MAT4530 – Algebraic Topology I
Course description
Schedule, syllabus and examination date
Course content
The course gives an introduction to algebraic topology, with emphasis on the fundamental group and the singular homology groups of topological spaces.
Learning outcome
After having completed the course
- you can work with cell complexes and the basic notions of homotopy theory
- you know the construction of the fundamental group of a topological space, can use van Kampen?s theorem to calculate this group for cell complexes, and know the connection between covering spaces and the fundamental group
- you can define the singular homology groups, and can prove their central properties, such as homotopy invariance, exactness and excision
- you master the basic homological algebra associated to chain complexes and their homology, and can use simplicial and cellular homology to make effective calculations of homology groups
- you understand enough category theory to give an axiomatic characterization of singular homology.
Admission to the course
Students admitted at UiO must?apply for courses?in Studentweb. Students enrolled in other Master's Degree Programmes can, on application, be admitted to the course if this is cleared by their own study programme.
Nordic citizens and applicants residing in the Nordic countries may?apply to take this course as a single course student.
If you are not already enrolled as a student at UiO, please see our information about?admission requirements and procedures for international applicants.
Recommended previous knowledge
- MAT3500 – Topology / MAT4500 – Topology
- It may also be useful to have taken MAT4510 – Geometric Structures
Overlapping courses
- 10 credits overlap with MAT9530 – Algebraic Topology I.
- 10 credits overlap with MA362.
- 10 credits overlap with MA362.
Teaching
4 hours of lectures/exercises per week.
The course may be taught in Norwegian if the lecturer and all students at the first lecture agree to it.
Upon the attendance of three or fewer students, the lecturer may, in conjunction with the Head of Teaching, change the course to self-study with supervision.
Examination
Final oral exam which counts 100 % towards the final grade.
This course has 1 mandatory assignment that must be approved before you can sit the final exam.
It will also be counted as one of the three attempts to sit the exam for this course, if you sit the exam for one of the following courses: MAT9530 – Algebraic Topology I
Examination support material
No examination support material is allowed.
Language of examination
Courses taught in English will only offer the exam paper in English. You may write your examination paper in Norwegian, Swedish, Danish or English.
Grading scale
Grades are awarded on a scale from A to F, where A is the best grade and F is a fail. Read more about the grading system.
Resit an examination
This course offers both postponed and resit of examination. Read more:
More about examinations at UiO
- Use of sources and citations
- Special exam arrangements due to individual needs
- Withdrawal from an exam
- Illness at exams / postponed exams
- Explanation of grades and appeals
- Resitting an exam
- Cheating/attempted cheating
You will find further guides and resources at the web page on examinations at UiO.