Computational Physics 1 (Fundamental Numerical Methods)

1. Introduction
‒ Numbers on computers
‒ Sources of errors
2. Integration
‒ Riemann definition
‒ Trapezoid rule, Simpson rule
‒ Gauss integration
‒ Adaptive stepsize
3. Differentiation
‒ Forward Difference, Central Difference
‒ Higher Orders
4. Root Finding
‒ Bisection
‒ Newton-Raphson
5. Linear Algebra
‒ Gauss elimination with back-substitution
‒ LU-Decomposition
‒ Singular Value Decomposition
6. Multidimensional Newton-Raphson
7. Data fitting / Inter-/Extrapolation
‒ Lagrange interpolation, Splines
‒ Least squares fit
‒ Linear least squares, non-linear chi^2
8. Ordinary Differendial Equations
‒ Classification of DEs
‒ Euler algorithm
‒ Midpoint algorithm
‒ Runge-Kutta
‒ Applications: Planetary motion, etc.
‒ Initial/boundary value problems
‒ ODE eigenvalues
9. Partial Differential Equations
‒ Elliptic PDEs
‒ Parabolic PDEs
‒ Hyperbolic PDEs

At the end of the module CPI students are able to understand and implement (in various programming languages) basic numerical methods such as integration, (multidimensional) root finding, data interpolation and fitting. They are able to classify and numerically solve all ordinary and simple partial differential equations and to construct a proper DE description for a given physical problem.

No preconditions in addition to the requirements for the Master’s program in Physics.

lecture, video projector presentation, board work, exercises in individual and group work

practise sheets, accompanying web page: http://users.ph.tum.de/srecksie/lehre

Much of the material in this course is covered in "“Computational Physics: Problem Solving with Computers”" by Landau, Paez and Bordeianu, Wiley-Vch, ISBN 3527406263.

There will be a written exam of 90 minutes duration. Therein the achievement of the competencies given in section learning outcome is tested exemplarily at least to the given cognition level using calculation problems and comprehension questions.

For example an assignment in the exam might be: Use the trapezoidal rule to calculate the integral of a function and show that the result is exact for linear functions.

Participation in the exercise classes is strongly recommended since the exercises prepare for the problems of the exam and rehearse the specific competencies.