MEASURE AND INTEGRATION
Academic Year 2024/2025 - Teacher: Biagio RICCERIExpected Learning Outcomes
The main goal of the course is to provide the student with a more in depth treatment of the most important concepts and results within the abstract theory of measure and integration. In such a way, the student will enrich his/her cultural background in the field of Mathematical Analysis and will acquire useful tools to follow other courses.
In more detail, following the Dublin descriptors, the objectives are the following:
Knowledge and understanding: the student will learn to work with the most typical concepts and techniques of the abstract theory of measure and integration.
Applying knowledge and understanding: the student will be guided in the ability to realize applications of the general results gradually established.
Making judgements: the student will be stimulated to study autonomously some results not developed during lessons.
Communication skills: the student will learn to expose in a clear, rigorous and concise manner.
Learning skills: the student will be able to face exercices and found proofs of simple results.
Course Structure
Required Prerequisites
Attendance of Lessons
The partecipation in the lecture classes is strongly recommended.
Detailed Course Content
Textbook Information
Some teacher's notes will be published on the Studium page of the course.
Course Planning
Subjects | Text References | |
---|---|---|
1 | Measure theory (24 hours) | 1, teacher's notes |
2 | Integration theory (23 hours) | 1, teacher's notes |
Learning Assessment
Learning Assessment Procedures
not approved: the student has not acquired the basic concepts and is not able to solve exercises.
18-23: the student shows a minimal mastery of the basic concepts, his/her exposure and linking skills are modest, he/she is able to solve simple exercises.
24-27: the student shows a good mastery of the basic concepts, his/her exposure and linking skills are good, he/she solves exercises with a few mistakes.
28-30 cum laude: the student has acquired all the course contents and is able to expose and connect them in a complete and critic way, he/she solves exercices completely and without mistakes.
Examples of frequently asked questions and / or exercises
Theorem of Jordan-Hahn
Completion of a measure space
Characterization of the absolute continuity of a set function
Theorem of Severini-Egoroff
Theorem of Weyl-Riesz
Theorems on passing to the limit under the integral sign
Characterization of the convergence in mean of order p
Theorem of Tonelli
Theorem of Fubini