MM533: Mathematical and Numerical Analysis (10 ECTS)
STADS: 13014601Level
Bachelor course
Teaching period
The course is offered in the spring semester.
Teacher responsible
Email: zimmermann@imada.sdu.dkTimetable
| Group | Type | Day | Time | Classroom | Weeks | Comment |
|---|---|---|---|---|---|---|
| Common | I | Monday | 14-16 | U140 | 6-14,17-22 | |
| Common | I | Tuesday | 14-16 | U48A | 22 | |
| Common | I | Wednesday | 08-10 | U55 | 5 | |
| Common | I | Wednesday | 08-10 | U43 | 6 | |
| Common | I | Thursday | 10-12 | U47 | 5,11 | |
| Common | I | Thursday | 10-12 | U140 | 6-10,12-14,17-20 | |
| Common | I | Friday | 08-10 | U55 | 21 | |
| H16 | TE | Monday | 14-16 | U142 | 17 | |
| H16 | TE | Tuesday | 16-18 | U142 | 10,12-14 | |
| H16 | TE | Tuesday | 16-18 | U145 | 11 | |
| H16 | TE | Tuesday | 12-14 | U56 | 19 | |
| H16 | TE | Wednesday | 12-14 | U31 | 5 | |
| H16 | TE | Wednesday | 08-10 | U146 | 18 | |
| H16 | TE | Wednesday | 12-14 | U146 | 20 | |
| H16 | TE | Wednesday | 14-16 | U146 | 21-22 | |
| H16 | TE | Friday | 12-14 | U146 | 5-8 | |
| H16 | TE | Friday | 12-14 | U24A | 9 | |
| H17 | TE | Wednesday | 10-12 | U31 | 5,8,13,19,22 | |
| H17 | TE | Wednesday | 10-12 | U44 | 6,9-11 | |
| H17 | TE | Wednesday | 10-12 | U25A | 7 | |
| H17 | TE | Wednesday | 10-12 | U156 | 12,14,18,21 | |
| H17 | TE | Wednesday | 10-12 | U153 | 17 | |
| H17 | TE | Thursday | 08-10 | U153 | 20 | |
| H17 | TE | Friday | 15-17 | U11 | 5 | |
| M1 | TE | Tuesday | 10-12 | U31 | 6,11 | |
| M1 | TE | Tuesday | 10-12 | U74 | 7-10,12 | |
| M1 | TE | Tuesday | 10-12 | U56 | 13-14,17-22 | |
| M1 | TE | Wednesday | 14-16 | U154 | 5 | |
| M1 | TE | Friday | 08-10 | U31 | 5 |
Show personal time table for this course.
Comment:
Ubegrænset deltagerantal.
Prerequisites:
None
Academic preconditions:
Students taking the course are expected to:
- Have knowledge of the contents of MM536
- Have knowledge of the contents of MM540 or MM505 or acquire this knowledge in parallel to the lecture
Course introduction
The aim of the course is to enable the student to solve problems concerning the course topics by means of mathematical and numerical analysis. Formulate the answers (including proofs) in a correct mathematical language. Implement algorithms as computer programs and compute numerical approximations to mathematical problems that don't allow a closed form solution.
The course builds on the knowledge acquired in the courses MM536: Calculus for mathematics and MM505: Linear Algebra or MM540: Mathematical methods for economics and gives an academic basis for further studies in applied mathematics and mathematics that are part of the respective degree programs. More precisely, this includes MM545, MM546, MM547, MM548, MM549.
The course builds on the knowledge acquired in the courses MM536: Calculus for mathematics and MM505: Linear Algebra or MM540: Mathematical methods for economics and gives an academic basis for further studies in applied mathematics and mathematics that are part of the respective degree programs. More precisely, this includes MM545, MM546, MM547, MM548, MM549.
In relation to the competence profile of the degree it is the explicit focus of the course to:
- Give the competence to analyse the qualitative and quantitative characteristics of a mathematical model
- Give basic understanding on how to perform computer based calculations in science, technology and economy
- Give knowledge and understanding of basic algorithms
Expected learning outcome
The learning objective of the course is that the student demonstrates the ability to:
- understand the abstract concepts of topological and metric spaces
- understand and work with the notions of compactness, continuity and convergence in the settings of topological and metric spaces
- understand the quantitative aspects of convergence in metric spaces
- analyse and conduct basic numerical methods for
- root finding
- interpolation
- integration
Subject overview
The following main topics are contained in the course:
- Euclidian-, metric-, and topological spaces.
- Continuity of functions.
- Convergence of sequences and series.
- Bisection and secant methods and their convergence.
- Compact sets, Heine-Borel theorem.
- Completeness of Euclidian spaces.
- Banach fixed point theorem, norms and contractions.
- Linear convergence of fixed point iteration.
- Quadratic convergence of Newton iteration.
- Uniform continuity and the Riemann integral.
- Interpolation.
- Adaptive Newton-Cotes quadrature.
- Gaussian quadrature.
Literature
- Meddeles ved kursets start.
Website
This course uses e-learn (blackboard).
Prerequisites for participating in the exam
None
Assessment and marking:
- Obligatory assignments, during the course. Pass/fail, internal evaluation by teacher. (0 ECTS).
- Written exam. Danish 7-mark scale, external marking. (10 ECTS).
Expected working hours
The teaching method is based on three phase model.
Intro phase: 56 hours
Skills training phase: 28 hours, hereof:
- Tutorials: 21 hours
- Laboratory exercises: 7 hours
Educational activities
- Reading of suggested literature
- Preparation of exercises in study groups
- Contributing to online learning activities related to the course
Teaching is centred on interaction and dialogue. In the intro phase, concepts, theories and models are introduced and put into perspective. In the training phase, students train their skills through exercises and dig deeper into the subject matter. In the study phase, students gain academic, personal and social experiences that consolidate and further develop their scientific proficiency. Focus is on immersion, understanding, and development of collaborative skills.
Language
This course is taught in Danish or English, depending on the lecturer. However, if international students participate, the teaching language will always be English.
Course enrollment
See deadline of enrolment.
Tuition fees for single courses
See fees for single courses.
