Course syllabus for Functional analysis

The course syllabus contains changes
See changes

Course syllabus adopted 2021-02-26 by Head of Programme (or corresponding).

Overview

  • Swedish nameFunktionalanalys
  • CodeTMA401
  • Credits7.5 Credits
  • OwnerMPENM
  • Education cycleSecond-cycle
  • Main field of studyMathematics
  • DepartmentMATHEMATICAL SCIENCES
  • GradingTH - Pass with distinction (5), Pass with credit (4), Pass (3), Fail

Course round 1

  • Teaching language English
  • Application code 20112
  • Open for exchange studentsYes

Credit distribution

0101 Examination 7.5 c
Grading: TH
7.5 c
  • 27 Okt 2021 am J
  • 05 Jan 2022 am J
  • 17 Aug 2022 pm J

In programmes

Examiner

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Eligibility

General entry requirements for Master's level (second cycle)
Applicants enrolled in a programme at Chalmers where the course is included in the study programme are exempted from fulfilling the requirements above.

Specific entry requirements

English 6 (or by other approved means with the equivalent proficiency level)
Applicants enrolled in a programme at Chalmers where the course is included in the study programme are exempted from fulfilling the requirements above.

Course specific prerequisites

Linear algebra and multivariable analysis.

Aim

To introduce functional analysis, a fundamental tool for i.e. ordinary and differential equations, mathematical statistics and numerical analysis.

Learning outcomes (after completion of the course the student should be able to)

-State and explain the concepts vector space, normed space, Banach and Hilbert space -State and explain the theory for linear operators on Hilbert spaces in particular for compact and self-adjoint operators. -Apply the spectral theorem for compact, self-adjoint operators. -Apply fixed point theorems to differential- and integral equations. -Communicate, both in writing and orally, the logical connections between the different concepts that appear in the course.

Content

Normed Spaces. Banach and Hilbert Spaces. Basics facts on Lebesgue Integrals. Contractions. Fixed Point Theorems. Compactness. Operators on Hilbert Spaces. Spectral Theory for Compact Self Adjoint Operators. Fredholm's Alternative. Applications to Integral and Differential Equations. Sturm-Liouville theory.

Organisation

See the course homepage.

Literature

L.Debnath/P.Mikusinski: Introduction to HilbertSpaces with Applications, 2nd ed, Academic Press 1999.

P.Kumlin: Lecture Notes  (see the course homepage)

Examination including compulsory elements

Written exam.

The course examiner may assess individual students in other ways than what is stated above if there are special reasons for doing so, for example if a student has a decision from Chalmers on educational support due to disability.

The course syllabus contains changes

  • Changes to examination:
    • 2022-04-23: Exam date Exam date changed by Elisabeth Eriksson
      [33631, 55822, 3], New exam for academic_year 2021/2022, ordinal 3 (not discontinued course)
    • 2021-08-31: Exam date Exam date changed by Elisabeth Eriksson
      [33631, 55822, 2], New exam for academic_year 2021/2022, ordinal 2 (not discontinued course)