PDF versionModule Leader
Lecturers
Dr F Cirak and Prof G Wells
Lab Leader
Timing and Structure
Lent term. 16 lectures and coursework.
Aims
The aims of the course are to:
- Provide an introduction to the finite-element (FE) method, which is widely used to obtain numerical solutions to engineering problems.
- Explain the key ideas of the FE approach, cover its theoretical foundations, and present some illustrative applications.
Objectives
As specific objectives, by the end of the course students should be able to:
- Develop the weak form of the governing equation for various problems.
- Explain the difference between strong and weak formulations.
- Compute shape functions in one, two and three dimensions for different elements.
- Obtain the stiffness and mass matrices and the right-hand side vector for different elements.
- Explain the idea and motivation behind isoparametric formulations.
- Apply numerical integration on different finite elements.
- Assemble the stiffness and mass matrices for a mesh.
- Explain how to apply various loadings and boundary conditions.
- Generate suitable meshes for different problems.
- Set up a finite element mesh, apply appropriate boundary conditions and solve the resulting system in a finite element program.
- Appreciate sources of errors associated with finite element analysis.
- Explain key features of different methods for time-dependent problems.
Content
Introduction to finite element analysis (1L Dr G.N. Wells)
- Overview and key ideas
- Modelling and applicability
Elastic rods and beams (3L Dr G.N. Wells)
- Strong and weak equations of equilibrium for rods
- Linear shape functions in one dimension
- Assembly and application of boundary conditions
- Construction of higher-order shape functions
- Euler beams and Hermitian shape functions
Heat conduction and elasticity in two and three dimensions (8L Dr F Cirak)
- Strong and weak formulations for heat conduction
- Shape functions for two and three dimensional elements
- Isoparametric mapping and numerical integration
- Application of boundary conditions
- Assembly of element matrices and vectors
- Stability considerations
- Generalisation to elasticity
- Aspects of solid modelling and meshing
Modelling issues (2L Dr G.N. Wells)
- Practical issues: element selection, what can go wrong, when does it not work?
- Errors and convergence
- Stress recovery and post-processing
Time dependent problems (2L Dr G.N. Wells)
Strategies for time-dependent problems
Coursework
Use of a finite-element package to solve a stress-analysis problem related to the experiment performed in Module 3C7.
Computational Stress Analysis
Learning objectives:
- Quantify the choice of elements on the obtained results.
- Identify the importance of the choice of boundary conditions.
- Comparte finite element results with experimental and analytical results.
Practical information:
- Sessions will take place in DPO, during weeks [2-5].
- This activity involves preliminary work (1.5 hours).
- Sign up: http://to.eng.cam.ac.uk/teaching/apps/cuedle/index.php?context=3D7
Full Technical Report:
Students will have the option to submit a Full Technical Report.
Booklists
Please see the Booklist for Part IIA Courses for references for this module.
Examination Guidelines
Please refer to Form & conduct of the examinations.
Last modified: 23/09/2019 10:59