Digital Teaching
The lecture is organized in a blended learning format. Learning units with videos, slides, tutorials, and other materials are provided in the Moodle course. Additionally, there will be a weekly interactive lecture session (repetitorium) on Tuesdays at 09:50 for recaps, (group) exercises, hands-on tutorials, and questions.

Course Contents
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[*]Fundamental concepts of discretization and approximation
[*]Mathematical modelling with partial differential equations (heat conduction, elasticity, fluid mechanics, electro-magnetics)
[*]Strong and weak forms of PDEs (variational principle, principle of virtual work, Ritz & Galerkin methods, method of weighted residuals)
[*]Isoparametric element formulations, basis functions and coordinate transformations
[*]Numerical integration and assembly
[*]Solution of sparse linear systems of equations
[*]Linear continuum elements in structural mechanics (rod, beam, 2D and 3D elements)
[*]Boundary conditions (Dirichlet, von Neumann and mixed types)
[*]Mathematical foundations of FEM and convergence analysis
[*]Adativity (h- & p-refinement), error estimation and adaptivity
[*]Locking phenomena, mixed methods and reduced integration
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Literature
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[*]Lecture notes and script
[*]K.-J. Bathe: Finite Element Procedures. K.J. Bathe, Watertown, MA, 2nd edition, 2014
[*]B. Szabó & I. Babuška: Introduction to Finite Element Analysis: Formulation, Verification and Validation. John Wiley & Sons, 2011
[*]T.J.R. Hughes: The Finite Element Method: Linear Static and Dynamic Finite Element Analysis. Dover Publications, 2012
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Preconditions
Basic knowledge in Technical Mechanics, Numerical Mathematics and Numerical Methods recommended

Expected Number of Participants
40

Further Grading Information
The lecture is conducted in English language and lecture materials are in English. Additionally, summaries in German language will be provided during class and a lecture script in German is provided.
In addition to the lectures a recitation is offered, which includes computer tutorials with MATLAB and finite element software.

Online Offerings
moodle

Semester: WT 2023/24