Difference between revisions of "MAT3333"
(General metric topology.) |
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* Closure. | * Closure. | ||
* Examples. | * Examples. | ||
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+ | <!-- Week # --> | ||
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+ | <!-- Sections --> | ||
+ | 12.1-12.3 | ||
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+ | <!-- Topics --> | ||
+ | Sequences in metric spaces. | ||
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+ | <!-- Sections --> | ||
+ | 14.1-14.3 | ||
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+ | <!-- Topics --> | ||
+ | Continuity and limits. | ||
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+ | <!-- SLOs --> | ||
+ | * Continuous functions between metric spaces. | ||
+ | * Topological products. | ||
+ | * Limits. | ||
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+ | <!-- Sections --> | ||
+ | 15.1–15.2 | ||
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+ | <!-- Topics --> | ||
+ | Compact metric spaces. | ||
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+ | <!-- SLOs --> | ||
+ | * Compactness: definition and elementary properties. | ||
+ | * The Extreme Value Theorem. | ||
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+ | <!-- Week # --> | ||
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+ | <!-- Sections --> | ||
+ | 16.2-16.4 | ||
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+ | <!-- Topics --> | ||
+ | Sequential compactness and the Heine-Borel Theorem. | ||
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+ | <!-- SLOs --> | ||
+ | * Sequential compactness. | ||
+ | * Conditions equivalent to compactness of a metric space. | ||
+ | * The Heine-Borel Theorem. | ||
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Revision as of 15:08, 25 March 2023
Course name
MAT 3333 Fundamentals of Analysis and Topology.
Catalog entry: MAT 333 Fundamentals of Analysis and Topology. Prerequisite: MAT 3003 Discrete Mathematics, or consent of instructor. Topology of the real line. Introduction to point-set topology.
Prerequisites: MAT 1224 and MAT 3003.
Sample textbooks:
- John M. Erdman, A Problems Based Course in Advanced Calculus. Pure and Applied Undergraduate Texts 32, American Mathematical Society (2018). ISBN: 978-1-4704-4246-0.
- Jyh-Haur Teh, Advanced Calculus I. ISBN-13: 979-8704582137.
Topics List
(Section numbers refer to Erdman's book.)
Week | Sections | Topics | Student Learning Outcomes |
---|---|---|---|
1 |
1.1. Appendices C, G & H. |
Operations, order and intervals of the real line. |
|
2 |
1.2. Appendix J. |
Completeness of the real line. Suprema and infima. |
|
3 |
2.1, 2.2 |
Basic topological notions in the real line. |
|
4 |
3.1–3.3 |
Continuous functions on subsets of the real line. |
|
5 |
--- |
Review. First midterm exam. |
|
6 |
4.1, 4.2 |
Convergence of real sequences. |
|
7 |
4.3, 4.4 |
The Cauchy criterion. Subsequences. |
|
8 |
5.1, 5.2 |
Connectedness and the Intermediate Value Theorem |
|
9 |
6.1, 6.2, 6.3 |
Compactness and the Extreme Value Theorem. |
|
10 |
--- |
Review. Second midterm exam. |
|
11 |
7.1, 7.2 |
Limits of real functions. |
|
9.1-9.3 |
Metric spaces. |
| |
10.1-10.3 |
Interior, closure, and boundary. |
| |
12.1-12.3 |
Sequences in metric spaces. |
||
14.1-14.3 |
Continuity and limits. |
| |
15.1–15.2 |
Compact metric spaces. |
| |
16.2-16.4 |
Sequential compactness and the Heine-Borel Theorem. |
|