Mathematical analysis III (MAT903)

Content

Description: The course is aimed at PhD students in complex and harmonic analysis and will consist of three blocks, each corresponding to 5 credit points. The first block is a part of general mathematical education is compulsory for all the analysis PhD students, while the second part of the course is on more specific subjects and to be chosen from the second and third blocks.

Literature: W. Rudin, Real and Complex Analysis; T. Ransford, Potential Theory in the Complex Plane; A. Olevskii and A. Ulanovskii, Functions with Disconnected Spectrum; M. Klimek, Pluripotential Theory.

Learning outcome

After finishing the course, the student will have knowledge of measure theory and integration, as well as in basics of potential theory. In addition, the student will learn either main ideas of Fourier analysis, including sampling and interpolation of band-limited functions (option 1), or basics of basics on holomorphic functions of several variables, complex manifolds and pluripotential theory.

Module 1 (5ECTS- FIXED): Measure theory, integration and potential theory

Contents: general measure theory and Lebesgue integration; basics of potential theory in the complex plane and Rn.

Module 2 (5ECTS - option1): Fourier analysis

Contents: Fourier transform; functional spaces; sampling and interpolation of band-limited functions.

Module 3 (5ECTS - option2): Several complex variables and pluripotential theory

Contents: basics on holomorphic functions of several variables; complex manifolds; introduction to pluripotential theory.

Required prerequisite knowledge

Exam

Course teacher(s)

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Method of work

Open for

Course assessment

Literature