Course syllabus for Integration theory

The course gives an introduction to the modern theory of integration.

1. Give motivation to existence of concept of measurability
2. Decide if a collection of sets is a sigma-algebra
3. Prove and apply the Caratheodory's Extension Theorem
4. Explain the concept of measurability and integrability for functions 
5. Compaire different types of convergency 
6. Prove and apply the Fubini-Tonelli theorem
7. Connect Measure theory and Probability theory
8. Compaire pairs of measures 
9. Generalize classical theorems of Analysis to the class of Lebesgue integrable functions/ functons of bounded variation

• Measurability
• Integration with respect to a measure
• Lebesgue integral
• Convergence in measure, a.e., and L1
• orthogonality and continuity of measures, Lesbegue-Radon-Nikodym decomposition
• product measure, Fubini-Tonelli theorem
• connection with Probability theory (Borel-Cantelli theorems and Kolmogorov low)
• Lesbegue differentiation
• functions of bounded variation and the Fundamental Theorem of Calculus 

The course ranges over 50 lecture hours; the total effort is about 200 hours.

G. B. Folland: Real Analysis; Modern Techniques and their Applications, John Wiley & Sons. 

Jeffrey Steif: Lecture Notes on measure theory and integration theory as well as differentiation theory