|| MAM0320 |
|| PARAMETER ESTIMATION IN CONTINUUM AND STOCHASTIC MODELS |
|| 2004/2005 |
|| Professor Russell Davies |
|| Semester 2 |
|| Dr David M Binding |
| Course delivery
|| Lecture || 8 x 1 hour lectures |
|| Seminars / Tutorials || Tutorial. 2 x 1 hour tutorials |
|| Practical || 6 x 3 hour practicals |
|Assessment Type||Assessment Length/Details||Proportion|
|Semester Assessment|| Course Work: Practical Reports (80%); Oral examination (20%)||100%|
|Supplementary Assessment|| Practical reports||100%|
On completion of this module, students should be able to:
Analyse data from a range of rheometrical experiments.
Determine the viscosity of a material as a function of shear-rate.
Perform time-temperature superposition.
Determine the discrete relaxation spectrum from oscillatory shear data.
This module provides an introduction to modern and emerging techniques in parameter estimation for complex fluids. The theory and practice of data analysis for extracting material parameters and functions from rheometrical experiments will be described. In particular, the determination of viscosity as a function of shear-rate, time-temperature superposition and the determination of the discrete relaxation spectrum from the dynamic moduli will be examined. The characterisation of materials using simple and complex flows will be considered as well as advances in intelligent instrumentation.
This module will provide an introduction to the analysis of rheometrical data. The module will provide students with the skills necessary to analyse data output from rheometrical experiments and to use them to determine material parameters and functions in continuum and stochastic models.
** Recommended Text
R. G. Owens and T. N. Phillips (2002) Computational Rheology
Imperial College Press 1860941869
H. A. Barnes, J. Hutton and K. Walters (1989) An introduction to rheology
A. A. Collyer (1993) Techniques in rheological measurement
Chapman and Hall 0412534908
This module is at CQFW Level 7