2019 Set and Topology II

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Academic unit or major
Undergraduate major in Mathematical and Computing Science
Instructor(s)
Murofushi Toshiaki  Tsuchioka Shunsuke 
Course component(s)
Lecture
Day/Period(Room No.)
Mon5-6(W833)  Thr3-4(W833)  
Group
-
Course number
MCS.T221
Credits
2
Academic year
2019
Offered quarter
3Q
Syllabus updated
2019/3/18
Lecture notes updated
2019/11/21
Language used
Japanese
Access Index

Course description and aims

The set and topology play an important role in mathematical and computing science. The objective of this course is to explain the fundamentals of the point set topology based on the knowledge about set provided in "Set and Topology I" in the first quarter, and also for the students to built backgrounds to apply the idea of point set topology in mathematical and computing science.

Student learning outcomes

The students are expected to understand the fundamentals of mathematical methods to handle topological structure appeared in mathematical and computing science and also to be able to apply them to practical problems.

Keywords

topology, topological space, neighborhood, continuous, Hausdorff space, separation axioms, connected, compact, complete

Competencies that will be developed

Intercultural skills Communication skills Specialist skills Critical thinking skills Practical and/or problem-solving skills
- - -

Class flow

The lectures provide the fundamentals of the point set topology. The students are strongly encouraged to register for "MCS.T222:Exercises in Set and Topology II" simultaneously which offers the recitation session for this course.

Course schedule/Required learning

  Course schedule Required learning
Class 1 Euclidean Space Understand the contents covered by the lecture.
Class 2 Metric Space and Topological Space Understand the contents covered by the lecture.
Class 3 Basis and Neighborhood System Understand the contents covered by the lecture.
Class 4 Continuous Map Understand the contents covered by the lecture.
Class 5 Induced Topology Understand the contents covered by the lecture.
Class 6 Product Topology Understand the contents covered by the lecture.
Class 7 Hausdorff Space Understand the contents covered by the lecture.
Class 8 Review and Midterm Examination Confirm your current understanding after reviewing the materials covered by the first half of the course.
Class 9 Normal Space and Regular Space Understand the contents covered by the lecture.
Class 10 Separation Axiom and Continuous Map Understand the contents covered by the lecture.
Class 11 Connectivity Understand the contents covered by the lecture.
Class 12 Compactness Understand the contents covered by the lecture.
Class 13 Property of Compact Space Understand the contents covered by the lecture.
Class 14 Completeness of Metric Space Understand the contents covered by the lecture.
Class 15 Completion of Metric Space Understand the contents covered by the lecture.

Textbook(s)

"Set and Topological Space (in Japanese)" by Shigeyuki Morita published by Aasakura Shoten.

Reference books, course materials, etc.

Not specified in particular.

Assessment criteria and methods

By scores of midterm and final examinations. If you register for "MCS.T222:Exercises in Set and Topology II", its score will be counted as a part of contributions also. Details will be announced in the first lecture.

Related courses

  • MCS.T201 : Set and Topology I
  • MCS.T202 : Exercises in Set and Topology I
  • MCS.T222 : Exercises in Set and Topology II

Prerequisites (i.e., required knowledge, skills, courses, etc.)

The students are encouraged to take "MCS.T201:Set and Topology I" and "MCS.T202:Exercises in Set and Topology I" before registering for this course. Also, those who register for this course are strongly encouraged to do for "MCS.T222:Exercises in Set and Topology II" simultaneously.

Contact information (e-mail and phone)    Notice : Please replace from "[at]" to "@"(half-width character).

Toshiaki Murofushi (murofusi[at]c.titech.ac.jp)

Office hours

To be announced in the first lecture.

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