| Academic Year |
2026Year |
School/Graduate School |
School of Science |
| Lecture Code |
HB080000 |
Subject Classification |
Specialized Education |
| Subject Name |
幾何学B |
Subject Name
(Katakana) |
キカガクB |
Subject Name in
English |
Geometry B |
| Instructor |
OKUDA TAKAYUKI |
Instructor
(Katakana) |
オクダ タカユキ |
| Campus |
Higashi-Hiroshima |
Semester/Term |
3rd-Year, Second Semester, 4Term |
| Days, Periods, and Classrooms |
(4T) Tues1-2,Fri7-8:SCI E210 |
| Lesson Style |
Lecture |
Lesson Style
(More Details) |
Face-to-face |
| Lecture uing blackboard |
| Credits |
2.0 |
Class Hours/Week |
4 |
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 |
Topology, Homotopies, Fundamental groups, Covering spaces |
| 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
(Knowledge and Understanding)
・Understanding on primary theory of modern mathematics established on classical theory.
(Abilities and Skills)
・To acquire basic mathematical abilities (Ability to understand concepts, calculation ability, argumentation ability). |
|---|
Class Objectives
/Class Outline |
Studying fundamentals of fundamental groups and covering spaces. |
| Class Schedule |
Lecture 1: Course overview and review of point-set topology
Lecture 2: Homotopies of continuous maps
Lecture 3: Homotopy equivalence of topological spaces
Lecture 4: Basic techniques for studying homotopy classes
Lecture 5: Triples of topological spaces
Lecture 6: Fundamental groupoid and fundamental group
Lecture 7: The fundamental group of the circle
Lecture 8: The fundamental group as a homotopy invariant
Lecture 9: Fundamental groups of product spaces, group presentations
Lecture 10: Free products of groups, the Van Kampen theorem
Lecture 11: Covering maps
Lecture 12: Lifting of paths
Lecture 13: Universal covering spaces
Lecture 14: Discontinuous groups
Lecture 15: Summary |
Text/Reference
Books,etc. |
No textbook.
Reference book:
James Munkres, Topology (2nd Edition), Pearson;
Allen Hatcher, Algebraic Topology, Cambridge University Press. |
PC or AV used in
Class,etc. |
|
| (More Details) |
Blackboard |
| Learning techniques to be incorporated |
|
Suggestions on
Preparation and
Review |
Lesson 1-5. Review of lecture notes and basic point-set topology
Lesson 6-10. Review of lecture notes and group theory
Lesson 11-15. Review of lecture notes
|
| Requirements |
|
| Grading Method |
Evaluation will be based on examinations and class activities. |
| 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. |