NMAA05010U Topology (Top)
Volume 2014/2015
Education
BSc programme in Mathematics
BSc programme in Natural Sciences and It
BSc programme in Natural Sciences and It
Content
This is a course on topological spaces and continuous maps. Main topics of this course are:
- Topological Spaces
- Subspace, Order, Product, Metric and Quotient Topologies
- Continuous Functions
- Connectedness and Compactness
- Countability and Separation Axioms
- Retractions and fixed points
Secondary topics are:
- Tychonoff Theorem
- Compactifications
- The fundamental group and vistas of algebraic topology
Learning Outcome
This course will enable the participants to work with basic topological concepts and methods. At the end of the course, the students are expected to have attained:
Knowledge:
- understand and assimluate the concepts and methods of the main course topics including basic definitions and theorems
- understand secondary topics covered in the specific course
Skills:
- determine properties of a topological space such as Hausdorffness, countability, (path) connectedness, (local) compactness
- construct new spaces as subspaces, quotient spaces and product spaces of known ones
Competences:
- analyze concrete topological spaces using acquired knowledge and skills
- relate the theory of topological spaces and continuous maps to specific settings in past and future math courses
Academic qualifications
Analyse 2 (An2) or
similar.
Teaching and learning methods
Lectures and single and/or
group activities with consulting for 7 weeks,
Workload
- Category
- Hours
- Exam
- 3
- Lectures
- 45
- Practical exercises
- 27
- Preparation
- 131
- Total
- 206
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Exam
- Credit
- 7,5 ECTS
- Type of assessment
- Continuous assessmentWritten examination, 3 hour under invigilation-----
A complete evaluation of weekly work (weighted 50%) and a written 3 hour final exam with all aids (weighted 50%) constitute the basis for assessment. - Aid
- All aids allowed
- Marking scale
- 7-point grading scale
- Censorship form
- No external censorship
One internal examiner
- Re-exam
- Re-exam: Consists of two parts both weighted 50%:
1. A written assignment covering the breath of the course that must be handed in to the course responsible at the latest 2 days before the written exam (see 2).
2. A 3 hour written exam under invigilation. All aids allowed.
Criteria for exam assesment
The student must in a satisfactory way demonstrate that he/she has mastered the learning outcome.
Course information
- Language
- English
- Course code
- NMAA05010U
- Credit
- 7,5 ECTS
- Level
- Bachelor
- Duration
- 1 block
- Placement
- Block 2
- Schedule
- B (Mon 8-12 + Tues 13-17 + Fri 8-12)
- Course capacity
- No limit
- Continuing and further education
- Study board
- Study Board of Mathematics and Computer Science
Contracting department
- Department of Mathematical Sciences
Course responsibles
- John Foley (5-69726f687c437064776b316e7831676e)
Phone +45 35 32 07 21, office
04.1.16
Saved on the
01-12-2014