Lecture Notes

(Material for future lectures refer to the lectures from winter term 2007, and will be updated throughout the semester)

Introduction - Scientific Computing as a Discipline: Oct; slides, handout
Fibonacci's Rabbits, Classification of Models: Oct; slides, handout
Continous Population Models I - Single Species Models: Nov; slides; Maple worksheet: popmodel.mws
Continous Population Models II & III - Systems of ODE, Analysis of ODE Models: slides, handout population models; Maple worksheets: lotkavolt.mws, dirfields.mws
Numerical Methods for ODE: Nov; slides, handout; Maple worksheet: numerics_ode.mws
Discrete Models for the Heat Equation: Dec; slides, handout; Maple worksheet: poisson2D.mws
Heat Equation - Analytical and Numerical Solution: Dec; slides, handout; Maple worksheets: Fourier's method: heat1D_four.mws, Discretisation: heat1D_disc.mws, heat1D_impl.mws; Additional material: Neumann stability (worksheet with solution), discrete energy (handout)

Exam

A written exam will be offered at the end of the lecture period.

A.B. Shiflet and G.W. Shiflet: Introduction to Computational Science, Princeton University Press
Boyce, DiPrima: Elementary Differential Equations and Boundary Value Problems, Wiley, 1992 (5th edition)
Golub, Ortega: Scientific Computing: An Introduction with Parallel Computing, Academic Press, 1993
Tveito, Winther: Introduction to Partial Differential Equations - A Computational Approach, Springer, 1998
Stoer, Bulirsch: Introduction to Numerical Analysis, Springer, 1996
Hackbusch: Elliptic Differential Equations - Theory and Numerical Treatment, Springer, 1992