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| Course Description |
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| Course Name |
: |
Functional Analysis |
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| Course Code |
: |
MT-545 |
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| Course Type |
: |
Optional |
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| Level of Course |
: |
Second Cycle |
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| Year of Study |
: |
1 |
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| Course Semester |
: |
Fall (16 Weeks) |
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| ECTS |
: |
6 |
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| Name of Lecturer(s) |
: |
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| Learning Outcomes of the Course |
: |
Fully understands the completeness of a metric space.
Knows the relationship between normed spaces and completeness.
Understands the importance of the Banach spaces
Understands the importance of the Hilbert spaces.
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| Mode of Delivery |
: |
Face-to-Face |
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| Prerequisites and Co-Prerequisites |
: |
None |
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| Recommended Optional Programme Components |
: |
None |
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| Aim(s) of Course |
: |
to provide knowledge about complete metric spaces, Banach spaces, Hilbert spaces, Hahn-Banach theorem, open mapping theorem and the Banach-Steinhaus |
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| Course Contents |
: |
Complete metric spaces, Kategory, normed spaces, Banach spaces, Hahn-Banach theorem, Baire category theorem, Hilbert spaces, conjugate spaces, Riez Representation Theorem, Banach Algebras. |
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| Language of Instruction |
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Turkish |
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| Work Place |
: |
Classroom |
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Course Outline /Schedule (Weekly) Planned Learning Activities |
| Week | Subject | Student's Preliminary Work | Learning Activities and Teaching Methods |
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1 |
Complete metric spaces |
Review of the relevant pages from sources |
Narration and discussion |
|
2 |
Completion of a metric space |
Review of the relevant pages from sources |
Narration and discussion |
|
3 |
Category and separable spaces. |
Review of the relevant pages from sources |
Narration and discussion |
|
4 |
Normed spaces |
Review of the relevant pages from sources |
Narration and discussion |
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5 |
Banach spaces and examples. |
Review of the relevant pages from sources |
Narration and discussion |
|
6 |
Hahn-Banach theorem |
Review of the relevant pages from sources |
Narration and discussion |
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7 |
The results of Hahn-Banach Theorem |
Review of the relevant pages from sources |
Narration and discussion |
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8 |
Mid-term exam |
topics discussed in the lecture notes and sources again |
Written Exam |
|
9 |
Some consequences of Baire´s Theorem. |
Review of the relevant pages from sources |
Narration and discussion |
|
10 |
Hilbert spaces. |
Review of the relevant pages from sources |
Narration and discussion |
|
11 |
Some results on Hilbert spaces. |
Review of the relevant pages from sources |
Narration and discussion |
|
12 |
Conjugate spaces |
Review of the relevant pages from sources |
Narration and discussion |
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13 |
Riesz Representation Theorem. |
Review of the relevant pages from sources |
Narration and discussion |
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14 |
Banach Algebras. |
Review of the relevant pages from sources |
Narration and discussion |
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15 |
Problem solving |
Review of the relevant pages from sources |
Narration and discussion |
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16/17 |
Final exam |
Review of the topics discussed in the lecture notes and sources |
Written Exam |
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Required Course Resources |
| Resource Type | Resource Name |
| Recommended Course Material(s) |
 Funtional Analysis, G. Bachman ve L. Narici, Academic Press, 1966.
Fonksiyonel Analizin Yöntemleri, Tosun Terzioğlu, 1984.
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| |
| Required Course Material(s) | |
|
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Assessment Methods and Assessment Criteria |
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Semester/Year Assessments |
Number |
Contribution Percentage |
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Mid-term Exams (Written, Oral, etc.) |
1 |
90 |
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Homeworks/Projects/Others |
1 |
10 |
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Total |
100 |
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Rate of Semester/Year Assessments to Success |
40 |
| |
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Final Assessments
|
100 |
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Rate of Final Assessments to Success
|
60 |
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Total |
100 |
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| Contribution of the Course to Key Learning Outcomes |
| # | Key Learning Outcome | Contribution* |
|
1 |
Aquires sufficient knowledge to enable one to do research over and above the undergraduate level |
3 |
|
2 |
Learns theoretical foundations of his/her field thoroughly |
4 |
|
3 |
Uses the knowledge in his/her field to solve mathematical problems |
4 |
|
4 |
Proves basic theorems in different areas of Mathematics |
3 |
|
5 |
Creates a model for the problems in his/her field and expresses the relationship between objects in a simple and comprehensive way. |
3 |
|
6 |
Uses technical tools in his/her field |
3 |
|
7 |
Works independently in his/her field requiring expertise |
2 |
|
8 |
Works with other colleagues collaboratelly, takes responsibilities if necessary during the research process |
3 |
|
9 |
Argues and analyzes knowledge in his/her field and applies them in other fields if necessary |
4 |
|
10 |
Has sufficient knowledge to follow literature in his/her field and communicate with stakeholders |
4 |
|
11 |
Uses the language and technology to develop knowledge in his/her field and shares these with stakeholders systematically when necessary |
3 |
|
12 |
Knows and abides by the ethical rules in analyzing, solving problems and publishing results |
3 |
| * Contribution levels are between 0 (not) and 5 (maximum). |
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| Student Workload - ECTS |
| Works | Number | Time (Hour) | Total Workload (Hour) |
| Course Related Works |
|
Class Time (Exam weeks are excluded) |
14 |
3 |
42 |
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Out of Class Study (Preliminary Work, Practice) |
14 |
4 |
56 |
| Assesment Related Works |
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Homeworks, Projects, Others |
1 |
15 |
15 |
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Mid-term Exams (Written, Oral, etc.) |
1 |
10 |
10 |
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Final Exam |
1 |
20 |
20 |
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Total Workload: | 143 |
| Total Workload / 25 (h): | 5.72 |
| ECTS Credit: | 6 |
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