Graduate Course Description
| Course Title: | Kinetic Theory: Collisional transport models and analysis |
| Unique Number(s): | M393C (55745)
CAM 393C (61482) |
| Time/Location of Lecture: | T-TH 11:00-12:30 / RLM 11.176 |
| Instructor: | Professor Irene M. Gamba |
Brief description:
The transport Liouville equation. The initial value problem. The Boltzmann equation for diluted gases (elastic-interactions) and granular media (inelastic interactions). Elementary properties of the solutions. Irreversivility, conservation laws, H-theorem and energy inequalities. Driven flows. pseudo Maxwell molecules vs. hard sphere models. Stationary solutions. Space homogenoeus solutions. Boundary conditions and space dependant solutions. Issues on existence, uniqueness and stability properties. Trends to equilibrium.
Derivation of kinetic models for charge transport. The Poisson equation and collision operators. The Fokker Plank equation for grazing collisions. Modeling inhomogeneous small devices. Boltzmann-Poisson vs. Fokker-Plank-Poisson systems.
From kinetic to fluid dynamical models. Small mean free path, Hilbert and Chapmann expansions. Moment Methods. Derivation of fluid level equations. Low field approximations: Drift-Diffusion models. High field approximations. Hydrodynamic models. The initial--boundary value problem.
Depending on the class group interests we shall cover topics on numerical simulations of charged transport kinetic systems and/or recent related theoretical results.
Prerequisite: Some basic knowledge of methods of applied mathematics and differential equations
Bibliography:
Cercignani C., The Boltzmann Equation and its Applications, Springer, New York, 1988.
Cercignani C., Illner, R. and Pulverenti, M., The Mathematical Theory of Diluted Gases, Springer, New York, 1994.
Villani, C., A review of Mathematical topics in collisional kinetic theory, Handbook of fluid mechanics, to appear, (2002).
Ben Abdallah and Degond P., On a hierarchy of macroscopic models for semiconductors. J. Math. Phys. 37 (7) (1996), 3306--3333.
Markovich, P., Ringhofer, C.A., and Schmeiser, C., Semiconductor Equations, Springer, Wien-New York, 1989.
Several recent papers to be distributed in class.
Permission of instructor not required.:
| Irene M. Gamba |
| RLM 10.166 |
| 471-7150 |
| Email: gamba@math.utexas.edu |
| Homepage: http://www.math.utexas.edu/users/gamba |