FPF:UFDF008 Statistical Physics and Kineti - Course Information
UFDF008 Statistical Physics and Kinetics
Faculty of Philosophy and Science in OpavaSummer 2020
- Extent and Intensity
- 0/0/0. 0 credit(s). Type of Completion: dzk.
- Guaranteed by
- prof. Ing. Peter Lichard, DrSc.
Centrum interdisciplinárních studií – Faculty of Philosophy and Science in Opava - Prerequisites
- Microcanonical, canonical and grandcanonical ensembles and their statistical sums, state equation of ideal gas, equipartition theorem, bosons and fermions and their properties, entropy, free energy, Gibbs potential (see Thermodynamics and statistical physics) relation between the coordinate and the momentum representations, second quantization (see Quantum physics II).
- Course Enrolment Limitations
- The course is also offered to the students of the fields other than those the course is directly associated with.
- fields of study / plans the course is directly associated with
- Theoretical Physics and Astrophysics (programme FPF, P1703 Fyz4) (2)
- Theoretical Physics and Astrophysics (programme FPF, P1703 Fyz4) (2)
- Course objectives
- Introduction to nonequilibrium statistical physics including phase transitions, methods of theoretical physics and their application to solve the problems.
- Syllabus
- Phase transitions. Classification of phase transitions and the Ehrenfest equations, partition sum, state equation, Ursell-Mayer expansion and the Mayer theorem van der Waals equations and condensation, surface tension and the Laplace pressure, mechanism of creation of a new phase, Ising model of ferromagnetism, Landau theory of phase transitions.
Fluctuations, stochastic processes and kinetic equations. Fluctuations of thermodynamical quantities, thermodynamically nonequilibrium systems, stochastic sources, Fokker-Planck equation, fundamental kinetic equation, Boltzmann kinetic equation, transport equations, the law of increasing Boltzmann entropy, spontaneous transition of a system into equilibrium state, irreversible processes, locally equilibrium systems, linear thermodynamics, Onsager relations.
Nonequilibrium systems. Statistical operator, linear response, plasma and plasma effects, zero sound in a fermion system, fluctuation-dissipation theorem, Green functions.
Prerequisities:
Microcanonical, canonicak and grandcanonical ensembels and their statistical sums, state equation of ideal gas, equipartition theorem, bosons and fermions and their properties, entropy, free energy, Gibbs potential (see Thermodynamics and statistical physics) relation between the coordinate and the momentum representations, second quantization (see Quantum physics II).
- Phase transitions. Classification of phase transitions and the Ehrenfest equations, partition sum, state equation, Ursell-Mayer expansion and the Mayer theorem van der Waals equations and condensation, surface tension and the Laplace pressure, mechanism of creation of a new phase, Ising model of ferromagnetism, Landau theory of phase transitions.
- Literature
- Teaching methods
- Lecture supplemented with a discussion
One-to-One tutorial
Skills demonstration - Assessment methods
- Test
The analysis of student 's performance
Credit - Language of instruction
- Czech
- Further comments (probably available only in Czech)
- The course can also be completed outside the examination period.
- Teacher's information
- The attendance at lectures is recommended. It can be substituted by
the self-study of recommended literature and individual consultations.
- Enrolment Statistics (Summer 2020, recent)
- Permalink: https://is.slu.cz/course/fpf/summer2020/UFDF008