Subject description - BV002SF
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Instructions
| BV002SF | Statistical Physics | ||
|---|---|---|---|
| Roles: | Extent of teaching: | 3P+1C | |
| Department: | 13102 | Language of teaching: | |
| Guarantors: | Krpenský A. | Completion: | Z,ZK |
| Lecturers: | Krpenský A. | Credits: | 4 |
| Tutors: | Krpenský A. | Semester: | Z |
Web page:
www.aldebaran.cz/studium/statistika.phpAnotation:
The lecture is devoted to the fundamentals of statistical physics. It is the third part of four-part lecture cycle.Study targets:
HonourableContent:
The lecture is devoted to the fundamentals of statistical physics. It is the third part of four-part lecture cycle.Course outlines:
| 1. | Basic principles: distribution function, mean value, mean quadratic fluctuation. | |
| 2. | Liouvill theorem. Gibbs distributions. | |
| 3. | Thermodynamic potentials: enthalpy, free energy, grandcanonical potential. | |
| 4. | Chemical potential, entropy and probability. | |
| 5. | Statistical distributions: Boltzmann and Maxwell distribution. | |
| 6. | Fermi-Dirac and Bose-Einstein distribution. | |
| 7. | Distributions behaviour and simple examples (black body radiation, ideal gas). | |
| 8. | Metals, neutron stars. | |
| 9. | Ferromagnetics a antiferromagnetics: Ising and Heisenberg model. | |
| 10. | Superconductivity. | |
| 11. | Degenerative fermion systems, boson condensation. | |
| 12. | Monte Carlo methods. Metropolis method. | |
| 13. | Nonequilibrium statistics, Boltzmann equation. | |
| 14. | Momentum equation, transition to continuum. |
Exercises outline:
thermodynamic potentials EOS - ideal gas other EOSs rotational and vibrational spectra Planck law, Stefan-Boltzmann law, Wien law EOS - fermion gas Monte Carlo calculation, various exapmlesLiterature:
| 1. | E. M. Lifshitz, L. D. Landau. Course in theoretical Physics 5: Statistical Physics, Elsewier Science, 2003 |
Requirements:
Theoretical Physics 1Keywords:
prtition function, statistical distribution, Bose-Einstein Distribution, Fermi-Dirac distribution, Boltzmann distribution Subject is included into these academic programs:| Program | Branch | Role | Recommended semester |
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