HB240000 Algebra C

Hiroshima University Syllabus

Japanese

Academic Year 2026Year School/Graduate School School of Science

Lecture Code HB240000 Subject Classification Specialized Education

Subject Name 代数学Ｃ

Subject Name
（Katakana）ダイスウガクC

Subject Name in
English Algebra C

Instructor MATSUI HIROKI

Instructor
(Katakana) マツイ　ヒロキ

Campus Higashi-Hiroshima Semester/Term 4th-Year, First Semester, 1Term

Days, Periods, and Classrooms (1T) Mon5-6,Weds5-6：SCI E104

Lesson Style Lecture Lesson Style
(More Details) Face-to-face

Blackboard

Credits 2.0 Class Hours/Week 4 Language of Instruction B : Japanese／English

Course Level 4 : Undergraduate Advanced

Course Area（Area） 25 : Science and Technology

Course Area（Discipline） 01 : Mathematics/Statistics

Eligible Students

Keywords rings, modules, homological algebra

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）
・Acquiring knowledge and vision on advanced theories as an extension of core theory of modern mathematics.

Class Objectives
/Class Outline This course provides an introduction to homological algebra, which can be regarded as linear algebra over rings, covering its fundamental concepts and applications.

Class Schedule Lesson1: Review on rings and modules (1)
Lesson2: Review on rings and modules (2)
Lesson3: Hom modules
Lesson4: Chain complexes
Lesson5: Exact sequences
Lesson6: Homology groups of simplicial complexes (1)
Lesson7: Homology groups of simplicial complexes (2)
Lesson8: Tensor products
Lesson9: Projective modules and injective modules (1)
Lesson10: Projective modules and injective modules (2)
Lesson11: Tor modules and Ext modules (1)
Lesson12: Tor modules and Ext modules (2)
Lesson13: Universal coefficient theorem
Lesson14: Persistent homology (1)
Lesson15: Persistent homology (2)

Text/Reference
Books,etc. Handouts will be assigned during lectures. No specific textbook is fixed.
Any homological algebra textbook is suitable as a study-aid book.

PC or AV used in
Class,etc. Handouts, moodle

(More Details) Handouts

Learning techniques to be incorporated

Suggestions on
Preparation and
Review After each lecture, be sure to thoroughly review the course content. In addition, working through concrete examples is helpful for better understanding.

Requirements Although the lecture begins with a review, it is recommended that students have taken Algebra A.

Grading Method Based on reports. Detailed explanations will be given in the class.

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.

Academic Year	2026Year	School/Graduate School	School of Science
Lecture Code	HB240000	Subject Classification	Specialized Education
Subject Name	代数学Ｃ
Subject Name （Katakana）	ダイスウガクC
Subject Name in English	Algebra C
Instructor	MATSUI HIROKI
Instructor (Katakana)	マツイ　ヒロキ
Campus	Higashi-Hiroshima	Semester/Term	4th-Year, First Semester, 1Term
Days, Periods, and Classrooms	(1T) Mon5-6,Weds5-6：SCI E104
Lesson Style	Lecture	Lesson Style (More Details)	Face-to-face
Blackboard
Credits	2.0	Class Hours/Week	4	Language of Instruction	B : Japanese／English
Course Level	4 : Undergraduate Advanced
Course Area（Area）	25 : Science and Technology
Course Area（Discipline）	01 : Mathematics/Statistics
Eligible Students
Keywords	rings, modules, homological algebra
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）・Acquiring knowledge and vision on advanced theories as an extension of core theory of modern mathematics.
Class Objectives /Class Outline	This course provides an introduction to homological algebra, which can be regarded as linear algebra over rings, covering its fundamental concepts and applications.
Class Schedule	Lesson1: Review on rings and modules (1) Lesson2: Review on rings and modules (2) Lesson3: Hom modules Lesson4: Chain complexes Lesson5: Exact sequences Lesson6: Homology groups of simplicial complexes (1) Lesson7: Homology groups of simplicial complexes (2) Lesson8: Tensor products Lesson9: Projective modules and injective modules (1) Lesson10: Projective modules and injective modules (2) Lesson11: Tor modules and Ext modules (1) Lesson12: Tor modules and Ext modules (2) Lesson13: Universal coefficient theorem Lesson14: Persistent homology (1) Lesson15: Persistent homology (2)
Text/Reference Books,etc.	Handouts will be assigned during lectures. No specific textbook is fixed. Any homological algebra textbook is suitable as a study-aid book.
PC or AV used in Class,etc.	Handouts, moodle
(More Details)	Handouts
Learning techniques to be incorporated
Suggestions on Preparation and Review	After each lecture, be sure to thoroughly review the course content. In addition, working through concrete examples is helpful for better understanding.
Requirements	Although the lecture begins with a review, it is recommended that students have taken Algebra A.
Grading Method	Based on reports. Detailed explanations will be given in the class.
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.

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