[ 403MAMOMMCV22 ] VL Mathematical methods in continuum mechanics
|
|
|
Es ist eine neuere Version 2024W dieser LV im Curriculum Master's programme Polymer Engineering and Science (PES) 2024W vorhanden. |
|
 |
Workload |
Education level |
Study areas |
Responsible person |
Hours per week |
Coordinating university |
6 ECTS |
M1 - Master's programme 1. year |
Mathematics |
Stefan Kindermann |
4 hpw |
Johannes Kepler University Linz |
|
|
 |
Detailed information |
Original study plan |
Master's programme Industrial Mathematics 2022W |
Objectives |
Understanding of the foundational concepts of continuum mechanics and the resulting equations. Analytic methods for the treatment of the differential equations and model simplifcations. Mathematical Models for elasticity and fluid dynamics.
|
Subject |
Deformations, forces, stress; stress principle; constitutive equations for elastic bodies, objectivity and isotropy, linear elasticity, existence and uniqueness for linear elasticity, simple models in elasticity; fluid dynamics, Newtonian fluids, Navier Stokes equation, models in fluid dynamics.
|
Criteria for evaluation |
Written or oral exam
|
Methods |
Blackboard presentation
|
Language |
English |
Study material |
Lecture notes
|
Changing subject? |
No |
Further information |
Until term 2022S known as: TMBPAVOMMKM Mathematical methods in continuum mechanics
|
Earlier variants |
They also cover the requirements of the curriculum (from - to) TMBPAVOMMKM: VO Mathematical methods in continuum mechanics (1998W-2022S)
|
|
|
 |
On-site course |
Maximum number of participants |
- |
Assignment procedure |
Direct assignment |
|