Add your name / see who's in!
|
#
|
Week of...
|
Links
|
Fall Semester
|
1
|
Sep 10
|
About, Tue, Thu
|
2
|
Sep 17
|
Tue, HW1, Thu
|
3
|
Sep 24
|
Tue, Photo, Thu
|
4
|
Oct 1
|
Questionnaire, Tue, HW2, Thu
|
5
|
Oct 8
|
Thanksgiving, Tue, Thu
|
6
|
Oct 15
|
Tue, HW3, Thu
|
7
|
Oct 22
|
Tue, Thu
|
8
|
Oct 29
|
Tue, HW4, Thu, Hilbert sphere
|
9
|
Nov 5
|
Tue,Thu, TE1
|
10
|
Nov 12
|
Tue, Thu
|
11
|
Nov 19
|
Tue, Thu, HW5
|
12
|
Nov 26
|
Tue, Thu
|
13
|
Dec 3
|
Tue, Thu, HW6
|
Spring Semester
|
14
|
Jan 7
|
Tue, Thu, HW7
|
15
|
Jan 14
|
Tue, Thu
|
16
|
Jan 21
|
Tue, Thu, HW8
|
17
|
Jan 28
|
Tue, Thu
|
18
|
Feb 4
|
Tue
|
19
|
Feb 11
|
TE2, Tue, HW9, Thu, Feb 17: last chance to drop class
|
R
|
Feb 18
|
Reading week
|
20
|
Feb 25
|
Tue, Thu, HW10
|
21
|
Mar 3
|
Tue, Thu
|
22
|
Mar 10
|
Tue, Thu, HW11
|
23
|
Mar 17
|
Tue, Thu
|
24
|
Mar 24
|
Tue, HW12, Thu
|
25
|
Mar 31
|
Referendum,Tue, Thu
|
26
|
Apr 7
|
Tue, Thu
|
R
|
Apr 14
|
Office hours
|
R
|
Apr 21
|
Office hours
|
F
|
Apr 28
|
Office hours, Final (Fri, May 2)
|
Register of Good Deeds
|
Errata to Bredon's Book
|
|
Announcements go here
Movie Time
With the word "immersion" in our minds, we watch the movie "Outside In". Also see the movie's home, a talk I once gave, and the movie itself, on google video.
Class Notes
The notes below are by the students and for the students. Hopefully they are useful, but they come with no guarantee of any kind.
Definition
Let be a smooth map between manifolds. If for each the differential is surjective, is called a submersion.
Theorem
If is a smooth map between manifolds and for some the differential is surjective then there exist charts and on and respectively such that
-
-
- The diagram
commutes, where is the canonical projection.
Proof
Since translations are diffeomorphisms of for every , it is trivial to find charts and such that and . Furthermore, since is open, is open and is continuous, is open so that we may assume without loss of generality.
Let be the local representative of and let be the local representative of . Since is onto, we may apply a change of basis such that .
Let . Then is a chart because is a diffeomorphism. Let be the corresponding local representative, define by , and let be the differential of at . Then, by construction of we have that and hence , which is invertible. Hence, the inverse function gives the existence of non-empty open set such that is a diffeomorphism. Put and . Then is a chart.
It remains to check that , but this is clear: if for some , then by definition of .