MAT4350 – Functional analysis
Schedule, syllabus and examination date
The course is a continuation of MAT4340 – Elementary functional analysis (discontinued). Functional analysis is now developed in a broader perspective by using concepts from topology and measure- and integration-theory. Central themes are Banach spaces and their dual spaces, the fundamental theorems(e.g. the Hahn-Banach theroem, the open mapping theorem, the closed graph theorem, the Banach-Steinhaus theorem, Alaoglu's theorem), the Gelfand theory for commutative Banach algebras and commutative C*-algebras with applications to spectral theory. An introduction to the theory of unbounded operators on Hilbert spaces is also given.
The course combines in an exciting way ideas and methods from different areas of mathematics. It is designed especially for students who want to choose operator algebras as their speciality, but the content of the course will also be useful to all students interested in other branches of analysis.
Students who are admitted to study programmes at UiO must each semester register which courses and exams they wish to sign up for in Studentweb.
If you are not already enrolled as a student at UiO, please see our information about admission requirements and procedures.
Recommended previous knowledge
Knowledge corresponding to MAT3300 – Measure and integration (discontinued)/MAT4300 – Measure and integration (discontinued), MAT3500 – Topology/MAT4500 – Topology and MAT4340 – Elementary functional analysis (discontinued).
*The information about overlaps is not complete. Contact the Department for more information if necessary.
4 hours lectures/exercises per week.
Oral exam. Letter grading (A-F).
Language of examination
Subjects taught in English will only offer the exam paper in English.
You may write your examination paper in Norwegian, Swedish, Danish or English.
Explanations and appeals
Resit an examination
Students who due to illness or other valid reason of absence were unable to sit for their final exams may apply for participation in deferred examinations. Deferred examinations are arranged either later in the same semester or early in the semester following the exam in question. Documentation of valid reasons for absence from the regular exam must be submitted upon application to participate in deferred examinations.
Students who have failed an exam, who withdraw during an exam, and students who wish to retake an exam to achieve a better grade may not participate in deferred exams, but may retake the exam when it is regularly scheduled.
The course is subject to continuous evaluation. At regular intervals we also ask students to participate in a more comprehensive evaluation.