The course covers a subfield of numerical analysis, decided jointly between the examiner and the teacher/researcher/ guest responsible for the current occasion of the course.
FSF3571 Selected topics in Numerical analysis II 4.5 credits

A graduate course on a research topic in numerical analysis.
Information per course offering
Information for Autumn 2025 Start 25 Aug 2025 programme students
- Course location
KTH Campus
- Duration
- 25 Aug 2025 - 12 Jan 2026
- Periods
Autumn 2025: P2 (2.5 hp), P1 (2 hp)
- Pace of study
17%
- Application code
10348
- Form of study
Normal Daytime
- Language of instruction
English
- Course memo
- Course memo is not published
- Number of places
Places are not limited
- Target group
- No information inserted
- Planned modular schedule
- [object Object]
- Schedule
- Schedule is not published
- Part of programme
- No information inserted
Contact
Course syllabus as PDF
Please note: all information from the Course syllabus is available on this page in an accessible format.
Course syllabus FSF3571 (Autumn 2018–)Content and learning outcomes
Course contents
Intended learning outcomes
The student has after completing the course obtained thorough competence within a current up-to-date subfield of numerical analysis.
Literature and preparations
Specific prerequisites
A Master degree including at least 30 university credits (hp) in in Mathematics (including differential equations and numerical analysis). Note SF3560 is not a requirement.
Literature
To be announced at least 4 weeks before the course starts.
Examination and completion
Grading scale
Examination
- INL1 - Assignments, 4.5 credits, grading scale: P, F
Based on recommendation from KTH’s coordinator for disabilities, the examiner will decide how to adapt an examination for students with documented disability.
The examiner may apply another examination format when re-examining individual students.
If the course is discontinued, students may request to be examined during the following two academic years.
Homework problems
Computer assignments
Other requirements for final grade
Homework and computer assignments completed
Examiner
Ethical approach
- All members of a group are responsible for the group's work.
- In any assessment, every student shall honestly disclose any help received and sources used.
- In an oral assessment, every student shall be able to present and answer questions about the entire assignment and solution.