101.803 Partial Differential Equations
This course is in all assigned curricula part of the STEOP.
This course is in at least 1 assigned curriculum part of the STEOP.

2019W, VU, 4.5h, 7.0EC
TUWEL

Properties

  • Semester hours: 4.5
  • Credits: 7.0
  • Type: VU Lecture and Exercise

Learning outcomes

After successful completion of the course, students are able to

  • recognize the most important basic types of partial differential equations,
  • apply approaches and the necessary mathematical foundations to solve PDEs,
  • classify second order linear partial differential equations,
  • to calculate generalized and fundamental solutions and thus to solve boundary and initial value problems,
  • examine the existence of solutions and
  • present their solutions in front of peers.

Subject of course

Quasilinear first order equations. Linear elliptic, parabolic, and hyperbolic equations of second order. Methods: maximum principle, Sobolev spaces, variational principles, spectral analysis

Teaching methods

Lectures, exercies and a revision course are being offered. In the lecture there will be an introduction to theory and examples will be calculated. Once a week, exercise-sheets will be calculated on the blackboard by the students.The repetition offers the possibliy to make questions relating the lecture. The repetition is a complementary and optional offer.

 

Mode of examination

Immanent

Lecturers

Institute

Course dates

DayTimeDateLocationDescription
Tue13:00 - 15:0001.10.2019 - 17.12.2019FH Hörsaal 3 - MATH Prof. Jüngel
Thu13:00 - 15:0003.10.2019 - 12.12.2019FH Hörsaal 3 - MATH Prof. Jüngel
Fri09:00 - 11:0004.10.2019 - 13.12.2019Sem.R. DA grün 03 A Übungsgruppe
Fri11:00 - 13:0004.10.2019FH Hörsaal 2 Übungsgruppe
Fri13:00 - 15:0004.10.2019 - 13.12.2019Sem.R. DA grün 03 A Übungsgruppe
Fri11:00 - 13:0018.10.2019 - 13.12.2019Sem.R. DA grün 03 A Übungsgruppe B
Mon18:00 - 20:0025.11.2019Sem.R. DA grün 03 B Übungstest 1 Einsicht
Fri13:00 - 15:0024.01.2020Sem.R. DA grün 03 A Übungstest 2 Einsicht
Partial Differential Equations - Single appointments
DayDateTimeLocationDescription
Tue01.10.201913:00 - 15:00FH Hörsaal 3 - MATH Prof. Jüngel
Thu03.10.201913:00 - 15:00FH Hörsaal 3 - MATH Prof. Jüngel
Fri04.10.201909:00 - 11:00Sem.R. DA grün 03 A Übungsgruppe
Fri04.10.201911:00 - 13:00FH Hörsaal 2 Übungsgruppe
Fri04.10.201913:00 - 15:00Sem.R. DA grün 03 A Übungsgruppe
Tue08.10.201913:00 - 15:00FH Hörsaal 3 - MATH Prof. Jüngel
Thu10.10.201913:00 - 15:00FH Hörsaal 3 - MATH Prof. Jüngel
Fri11.10.201909:00 - 11:00Sem.R. DA grün 03 A Übungsgruppe
Fri11.10.201913:00 - 15:00Sem.R. DA grün 03 A Übungsgruppe
Tue15.10.201913:00 - 15:00FH Hörsaal 3 - MATH Prof. Jüngel
Thu17.10.201913:00 - 15:00FH Hörsaal 3 - MATH Prof. Jüngel
Fri18.10.201909:00 - 11:00Sem.R. DA grün 03 A Übungsgruppe
Fri18.10.201911:00 - 13:00Sem.R. DA grün 03 A Übungsgruppe B
Fri18.10.201913:00 - 15:00Sem.R. DA grün 03 A Übungsgruppe
Tue22.10.201913:00 - 15:00FH Hörsaal 3 - MATH Prof. Jüngel
Thu24.10.201913:00 - 15:00FH Hörsaal 3 - MATH Prof. Jüngel
Fri25.10.201909:00 - 11:00Sem.R. DA grün 03 A Übungsgruppe
Fri25.10.201911:00 - 13:00Sem.R. DA grün 03 A Übungsgruppe B
Fri25.10.201913:00 - 15:00Sem.R. DA grün 03 A Übungsgruppe
Tue29.10.201913:00 - 15:00FH Hörsaal 3 - MATH Prof. Jüngel

Examination modalities

2 written tests + exercises (on blackboard) +1 oral exam

Group dates

GroupDayTimeDateLocationDescription
Gruppe AFri09:00 - 11:0004.10.2019 - 13.12.2019 Sem.R. DA grün 03A101.803 Partial Differential Equations Gruppe A
Gruppe BFri11:00 - 13:0004.10.2019 - 13.12.2019 am 4.10. FH HS2, ansonsten Sem.R. DA grün 02A101.803 Partial Differential Equations Gruppe B
Gruppe CFri13:00 - 15:0004.10.2019 - 13.12.2019 Sem.R. DA grün 03A101.803 Partial Differential Equations Gruppe C

Course registration

Use Group Registration to register.

Group Registration

GroupRegistration FromTo
Gruppe A04.09.2019 00:0002.10.2019 23:59
Gruppe B04.09.2019 00:0002.10.2019 23:59
Gruppe C04.09.2019 00:0002.10.2019 23:59

Curricula

Study CodeObligationSemesterPrecon.Info
033 201 Technical Mathematics Mandatory5. Semester
066 394 Technical Mathematics Mandatory elective
066 395 Statistics and Mathematics in Economics Mandatory elective
066 405 Financial and Actuarial Mathematics Mandatory elective

Literature

Ein Vorlesungsskript ist auf der Homepage http://www.asc.tuwien.ac.at/~juengel->Teaching erhältlich

W.A. Strauss. Partial Differential Equations - An Introduction, John Wiley & Sons, 1992

L.C. Evans: Partial Differential Equations, AMS, 1998

F. John, Partial Differential Equations, Springer, New York, 1975

M.Renardy, R. C. Rogers, An Introduction to Partial Differential Equations, Springer, New York, 1993

M.E.Taylor, Partial Differential Equations - Basic Theory, Springer, 1996

Previous knowledge

* analysis 1-3
* differential equations 1 (solving equations of 1st and 2nd order with constant coefficients [also inhomogeneous], variation of constants, separation of variables)
* functional analysis (in particular compactness, strong/weak convergence, L^p spaces, Hilbert spaces, dual spaces, Riesz' representation theorem, linear operators, spectrum)

It is recommended to take the exams for the above mentioned lectures before attending the

lecture Partial Differential equations.

Language

German