Theory of integration/
Number of credits: 10 hp
Examiner: Tomas Sjödin
Course literature: G.B. Folland: Real Analysis, Wiley 1999.
Course contents: Measure and integration: measurable sets, measures, simple functions, Lebesgue measure. Product measures and Fubini theorem. Differentiation of measures, absolute continuity and Radon-Nikodym theorem. L^p-spaces and their properties.
Organisation: Lectures combined with a reading course and problem solving.
Examination: Solving assigned problems.
Prerequisites: Calculus TATA41, TATA42, TATA43 or similar. Functional analysis TATA85 or similar is recommended.
Last updated: 2022-11-15