Department Mathematik
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Vorlesung: Distributions and Operators (WiSe 2026-27)



!!!! TO BE UPDATED !!! PLEASE CHECK BACK !!!



Lecture (Vorlesung):
Wed 10-12 (in B ???).   LSF

Exercises (Übungen):
There are NO Exercises.

Synopsis (Kurzbeschreibung):


There will (maybe) be a continuation (2 SWS) in the following semester, 'Pseudodifferential operators & PDE'. (More details on content below.)

NB Die Vorlesung wird auf Englisch gehalten.

Audience (Hörerkreis):
Master students of Mathematics (PO 2011: WP 17.2, 18.1, 18.2, 44.3, 45.2, 45.3
- PO 2021: WP 13, 16, 40, 41), TMP-Master.
Motivated Bachelor students of Mathematics are welcome;
they will get "Schein" if pass the course (contact the Lecturer).

Credits:
3 ECTS.

Prerequisites (Vorkenntnisse):
Analysis I-III and FA1.

Language (Sprache):
English. (Die mündliche Prüfung kan auch auf Deutsch gemacht werden).

Exam (Prüfung):
There will be an oral exam (30 min; dates to be announced) (Es wird eine mündliche Prüfung geben).
See separate webpage (Moodle).

Content (Inhalt) (!! TO BE UPDATED - CHECK BACK !!):
  1. Introduction & Motivation

  2. Testfunctions on T: smooth periodic functions

    1.1 Algebra & differentiation
    1.2 Translation, convolution & approximation
    1.3 Metric & continuity of operations
    1.4 Fourier series of smooth functions

  3. Distributions on T: periodic distributions

    2.1 Definition & examples
    2.2 Algebra, translation & differentiation
    2.3 Convolution & approximation
    2.4 Fourier series of distributions
    2.5 Support & structure of distributions
    2.6 Sobolev spaces on T

  4. Operators

    3.1 Linear Algebra & The Spectral Theorem
    3.2 Multiplication operators
    3.3 Translation & convolution operators
    3.4 Differential operators & Functional Calculus

  5. Outlook: Pseudodifferential operators & PDE

    4.1 Motivation: Functional Calculus
    4.2 Symbols & operators
    4.3 Linear evolution equations
    4.4 Nonlinear evolution equations

Literature:
In Moodle you will find a copy of the notes from the lecture (to be updated as we go along).
Above you will find a short description of the content of the lecture.

Supplementary literatur (Ergänzende Literatur) (!! TO BE UPDATED - CHECK BACK !!):

Office hours (Sprechstunde):
See Moodle.

To access the course material, you need to sign up (OPENS 5 Oct 2026) in Moodle here (Psword: Schwartz) .

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Letzte Änderung: 10 July 2026.

Thomas Østergaard Sørensen