Information
Code | MT560 |
Name | Algebraic Topology |
Term | 2024-2025 Academic Year |
Term | Spring |
Duration (T+A) | 3-0 (T-A) (17 Week) |
ECTS | 6 ECTS |
National Credit | 3 National Credit |
Teaching Language | Türkçe |
Level | Doktora Dersi |
Type | Normal |
Mode of study | Yüz Yüze Öğretim |
Catalog Information Coordinator | Prof. Dr. ALİ ARSLAN ÖZKURT |
Course Instructor |
1 |
Course Goal / Objective
To Teach basic concepts ad techniques of Algebraic Topology
Course Content
Homotopy Groups, Fibre Bundles and fibrations, Singüler Cohomology, Eilenber-Zilber Theorem and Some Duality Theorems
Course Precondition
Pre-requisites None
Resources
Greenberg, Harper : Lecture Notes on Algebraic Topology
Notes
Lecture Notes
Course Learning Outcomes
Order | Course Learning Outcomes |
---|---|
LO01 | Comprehends the definitions of Homotopy Groups |
LO02 | Comprehends the properties of Homotopy Groups |
LO03 | Comprehends thefibre bundles and their Homotopy properties |
LO04 | Knows Singular Homology and Cohomology |
LO05 | Knows Hurewicz Theorem |
LO06 | Knows Eilenbeg-Zilber Theorem and calculate cohomology of product space |
LO07 | Knows cup and cap product |
LO08 | Calculate cohomology of CW-complexes |
Relation with Program Learning Outcome
Order | Type | Program Learning Outcomes | Level |
---|---|---|---|
PLO01 | Bilgi - Kuramsal, Olgusal | Knows the results of previous research in a special field of mathematics | 5 |
PLO02 | Bilgi - Kuramsal, Olgusal | Knows in detail the relationship between the results in her area of expertise and other areas of mathematics. | 5 |
PLO03 | Bilgi - Kuramsal, Olgusal | Establishes new mathematical models with the help of the knowledge gained in the field of specialization. | 4 |
PLO04 | Bilgi - Kuramsal, Olgusal | Has basic knowledge in all areas of mathematics | 5 |
PLO05 | Bilgi - Kuramsal, Olgusal | It presents the knowledge gained in different fields of mathematics and their relations with each other in the simplest and most understandable way. | 4 |
PLO06 | Bilgi - Kuramsal, Olgusal | Effectively uses the technical equipment needed to express mathematics | 5 |
PLO07 | Bilgi - Kuramsal, Olgusal | Sets up original problems in her field and offers different solution techniques | 3 |
PLO08 | Bilgi - Kuramsal, Olgusal | It carries out original and qualified scientific studies on the subject related to its field. | |
PLO09 | Bilgi - Kuramsal, Olgusal | Analyzes existing mathematical theories and develops new theories. | |
PLO10 | Beceriler - Bilişsel, Uygulamalı | Knows the teaching-learning techniques in areas of mathematics that require expertise and uses these techniques effectively at every stage of education. | 4 |
PLO11 | Yetkinlikler - Bağımsız Çalışabilme ve Sorumluluk Alabilme Yetkinliği | To have foreign language knowledge at a level to be able to follow foreign sources related to the field and to communicate verbally and in writing with foreign stakeholders. | 3 |
PLO12 | Yetkinlikler - Bağımsız Çalışabilme ve Sorumluluk Alabilme Yetkinliği | It presents and publishes its original works within the framework of scientific ethical rules for the benefit of its stakeholders. | 3 |
PLO13 | Yetkinlikler - Öğrenme Yetkinliği | Adheres to the ethical rules required by its scientific title | 5 |
Week Plan
Week | Topic | Preparation | Methods |
---|---|---|---|
1 | Definitions of Homotopy Groups and relative homotopy groups | Read the relevant sections in the textbook and solve problems | Öğretim Yöntemleri: Anlatım, Tartışma |
2 | Commutativity of Higher homotopy groups and long exact homoyopy sequences of a pair | Read the relevant sections in the textbook and solve problems | Öğretim Yöntemleri: Anlatım, Tartışma |
3 | Singular Homology and Cohomology | Read the relevant sections in the textbook and solve problems | Öğretim Yöntemleri: Anlatım, Tartışma |
4 | Properties of Singular homology and cohomology, homotopy invariance and excision axiom | Read the relevant sections in the textbook and solve problems | Öğretim Yöntemleri: Anlatım, Tartışma |
5 | Properties of Singular homology and cohomology, homotopy invariance and excision axiom 2 | Read the relevant sections in the textbook and solve problems | Öğretim Yöntemleri: Anlatım, Tartışma |
6 | Long exact Homology and Cohomology sequences | Read the relevant sections in the textbook and solve problems | Öğretim Yöntemleri: Anlatım, Tartışma |
7 | Calculations of cohomology groups of some spaces | Read the relevant sections in the textbook and solve problems | Öğretim Yöntemleri: Anlatım, Tartışma |
8 | Mid-Term Exam | Topics discussed in the lecture notes and sources again | Ölçme Yöntemleri: Ödev |
9 | Eilenberg-Mclane Axioms | Read the relevant sections in the textbook and solve problems | Öğretim Yöntemleri: Anlatım, Tartışma |
10 | Hurewicz map | Read the relevant sections in the textbook and solve problems | Öğretim Yöntemleri: Anlatım, Tartışma |
11 | Tensor product of complexes, Eilenberg-Zilber Theorem and cohomology of product spaces | Read the relevant sections in the textbook and solve problems | Öğretim Yöntemleri: Anlatım, Tartışma |
12 | Tensor product of complexes, Eilenberg-Zilber Theorem and cohomology of product spaces 2 | Read the relevant sections in the textbook and solve problems | Öğretim Yöntemleri: Anlatım, Tartışma |
13 | Universal coeficient spaces | Read the relevant sections in the textbook and solve problems | Öğretim Yöntemleri: Anlatım, Tartışma |
14 | Cup-Cap Products, Manifolds, Orientations and Poincare Duality | Read the relevant sections in the textbook and solve problems | Öğretim Yöntemleri: Anlatım, Tartışma |
15 | Cup-Cap Products, Manifolds, Orientations and Poincare Duality 2 | Read the relevant sections in the textbook and solve problems | Öğretim Yöntemleri: Anlatım, Tartışma |
16 | Term Exams | Topics discussed in the lecture notes and sources again | Ölçme Yöntemleri: Ödev |
17 | Term Exams | Topics discussed in the lecture notes and sources again | Ölçme Yöntemleri: Ödev |
Student Workload - ECTS
Works | Number | Time (Hour) | Workload (Hour) |
---|---|---|---|
Course Related Works | |||
Class Time (Exam weeks are excluded) | 14 | 3 | 42 |
Out of Class Study (Preliminary Work, Practice) | 14 | 5 | 70 |
Assesment Related Works | |||
Homeworks, Projects, Others | 0 | 0 | 0 |
Mid-term Exams (Written, Oral, etc.) | 1 | 15 | 15 |
Final Exam | 1 | 30 | 30 |
Total Workload (Hour) | 157 | ||
Total Workload / 25 (h) | 6,28 | ||
ECTS | 6 ECTS |