10-327/Classnotes for Thursday September 24: Difference between revisions
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See some blackboard shots at {{BBS Link|10_327-100923-143358.jpg}}. |
See some blackboard shots at {{BBS Link|10_327-100923-143358.jpg}}. |
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Here are some lecture notes.. |
Here are some lecture notes.. |
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[http://katlas.math.toronto.edu/drorbn/images/c/cc/10-327-lec04p06001.jpg Lecture 4 page 6] |
[http://katlas.math.toronto.edu/drorbn/images/c/cc/10-327-lec04p06001.jpg Lecture 4 page 6] |
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*Supplementary Notes to Lecture 4(By Kai) |
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For lecture 4. Some more illustration on Uniqueness of the product topology satisfying condition 1&2. Complete proof of the subspace topology is the unique topology satisfying condition 1&2. Proof for a couple of claims: The product topology on R_std and R_std is the standard topology on R^2 and subspace topology on Z as a subspace of Y which is a subspace of Z is the same as the subspace topology on Z as a subspace of X, where Y is a subspace of X. |
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[http://katlas.math.toronto.edu/drorbn/images/5/5d/10-327lec04pic01.jpg page 1] |
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[http://katlas.math.toronto.edu/drorbn/images/1/18/10-327lec04pic04.jpg page 4] |
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Latest revision as of 15:18, 30 September 2010
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See some blackboard shots at BBS/10_327-100923-143358.jpg.
Dror's notes above / Student's notes below |
Here are some lecture notes..
- Supplementary Notes to Lecture 4(By Kai)
For lecture 4. Some more illustration on Uniqueness of the product topology satisfying condition 1&2. Complete proof of the subspace topology is the unique topology satisfying condition 1&2. Proof for a couple of claims: The product topology on R_std and R_std is the standard topology on R^2 and subspace topology on Z as a subspace of Y which is a subspace of Z is the same as the subspace topology on Z as a subspace of X, where Y is a subspace of X.