User:Vanessa.foster: Difference between revisions

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Hi everyone,
Hi everyone,
Last two weeks of the course and I have finally started a page... better late than never right?
Last two weeks of the course and I have finally started a page... better late than never right?
==Comments==

*For people who are also in Topology, both DF and Lang have sections on the snake lemma, complexes, short exact sequences...etc
== Read Along==
== Read Along==
Here are some sections to check out in Dummit Foote regarding what we have covered on Modules.
Here are some sections to check out in Dummit Foote and Lang regarding what we have covered on Modules.


===DF===
* ??- Chap 10: Introduction to Module Theory
* Nov 17- Chap 10: Introduction to Module Theory
* Nov 22- Chap 12: Modules over Principal Ideal Domains.
* Nov 22- Chap 12: Modules over Principal Ideal Domains.
** See p.464 (Theorem 6. Fundamental Theorem, Existence: Elementary Divisor Form) which is DF's statement of the Theorem we finished proving on Tuesday.
** See p.464 (Theorem 6. Fundamental Theorem, Existence: Elementary Divisor Form) which is DF's statement of the Theorem we finished proving on Tuesday.
===Lang===
*Nov 17-Chap 3 p.117-127 For the basics.
*Nov 22- Chap 3 p.149-155, uses torsion modules...but same general idea as what was done in class.

==Random Fun Things==
==Random Fun Things==
* [http://www.youtube.com/watch?v=heKK95DAKms Doodling in Math Class]
* [http://www.youtube.com/watch?v=heKK95DAKms Doodling in Math Class]

Revision as of 00:46, 24 November 2011

Hi everyone, Last two weeks of the course and I have finally started a page... better late than never right?

Comments

  • For people who are also in Topology, both DF and Lang have sections on the snake lemma, complexes, short exact sequences...etc

Read Along

Here are some sections to check out in Dummit Foote and Lang regarding what we have covered on Modules.

DF

  • Nov 17- Chap 10: Introduction to Module Theory
  • Nov 22- Chap 12: Modules over Principal Ideal Domains.
    • See p.464 (Theorem 6. Fundamental Theorem, Existence: Elementary Divisor Form) which is DF's statement of the Theorem we finished proving on Tuesday.

Lang

  • Nov 17-Chap 3 p.117-127 For the basics.
  • Nov 22- Chap 3 p.149-155, uses torsion modules...but same general idea as what was done in class.

Random Fun Things