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- Liberal arts and basic science courses
- Academic unit or major
- Graduate major in Mathematics
- Instructor(s)
- Tonegawa Yoshihiro Kohsaka Yoshihito
- Class Format
- Lecture
- Media-enhanced courses
- Day/Period(Room No.)
- Intensive ()
- Group
- -
- Course number
- MTH.E647
- Credits
- 2
- Academic year
- 2018
- Offered quarter
- 1Q
- Syllabus updated
- 2018/3/20
- Lecture notes updated
- -
- Language used
- Japanese
- Access Index
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Course description and aims
The main theme of this lecture is analysis of geometrical evolution equations based on analytical method of nonlinear partial differential equations. As a geometrical evolution equation, let us consider the mean curvature flow as the object of analysis and consider the case where three hypersurfaces that move due to mean curvature flow intersect each other. First, we learn how to express mean curvature, and derive initial value and boundary value problem of system of nonlinear parabolic partial differential equations from the problem of mean curvature flow in the above setting. For the initial value and boundary value problem of the nonlinear parabolic partial differential equation obtained, applying the analytical method of nonlinear partial differential equation, we clarify the existence of time local solution.
In this lecture, we will learn how to derive geometric quantities for hypersurfaces and prove the existence of temporal local solutions of nonlinear parabolic partial differential equations.
Student learning outcomes
· The mean curvature can be derived for a given hypersurface.
· It is possible to understand linearization of nonlinear problem and the analytical method on the linearization problem.
· You can understand the existence proof of the time local solution of the nonlinear problem using the fixed point theorem.
Keywords
Hypersurface, mean curvature, parabolic partial differential equation, fixed point theorem
Competencies that will be developed
| ✔ Specialist skills | Intercultural skills | Communication skills | Critical thinking skills | Practical and/or problem-solving skills |
Class flow
In an ordinary lecture format. Also, issue reports as appropriate.
Course schedule/Required learning
| Course schedule | Required learning | |
|---|---|---|
| Class 1 | Mean curvature flow and derivation of mean curvature for hypersurface I. | Details will be provided during each class session |
| Class 2 | Mean curvature flow and derivation of mean curvature for hypersurface II. | Details will be provided during each class session |
| Class 3 | Mean curvature flow and derivation of mean curvature for hypersurface III. | Details will be provided during each class session |
| Class 4 | Mean curvature flow and derivation of mean curvature for hypersurface IV. | Details will be provided during each class session |
| Class 5 | Derivation of initial value and boundary value problem of nonlinear parabolic partial differential equation and its linearization I. | Details will be provided during each class session |
| Class 6 | Derivation of initial value and boundary value problem of nonlinear parabolic partial differential equation and its linearization II. | Details will be provided during each class session |
| Class 7 | Derivation of initial value and boundary value problem of nonlinear parabolic partial differential equation and its linearization III. | Details will be provided during each class session |
| Class 8 | Derivation of initial value and boundary value problem of nonlinear parabolic partial differential equation and its linearization IV. | Details will be provided during each class session |
| Class 9 | Analysis on the linearization problem I. | Details will be provided during each class session |
| Class 10 | Analysis on the linearization problem II. | Details will be provided during each class session |
| Class 11 | Analysis on the linearization problem III. | Details will be provided during each class session |
| Class 12 | Proof of existence of time local solution of nonlinear problem using fixed point theorem I. | Details will be provided during each class session |
| Class 13 | Proof of existence of time local solution of nonlinear problem using fixed point theorem II. | Details will be provided during each class session |
| Class 14 | Proof of existence of time local solution of nonlinear problem using fixed point theorem III. | Details will be provided during each class session |
| Class 15 | Proof of existence of time local solution of nonlinear problem using fixed point theorem IV. | Details will be provided during each class session |
Textbook(s)
Note specified.
Reference books, course materials, etc.
「Partial Differential Equations」 L. C. Evans, AMS
「Parabolic Boundary Value Problems」 S. D. Eidelman, N. Z. Zhitarashu, Birkhauser
Assessment criteria and methods
By evaluating reports.
Related courses
- MTH.C341 : Differential Equations I
- MTH.C342 : Differential Equations II
Prerequisites (i.e., required knowledge, skills, courses, etc.)
Students are expected to have passed Differential Equations I and Differential Equations II.
