KTH Matematik
 |
SF2735: Homologisk algebra och Algebraisk Topologi, Höst 2009 |
| Kursschema | KURS-PM | Kurslitteratur | Kursportal |
December 17, instead of a lecture there will be a final test. It will have 2 problems, one about homological algebra and one about topology.
Kursstart: Torsdagen 3 september, 15.15-17.00, rum 3733 Lindstedsv. 25.
Roy Skjelnes föreläser fram till 22 oktober.
Wojcieh Chacholski föreläser i perioden 29 oktober - 17 december.
Mehdi Tavakol vill ansvara för problemlösning. Tisdagar, udda veckor, 15.20-17.00, rum 3733.
Here is a PDF file of the notes for the course.
| Homework |
Due
date |
| Homework 5 |
December
17 |
| Homework 4 |
November
26,
2009 |
| Homework 3 |
November
4,
2009 |
| Homework 2 |
October
22,
2009 |
| Homework 1 |
October
8,
2009 |
Results of graded homeworks and exam
| Lecture |
Content |
| 26
November 2009 |
We covered section 8.5
(pages 87-90) |
| 19 November 2009 |
We
covered sections 8.1 till 8.4 (pages 78-87). It is important that try to solve all excercises in these sections. |
| 12
November 2009 |
We covered sections 7.12
till 7.13 and the beginning of 8.1 Again it is important to try to solve all the excercises in these sections. |
| 5
November 2009 |
We covered sections 7.7
till 7.10 (pages 67-73). I recomend to solve all the excercises in these sections. |
| 29
October 2009 |
We coverd sections 7.1
till 7.6 (pages 61-67) of the notes. I recomend to solve all excercises in these sections. |
Recommended literature for topology:
there are a lot of book available in the library. Here are some that one might use for an extra reading.
Genreal topology:
- "Outline of General Topology" by R. Engenlking
Alg Topology:
- "Algebraic Topology" by Allen Hatcher (also available on the net here)
- "Lectures on Algebraic Topology" by M. Greenberg
- "Algebraic topology, an introductory course" by Peter Hilton
- "Algebraic topology, a first course" by Max Agoston
Some literature for homological algebra:
Weibel "Homologisk Algebra", Hilton & Stammback "A course in homological algebra", Vick "Homology theory", Rotman "Introduction to Homological Algebra",