Teaching
Group Theory and its Applications, Autumn 2023 / 群论及其应用
课程信息:
期末考试地点:鼓楼校区 教 102;时间:2024-01-04,16:30-18:30
上课时间及地点 (3-17 周,9 月 20 日开始):
- 线下教学:
- 周三 第 5-6 节,费彝民楼 A-201
- 周五 第 5-6 节,费彝民楼 A-201
课程参考资料:
- 课程讲义主要参考 Greg Moore, Abstract Group Theory
- 其他建议阅读的参考书
- Zee, Group Theory in a Nutshell for Physicists, Princeton Univ. Press, 2016(较简单,适合入门)
- Dresselhaus, Dresselhaus, Jorio, Group Theory: Application to the Physics of Condensed Matter, Springer 2008(包含较多物理应用实例)
- 陶瑞宝,《物理学中的群论》,高等教育出版社,2011(常用中文教材)
- 马中骐,《物理学中的群论》,科学出版社,2006(常用中文教材)
- 陈金全,《群表示论的新途径》,上海科学技术出版社,1984(南京大学)
课程讲义及资料:
- Notes on 2022-09-20
- Notes on 2022-09-20
- Notes on 2022-09-22
- Notes on 2022-09-27 | Recording
- Notes on 2022-10-08
- Notes on 2022-10-11
- Notes on 2022-10-13
- Notes on 2022-10-18
- Notes on 2022-10-20
- Notes on 2022-10-25
- Notes on 2022-10-27
- Notes on 2022-11-01 | Note: No lecture on Nov. 3, no homework this week.
- Notes on 2022-11-08
- Notes on 2022-11-10
- Notes on 2022-11-15
- Notes on 2022-11-17
- Notes on 2022-11-22
- Notes on 2022-11-24
- Notes on 2022-11-29
- Notes on 2022-12-01
- Notes on 2022-12-06
- Notes on 2022-12-08
- Notes on 2022-12-13
- Notes on 2022-12-15
- Notes on 2022-12-20
- Notes on 2022-12-22
- Notes on 2022-12-27 | A companion Mathematica notebook
- Notes on 2022-12-29
- A brief review of topics discussed in this semester
习题:
- HW01 (Due on 2023-10-13) | Sol01
- HW02 (Due on 2023-10-20) | Sol02
- HW03 (Due on 2023-10-27) | Sol03
- HW04 (Due on 2023-11-03) | Sol04
- HW05 (Due on 2023-11-17) | Sol05
- HW06 (Due on 2023-11-24) | Sol06
- HW07 (Due on 2023-12-01) | Sol07
- HW08 (Due on 2023-12-08) | Sol08
- HW09 (Due on 2023-12-15) | Sol09
- HW10 (Due on 2023-12-22) | Sol10
Previous lectures
- Autumn 2023 - Group Theory and its Applications
- Summer 2022 - Introduction to Group Theory in Physics
- Autumn 2021 - 物理学前沿讲座