| Academic Year |
2024Year |
School/Graduate School |
School of Science |
| Lecture Code |
HB150000 |
Subject Classification |
Specialized Education |
| Subject Name |
解析学C演習 |
Subject Name
(Katakana) |
カイセキガクCエンシュウ |
Subject Name in
English |
Exercises in Analysis C |
| Instructor |
KAMIMOTO SHINGO |
Instructor
(Katakana) |
カミモト シンゴ |
| Campus |
Higashi-Hiroshima |
Semester/Term |
3rd-Year, Second Semester, 3Term |
| Days, Periods, and Classrooms |
(3T) Tues1-2,Thur9-10:SCI E209 |
| Lesson Style |
Seminar |
Lesson Style
(More Details) |
|
| Exercises and presentations. |
| Credits |
2.0 |
Class Hours/Week |
|
Language of Instruction |
J
:
Japanese |
| Course Level |
3
:
Undergraduate High-Intermediate
|
| Course Area(Area) |
25
:
Science and Technology |
| Course Area(Discipline) |
01
:
Mathematics/Statistics |
| Eligible Students |
|
| Keywords |
Complex analysis, Residue theorem, Riemann sphere, Linear fractional transformation, Riemann mapping theorem, Analytic continuation, Elliptic function. |
| Special Subject for Teacher Education |
|
Special Subject |
|
Class Status
within Educational
Program
(Applicable only to targeted subjects for undergraduate students) | |
|---|
Criterion referenced
Evaluation
(Applicable only to targeted subjects for undergraduate students) | Mathematics
(Abilities and Skills)
・To acquire basic mathematical abilities (Ability to understand concepts, calculation ability, argumentation ability).
・To acquire skills to formulate and solve mathematical questions. |
|---|
Class Objectives
/Class Outline |
The course, Exercises in Analysis C, is given for helping your understanding of the contents of "Analysis C". |
| Class Schedule |
lesson1 Homotopy
lesson2 Cauchy's integral theorem on a simply connected domain
lesson3 Laurent expansion
lesson4 Isolated singularities
lesson5 Residue theorem
lesson6 Argument principle
lesson7 Residue calculus
lesson8 Midterm examination
lesson9 Riemann sphere
lesson10 Linear fractional transformations
lesson11 Riemann mapping theorem
lesson12 Analytic continuation
lesson13 Mittag-Leffler's theorem
lesson14 Infinite product
lesson15 Elliptic functions |
Text/Reference
Books,etc. |
If you can read Japanese books, please check the syllabus of this course written in Japanese. Otherwise, please consult at the classroom. |
PC or AV used in
Class,etc. |
|
| (More Details) |
Black board |
| Learning techniques to be incorporated |
|
Suggestions on
Preparation and
Review |
Lesson1 - Lesson2 Understand Cauchy's integral theorem.
Lesson3 - Lesson7 Acquire the residue calculus.
Lesson8 Review the former part of this course.
Lesson9 - Lesson10 Understand linear fractional transformations.
Lesson11 Understand Riemann mapping theorem.
Lesson12 Understand analytic continuation.
Lesson13 - Lesson14 Understand global properties of meromorphic functions.
Lesson15 Understand fundamental properties of elliptic functions. |
| Requirements |
It is recommended to take the course "Analysis C" with this course. |
| Grading Method |
Mark given in a class (60 percents), Midterm examination and final examination (40 percents). |
| Practical Experience |
|
| Summary of Practical Experience and Class Contents based on it |
|
| Message |
|
| Other |
|
Please fill in the class improvement questionnaire which is carried out on all classes.
Instructors will reflect on your feedback and utilize the information for improving their teaching. |