Exactly Solved Models in Statistical Mechanics
The course intends to provide an introduction to the theory of integrable lattice models. Basic examples are the two-dimensional Ising model in a zero magnetic field, the six-vertex model, as well as related two-dimensional models and spin chains.
It is planned to explain with simple model examples the concept of matrix transfer, duality between high and low temperatures, the concept of lattice operators of order and disorder, the star-triangle equation, the Yang-Baxter equation, and connected algebraic structures. One of the main topics I would like to try to explain is diagonalization of the Hamiltonian (matrix transfer) in the ansatz Bethe.
It is planned to explain with simple model examples the concept of matrix transfer, duality between high and low temperatures, the concept of lattice operators of order and disorder, the star-triangle equation, the Yang-Baxter equation, and connected algebraic structures. One of the main topics I would like to try to explain is diagonalization of the Hamiltonian (matrix transfer) in the ansatz Bethe.
讲师
日期
2023年10月11日 至 2024年01月05日
位置
| Weekday | Time | Venue | Online | ID | Password |
|---|---|---|---|---|---|
| 周三,周五 | 13:30 - 15:05 | A3-4-101 | ZOOM 05 | 293 812 9202 | BIMSA |
修课要求
Knowledge of basic concepts of linear algebra and mathematical analysis is required. Knowledge of general physics and basic statistical mechanics would be helpful, but the minimum necessary information will be given in the course.The familiarity with the basics of quantum mechanics(Hamiltonian, wavefunctions, Pauli matrices) will be useful throughout the whole course.
课程大纲
1. Introduction. Ising model D=1:
1) Basic Statistical Mechanics.
2) Solution and critical behaviour of one dimentional Ising model.
2. Ising model D=2 on Bethe lattice:
1) Ising model D=2 on Bethe lattice.
2) Star-triangle equation for planar Ising model.
3) Ising model D=2 on square lattice.
3. Ice-type model(6-vertex model):
1) The transfer matrix.
2) Three phases.
3) Baxter Q-operator method.
4. 8-vertex model:
1) Star - triangle relation.
2) Baxter Q-operator method.
3) Connection to Ising model.
4) Relation to XYZ model.
5. Potts and Ashkin-Teller Models.
1) Basic Statistical Mechanics.
2) Solution and critical behaviour of one dimentional Ising model.
2. Ising model D=2 on Bethe lattice:
1) Ising model D=2 on Bethe lattice.
2) Star-triangle equation for planar Ising model.
3) Ising model D=2 on square lattice.
3. Ice-type model(6-vertex model):
1) The transfer matrix.
2) Three phases.
3) Baxter Q-operator method.
4. 8-vertex model:
1) Star - triangle relation.
2) Baxter Q-operator method.
3) Connection to Ising model.
4) Relation to XYZ model.
5. Potts and Ashkin-Teller Models.
参考资料
+ The basic book
- R. J. Baxter, Exactly solved models in statistical mechanics (1982)
+ Good books on integrating models
- M. Gaudin, The Bethe wavefunction. (1983 in French, 2014 in English)
- V. E. Korepin, N. M. Bogoliubov, A. G. Izergin, Quantum Inverse Scattering Method and Correlation Functions. (1993)
- Essler, F. H. L.; Frahm, H., Goehmann, F., Kluemper, A., & Korepin, V. E., The One-Dimensional Hubbard Model. (2005)
+ A simple exposition of some issues of exactly solvable lattice models
- Giuseppe Mussardo, Statistical Field Theory: An Introduction to Exactly Solved Models in Statistical Physics. (2020)
+ A good textbook on stat mechanics and CFT
- С. Itzykson, J.M. Drouffe. Statistical field theory. (1989)
+ A simple and concise presentation of the physics of phase transitions
- M. Yeomans, Statistical mechanics of phase transitions. (1992)
- R. J. Baxter, Exactly solved models in statistical mechanics (1982)
+ Good books on integrating models
- M. Gaudin, The Bethe wavefunction. (1983 in French, 2014 in English)
- V. E. Korepin, N. M. Bogoliubov, A. G. Izergin, Quantum Inverse Scattering Method and Correlation Functions. (1993)
- Essler, F. H. L.; Frahm, H., Goehmann, F., Kluemper, A., & Korepin, V. E., The One-Dimensional Hubbard Model. (2005)
+ A simple exposition of some issues of exactly solvable lattice models
- Giuseppe Mussardo, Statistical Field Theory: An Introduction to Exactly Solved Models in Statistical Physics. (2020)
+ A good textbook on stat mechanics and CFT
- С. Itzykson, J.M. Drouffe. Statistical field theory. (1989)
+ A simple and concise presentation of the physics of phase transitions
- M. Yeomans, Statistical mechanics of phase transitions. (1992)
听众
Advanced Undergraduate
, Graduate
视频公开
公开
笔记公开
公开
语言
英文
讲师介绍
Andrii Liashyk的研究领域是可积系统,主要研究量子系统。他于2020年获得了Skoltech高等研究中心的博士学位。2022年,他加入BIMSA担任助理教授。