Messages

Published June 2, 2009 2:18 PM
Published May 25, 2009 10:28 PM

Wednesday 27/5 I will proceed solving the problem set from fall 2001 and then look at the problems from fall 2000.

Published May 19, 2009 1:52 PM

On Wednesday 20. I will look at examproblems from MA252 fall 2002. I will proceed on Friday with the problems from fall 2001 (Ma 252)

Published May 15, 2009 10:34 AM

We will cancel todays lecture (because many of the students regularly meeting to the lecture have told be that they do not show up). There is only left Theorem 17. chapter 8. I will lecture this on Wednesday and then I will look at the problem set from exam MA 252. You will find a link to these problems from the home page of the department following studies->Tidligere eksamensoppgaver->MA252.

This problem set is only written in Norwegian . Hopefully it is rather straightforward to understand the content of the question, but if you have problems with the language ask some Norwegian fellow student or ask me.

Published Apr. 2, 2009 3:09 PM

Here are some more problems:

Ch. IV, nr.1d, 2 (Obs. misprint: R instead of N) and 4.

Ch.V, nr.4, 11 and 13.

Friday April 17. there will be no lecture, but I will post solutions of these problems on the web, and if you want you can arrange a colloquium working out these problems.

Solutions of these problems are

here

Published Mar. 9, 2009 4:23 PM

Friday 13/3 we will solve problem 12 and 32 from Chap II. I will also look at the problems 5, 7, 12-14, 16, 19, 22, and 23(hard?) (in that order) from chap III.

Published Feb. 26, 2009 3:44 PM

Friday 6/3 I will do the

following two problems

I will also do the problems: Ch.II, nr.7,9,10-12, and 32 from Spivak.

Published Feb. 25, 2009 5:13 PM

On Friday I will start with solving a problem (Problem 1) assigned some weeks ago. You will find a link to the text of the problem

here

Published Jan. 12, 2009 3:43 PM

We are using the textbook "Introduction to differential geometyry" by Michael Spivak. In addition we will also use the notes "Introduction to differentiable manifolds " by Per Tomter. These notes are available on the web (there is a link under the headline "teaching material and syllabus "). On Wednesday I will start talking about and giving examples of differentiable mappings and manifolds (from chapter 1 and 2 in these lecture notes, also see chapter 1 and 2 in Spivak).