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Modelling and mathematical methods in process and chemical engineering
Mathematische Methoden in den Chemieingenieurwissenschaften
Last Updated: 2026-02-05 15:29:03
Abstract
Study of the non-numerical solution of systems of ordinary differential equations and first order partial differential equations, with application to chemical kinetics, simple batch distillation, and chromatography.
Objective
Study of the non-numerical solution of systems of ordinary differential equations and first order partial differential equations, with application to chemical kinetics, simple batch distillation, and chromatography.
Content
Development of mathematical models in rpocess and chemical engineering, particularly for chemical kinetics, batch distillation, and chromatography. Study of systems of ordinary differential equations (ODEs), their stability, and their qualitative analysis. Study of a single first order partial differential equation (PDE) in space and time, using the method of characteristics. Application of the theory of ODEs to population dynamics, chemical kinetics (Belousov-Zhabotinsky reaction), and simple batch distillation (residue curve maps). Application of the method of characteristic to chromatography.
Resources
Lecture Notes
no skript
Literature
Aris "Mathematical modeling techniques" Varma/Morbidelli "Mathematical methods in chemical engineering" Rhee/Aris/Amundson "First-order partial differential equations. Vol. 1"
General Information
- Language
- English
- Levels
- BSC , MSC
- Frequency
- Yearly recurring
Examination
- Type
- session examination
- Mode
- oral 30 minutes
Course Components
| Type | Title | Time & Place | Hours |
|---|---|---|---|
| lecture with exercise | Mathematische Methoden in den Chemieingenieurwissenschaften |
|
3 h weekly |