101.335 AKANA nonlinear partial differential eqautions
This course is in all assigned curricula part of the STEOP.
This course is in at least 1 assigned curriculum part of the STEOP.

2020S, UE, 2.0h, 3.0EC

TUWEL course

Properties

Semester hours: 2.0
Credits: 3.0
Type: UE Exercise

Learning outcomes

After successful completion of the course, students are able to give proof for the existence of weak solutions of different classes of nonlinear elliptic and parabolic differential equations; they are able to use maximum principles for weak solutions; furthermore the students learn how to use the theory of viscous solutions for Hamilton-Jacobi-equations and to present solutions to a group of other students.After successful completion of the course, students are able to.

Subject of course

see course

Teaching methods

There will be weekly exercises which have to be calculated at the blackboard by the students.

Mode of examination

Immanent

Lecturers

Holzinger, Alexandra
Jüngel, Ansgar

Institute

E101 Institute of Analysis and Scientific Computing

Course dates

Day	Time	Date	Location	Description
Thu	16:00 - 17:30	05.03.2020 - 12.03.2020	Sem.R. DA grün 06B	DI Alexandra Holzinger

Show single appointments

AKANA nonlinear partial differential eqautions - Single appointments

Day	Date	Time	Location	Description
Thu	05.03.2020	16:00 - 17:30	Sem.R. DA grün 06B	DI Alexandra Holzinger
Thu	12.03.2020	16:00 - 17:30	Sem.R. DA grün 06B	DI Alexandra Holzinger

Examination modalities

solution of exercises and presentation at the blackboard

Course registration

Begin	End	Deregistration end
24.02.2020 10:00	05.04.2020 14:00

Curricula

Study Code	Obligation	Semester	Precon.	Info
033 201 Technical Mathematics	Not specified
860 GW Optional Courses - Technical Mathematics	Not specified

Literature

No lecture notes are available.

Go to Course Materials

Miscellaneous

Attendance Required!

Language

if required in English