司建国

Click:

The Last Update Time:..

Current position: Home > Teaching Research > Teaching Experience

Teaching Experience

Undergraduate Course

Course Name: School Year: Semester: Required Class Hours: Credits: Course Number:
高等数学(2) 2021-2022 Spring Term 80 5 sd00920130
数学分析(3) 2021-2022 Autumn Term 80 5 sd00921250
数学分析(2) 2020-2021 Spring Term 96 6 sd00921240
数学分析(3) 2019-2020 Autumn Term 80 5 sd00921250
数学分析(1) 2018-2019 Spring Term 80 5 sd00921230
数学分析(3) 2018-2019 Spring Term 80 5 sd00921250
数学分析(2) 2018-2019 Spring Term 96 6 sd00921240
数学分析(2) 2018-2019 Autumn Term 96 6 sd00921240
常微分方程定性理论 2018-2019 Autumn Term 36 2 0190088
数学分析(1) 2018-2019 80 5 sd00921230
无穷维哈密顿系统 2017-2018 Spring Term 36 2 0190091
动力系统 2017-2018 Spring Term 36 2 0190089
偏微分方程 2017-2018 Autumn Term 36 2 0190043
常微分方程定性理论 2016-2017 Autumn Term 36 2 0190088
常微分方程专题 2016-2017 Autumn Term 36 2 0190048
无穷维哈密顿系统 2016-2017 Spring Term 36 2 0190091
动力系统专题 2016-2017 Spring Term 36 2 0190036

Postgraduate Course

Course Name: School Year: Semester: Required Class Hours: Credits: Course Number:
无穷维哈密顿系统 2022-2023 Spring Term 36 2 0190091
无穷维哈密顿系统 2022-2023 Spring Term 36 2 0190091
常微分方程定性理论 2022-2023 Autumn Term 36 2 0190088
常微分方程专题 2021-2022 Autumn Term 36 2 0190048
偏微分方程 2021-2022 Autumn Term 36 2 0190043
常微分方程专题 2021-2022 Autumn Term 36 2 0190048
常微分方程专题 2021-2022 Autumn Term 36 2 0190048
动力系统专题 2020-2021 Spring Term 36 2 0190036
偏微分方程 2020-2021 Autumn Term 36 2 0190043
常微分方程专题 2019-2020 Autumn Term 36 2 0190048
无穷维哈密顿系统 2019-2020 Spring Term 36 2 0190091
动力系统基础 2019-2020 Spring Term 54 3 0190063
常微分方程专题 2019-2020 Autumn Term 36 2 0190048
常微分方程定性理论 2017-2018 Autumn Term 36 2 0190088

Copyright All Rights Reserved Shandong University Address: No. 27 Shanda South Road, Jinan City, Shandong Province, China: 250100
Information desk: (86) - 0531-88395114
On Duty Telephone: (86) - 0531-88364731 Construction and Maintenance: Information Work Office of Shandong University