Fourier Analysis
Course, Bachelor's level, 1MA211
Expand the information below to show details on how to apply and entry requirements.
Autumn 2026 Autumn 2026, Uppsala, 33%, On-campus, English Only available as part of a programme
- Location
- Uppsala
- Pace of study
- 33%
- Teaching form
- On-campus
- Instructional time
- Daytime
- Study period
- 2 November 2026–17 January 2027
- Language of instruction
- English
- Entry requirements
-
15 credits in mathematics. Participation in Several Variable Calculus, Several Variable Calculus M or Geometry and Analysis III. Participation in Linear Algebra II.
- Application deadline
- 15 April 2026
- Application code
- UU-10008
Admitted or on the waiting list?
- Registration period
- 19 October 2026–15 November 2026
- Information on registration from the department
Autumn 2026 Autumn 2026, Uppsala, 33%, On-campus, English For exchange students
- Location
- Uppsala
- Pace of study
- 33%
- Teaching form
- On-campus
- Instructional time
- Daytime
- Study period
- 2 November 2026–17 January 2027
- Language of instruction
- English
- Entry requirements
-
15 credits in mathematics. Participation in Several Variable Calculus, Several Variable Calculus M or Geometry and Analysis III. Participation in Linear Algebra II.
Admitted or on the waiting list?
- Registration period
- 19 October 2026–15 November 2026
- Information on registration from the department
About the course
In Fourier analysis, we study how general functions can be expressed as infinite sums of simpler trigonometric functions. The course covers the Fourier series, Fourier transform, Laplace transform and their applications on ordinary and partial differential equations. Many of the notions in the course are also covered in the course Transform Methods, but in this course, you will get a deeper theoretical understanding of them.