FUNCTIONAL ANALYSIS
Academic Year 2024/2025 - Teacher: Raffaela Giovanna CILIAExpected Learning Outcomes
The course aims to provide the basic knowledge of Functional Analysis. Students will be able to operate in the framework of topological vector spaces, reflexive spaces.
In particular the course objectives are:
Knowledge and understanding: students will learn the main abstract results in Functional Analysis. They will be able to operate in the framework of topological vector spaces. The theory of linear operators will be developed and some of the most important classes of spaces will be introduced.
Applying knowledge and understanding: students will be able to apply the mathematical tools learned to solve theoretical and technical problems.
Making judgements: students will be stimulated to work on specific topics they have not studied during the class, developing exercises related on the field knowledge with greater independence. Seminars and lectures are scheduled to give students the chance to share them with the other students.
Communication skills: students will learn to communicate with clarity and rigour both.
Learning skills: students will be stimulated to examine in depth some mathematical techniques, arising from the study of the main results, which may be used to solve other problems.Course Structure
The principal concepts and learning outcomes will be structured by planning frontal lectures. Furthermore, to improve the making judgements homework will be assigned.
Required Prerequisites
I
Knowledge of the main topics of the course Istituzioni di Analisi superiore is useful. Knowledge of Lebesgue measure and integration theory and the main properties of Lp -spaces is recommended.
Attendance of Lessons
Detailed Course Content
Topological vector spaces. Definition and characterization of topological vector spaces. Filters. Locally convex vector spaces and their characterization. Hausdorff topological vector spaces. Minkowski's functional. Hahn Banach Theorem: analytic and geometric forms. Separation theorems. Extreme points. Krein Milman Theorem.
Linear operators. Continuity. The space of linear continuous operators between normed spaces. Open mapping Theorem and applications. Closed graph Theorem. Unifom boundedness Theorem. Banach Steinhaus theorem. Adjoint operator. Kernel and range of an operator. Closed range Theorem. Compatti, weakly compact and completely continuous operators Gantmacher's Theorem . Schauder.'s Theorem. Davis-Figiel-Johnson-Pelczynski Theorem
Weak topologies. Definition and properties of the weak topology. Closure and weak closure of a convex set. Weak star topology in a dual space. Krein Smulian Theorem. Eberlein Smulian theorem. Banach Alaouglu' s Theorem. Goldstine Theorem. Day's Theorem. Eberlein Smulian theotrem
Schauder basis.. Definition of Schauder basis. Basic sequences. Mazur 's construction of basic sequencesBasi di Schauder Shrinking e
boundedly complete basis. Weaky unconditionally Cauchy series. Pelczynski Theorem. Ramsey Theorem. l_1 Rosenthal Therem
Spazi di Banach riflessivi. Bishop-Phelps. Theorem. James Theorem
Characterizations of reflexive Banach spaces basi di Separable spaces Metrizability of weakly compact sts in separable spaces. Uniform convexity. Milman-Pettis Theorem
Aspetti geometrici della proprietà di Radon-Nikodym. Convex sets with Radon-Nikodym Property . Punti
estremi e proprietà di Krein-Milman. Punti esposti, fortemente esposti e
punti di supporto. Densità dei funzionali di supporto. Teorema di
Lindenstrauss. ISets without Krein-Milman property . Dentable points. Huff-Morris-Davis-Phelps Theorem
Textbook Information
1. H. Brezis, Functional Analysis, Sobolev spaces and Partial Differential Equations, Springer
2. L. V. Kantorovich, G. P. Akilov, Analisi funzionale, Editori Riuniti.
3. R.Megginson An Introduction to Banach space Theory, Springer
4. H.H. Schaefer, Topological Vector spaces, Springer
Course Planning
| Subjects | Text References | |
|---|---|---|
| 1 | Topological vector spaces and locally convex spaces | 4 |
| 2 | Linear operators | 5 |
| 3 | Weak topologies | 5 |
| 4 | Schauder basis | 3 |
| 5 | Reflexive spaces | 2 |
| 6 | Geometric aspects of the Radon Nikodym Property | 1 |
Learning Assessment
Learning Assessment Procedures
The final exam consists of an oral test.
Final grades will be assigned taking into account the following criteria:
Rejected: Basic knowledges have not been acquired.
18-23: Basic knowledges have been acquired. The student has sufficient communications skills and making judgements.
24-27: All the knowledges have been acquired. The student has good communications skills and making judgements.
28-30 cum laude: All the knowledges have been completely acquired. The student is able to apply the knowledges to some new problems. He has excellent communications skills, learning skills and making judgements.
To guarantee equal opportunities and in compliance with the laws in force, interested students can ask for a personal interview in order to plan any compensatory and / or dispensatory measures, based on the didactic objectives and specific needs.
It is also possible to contact the referent teacher CInAP (Center for Active and Participated Integration - Services for Disabilities and / or DSA) of our Department.
Examples of frequently asked questions and / or exercises
The questions listed below aren't exhaustive, but just a few examples .
1. Hahn Banach Theorem: geometric form and applications.
2. Reflexive Banach spaces and some of their characterizations.
3. Example of a topological space that is not locally convex space
4. James Theorem