250137 VO Introduction to Analysis (2025W)
Labels
Registration/Deregistration
Note: The time of your registration within the registration period has no effect on the allocation of places (no first come, first served).
Details
Language: English
Examination dates
- Monday 02.02.2026 17:30 - 20:00 Hörsaal 1 Oskar-Morgenstern-Platz 1 Erdgeschoß
- Friday 06.02.2026
- Friday 27.02.2026 17:15 - 19:45 Hörsaal 1 Oskar-Morgenstern-Platz 1 Erdgeschoß
- Friday 29.05.2026 15:00 - 16:30 Hörsaal 6 Oskar-Morgenstern-Platz 1 1.Stock
Lecturers
- Martin Ehler
- Charlotte Ahrendts (Student Tutor)
Classes (iCal) - next class is marked with N
- Monday 24.11. 11:30 - 14:45 Hörsaal A UniCampus Zugang Hof 2 2F-EG-32
- Wednesday 26.11. 08:00 - 09:30 Hörsaal A UniCampus Zugang Hof 2 2F-EG-32
- Monday 01.12. 11:30 - 14:45 Hörsaal A UniCampus Zugang Hof 2 2F-EG-32
- Wednesday 03.12. 08:00 - 09:30 Hörsaal A UniCampus Zugang Hof 2 2F-EG-32
- Wednesday 10.12. 08:00 - 09:30 Hörsaal C2 UniCampus Hof 2 2G-K1-03
- Monday 15.12. 11:30 - 14:45 Hörsaal A UniCampus Zugang Hof 2 2F-EG-32
- Wednesday 17.12. 08:00 - 09:30 Hörsaal C2 UniCampus Hof 2 2G-K1-03
- Wednesday 07.01. 08:00 - 09:30 Hörsaal C2 UniCampus Hof 2 2G-K1-03
- Monday 12.01. 11:30 - 14:45 Hörsaal A UniCampus Zugang Hof 2 2F-EG-32
- Wednesday 14.01. 08:00 - 09:30 Hörsaal C2 UniCampus Hof 2 2G-K1-03
- Monday 19.01. 11:30 - 14:45 Hörsaal A UniCampus Zugang Hof 2 2F-EG-32
- Wednesday 21.01. 08:00 - 09:30 Hörsaal C2 UniCampus Hof 2 2G-K1-03
- Monday 26.01. 11:30 - 14:45 Hörsaal A UniCampus Zugang Hof 2 2F-EG-32
- Wednesday 28.01. 08:00 - 09:30 Hörsaal C2 UniCampus Hof 2 2G-K1-03
Information
Aims, contents and method of the course
The course introduces the fundamentals of real analysis in one variable, with a focus on the concepts most relevant to the foundations of data science. Topics include sequences, convergence, continuity, differentiation, and integration. Programming is used both to build intuition for the theory and to illustrate connections to data analysis.
Assessment and permitted materials
written or oral exam
Minimum requirements and assessment criteria
successful exam
Examination topics
all topics covered in the lecture
Reading list
Lecture Notes
Walter Rudin: Principles of Mathematical Analysis
Terence Tao: Analysis 1
Walter Rudin: Principles of Mathematical Analysis
Terence Tao: Analysis 1
Association in the course directory
DSAN
Last modified: Fr 17.04.2026 13:07