Es ist eine neuere Version 2023W dieser LV im Curriculum Master's programme Computational Mathematics 2023W 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)
