Studienhandbuch | UE Pseudodifferential Operators and Fourier Integral Operators

Inhalt

[ 201ANASPOFU22 ] UE Pseudodifferential Operators and Fourier Integral Operators

Workload	Education level	Study areas	Responsible person	Hours per week	Coordinating university
1,5 ECTS	B3 - Bachelor's programme 3. year	Mathematics	Markus Passenbrunner	1 hpw	Johannes Kepler University Linz

Detailed information

Original study plan

Bachelor's programme Technical Mathematics 2025W

Learning Outcomes

Competences
Confident handling of the Fourier transform

Skills	Knowledge
Define Fourier transform and work intensively with it Know pseudo-differential operators and their properties and deal with them Know first results of Morse theory and apply them to solution operators of differential equations	Fourier transform, Hermite functions, pseudo-differential operators (definition, asymptotic expansion of the symbol, product, adjoint, parametrix), L^p boundedness of pseudo-differential operators, Sobolev spaces, oscillating integrals, Morse theory

Criteria for evaluation

Participants present exercises connected to the topics presented in the associated lecture.

Language

English and French

Changing subject?

Earlier variants

They also cover the requirements of the curriculum (from - to)
TM1WAUEPSDO: UE Pseudodifferential operators and Fourier integral operators (2004W-2022S)

On-site course
Maximum number of participants	25
Assignment procedure	Direct assignment