisms from each member of the open cover to open sets in $\mathbb {R} ^{n}$

satisfying the compatibility condition: the transition function between any two coordinate charts of the atlas is a diffeomomorphism of open subsets of $\mathbb {R} ^{n}$ .

By diffeomorphism, we here mean a $C^{\infty }$ map with a $C^{\infty }$ inverse.

upto the following equivalence:

Two atlases of coordinate charts on a topological space define the same differential manifold structure if given any coordinate chart in one and any coordinate chart in the other, the transition function between them is a diffeomorphism.

Definition in terms of sheaves

A differential manifold or smooth manifold is the following data:

A topological space $M$
A subsheaf of the sheaf of continuous functions from $M$ to $\mathbb {R}$ , which plays the role of the sheaf of differentiable functions

Fill this in later

Relation with other structures

Weaker structures

Topological manifold

@@ Line 5: / Line 5: @@
 A '''differential manifold''' or '''smooth manifold''' is the following data:
-* A [[topological space]] <math>M</math>
+* A [[topological manifold]] <math>M</math> (in particular, <math>M</math> is Hausdorff and second-countable)
 * An atlas of coordinate charts on <math>M</math> to <math>\R^n</math> (in other words an open cover of <math>M</math> with homeomorphisms from each member of the open cover to open sets in <math>\R^n</math>