Schedule, syllabus and examination date

Course content

Applications of the residue theorem, Montel's theorem, Cauchy-estimates, solutions to d-bar, Runge's theorem, Cousin I and II, Ahlfors-Schwarz-Pick Lemma, Riemann Mapping Theorem, M?bius transformations, hyperbolicity, metrics of negative curvature, Picard's Theorem, Schottky's Theorem, periodic functions in the plane, compact Riemann surfaces, some sheaf-theory and cohomology, divisors, meromorphic functions and Riemann-Roch.

Learning outcome

The course gives an introduction to classical results in function theory of the complex plane, and an analytic approach to some basic notions in complex/algebraic geometry via compact Riemann surfaces.

Admission to the course

Students admitted at UiO must?apply for courses?in Studentweb. Students enrolled in other Master's Degree Programmes can, on application, be admitted to the course if this is cleared by their own study programme.

Nordic citizens and applicants residing in the Nordic countries may?apply to take this course as a single course student.

If you are not already enrolled as a student at UiO, please see our information about?admission requirements and procedures for international applicants.

Overlapping courses

  • 10