Continuum Mechanics

1. Kinematics of deformable media (velocity field of a fluid / continuity equation)

2. Hydrodynamics (stress tensor and viscosity / fundamental equations: Euler & Navier-Stokes / Bernoulli equation / Aerofoil theory / viscosity and Reynolds number / high Reynolds numbers and turbulence / small Reynolds numbers / waves / tsunamis)

3. Elasticity (stress tensor / energy balance / linear theory of elasticity: Hooke’s law / elastic waves / thin plates)

Successful participation provides the following skills:

Understanding hydrodynamics both in a scientific and in a technical context, fundamental equations such as Navier-Stokes, their range of validity, importance of scales and consequences such as the Reynolds number that provides a semi-quantitative criterion to predict laminar flow or turbulence. In addition, one gains an understanding of wave phenomena in elastic media and liquids, incl. surface waves, shallow-water waves and the ensuing tsunami theory.

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

Lecture, beamer presentation, blackboard, exercises alone and in small groups, discussion

scriptum of lecture, exercise sheets, internet site associated with lecture, video of the lecture

* D.J. Acheson, Elementary fluid dynamics
* H. Stephani & G. Kluge, Theoretische Mechanik
* Landau/Lifshitz, Theory of Elasticity (Theoretical Physics 7)

The learning ourcome is tested in a written exam using example calculations and comprehension questions.