| Program / Major | mDP | Goals |
|---|---|---|
| IoT Course | DP-4a・3 | 専門分野と他分野を関連付ける素養 主軸となる分野の専門知識を他分野と関連付ける分野横断型の知識と行動力を修得し、社会で活用できる。 |
| Software Course | DP-4b・3 | 専門分野と他分野を関連付ける素養 主軸となる分野の専門知識を他分野と関連付ける分野横断型の知識と行動力を修得し、社会で活用できる。 |
| Media Course | DP-4c・3 | 専門分野と他分野を関連付ける素養 主軸となる分野の専門知識を他分野と関連付ける分野横断型の知識と行動力を修得し、社会で活用できる。 |
| Data Science Course | DP-4d・3 | 専門分野と他分野を関連付ける素養 主軸となる分野の専門知識を他分野と関連付ける分野横断型の知識と行動力を修得し、社会で活用できる。 |
| Mechatronics Course | DP-4・3 | 専門分野と他分野を関連付ける素養 主軸となる分野の専門知識を他分野と関連付ける分野横断型の知識と行動力を修得し、社会で活用できる。 |
| Architecture and Architectural Engineering Course | DP-4a・3 | 専門分野と他分野を関連付ける素養 主軸となる分野の専門知識を他分野と関連付ける分野横断型の知識と行動力を修得し、社会で活用できる。 |
| Environmental Systems and Urban Planning Course | DP-4b・3 | 専門分野と他分野を関連付ける素養 主軸となる分野の専門知識を他分野と関連付ける分野横断型の知識と行動力を修得し、社会で活用できる。 |
| Bioscience Course | DP-4a・3 | 専門分野と他分野を関連付ける素養 主軸となる分野の専門知識を他分野と関連付ける分野横断型の知識と行動力を修得し、社会で活用できる。 |
| Biomedical Engineering Course | DP-4b・3 | 専門分野と他分野を関連付ける素養 主軸となる分野の専門知識を他分野と関連付ける分野横断型の知識と行動力を修得し、社会で活用できる。 |
| Sports Engineering Course | DP-4c・3 | 専門分野と他分野を関連付ける素養 主軸となる分野の専門知識を他分野と関連付ける分野横断型の知識と行動力を修得し、社会で活用できる。 |
| Mathematical Sciences Course | DP-4・2 | キャリアを見据えた高度な専門知識 現象の背後にある数理構造やデータのパターンを理論的に解析し、社会や自然科学、工学における複雑な課題に対して数理的視点から解決戦略を提案できる。 |
To understand the phenomena in several sciences, you understand the mathematical modelling and mathematical analysis for mathematical
models.
In this lecture, you study mathematical analysis of mathematical models in physics, chemistry, biology and so on. The main
topics are the followings: The stability theory
of dynamical systems, the behavior of solutions to the Hamilton system, gradient systems and so on.
of dynamical systems, the behavior of solutions to the Hamilton system, gradient systems and so on.
- Students should be able to understand the relationship between phenomena and mathematical models and be able to make mathematical
models for simple cases.
The student is also able to explain the background of the models. - Students will understand and be able to apply mathematical analysis techniques to understand the properties of solutions to
typical mathematical models.
Students will also be able to describe them. - The student is able to mathematically analyze typical mathematical models.
Students are also able to explain them.
| reports | Total. | |
|---|---|---|
| 1. | 30% | 30% |
| 2. | 35% | 35% |
| 3. | 35% | 35% |
| Total. | 100% | - |
Reports (include mini-exam in the class.)
Participations in group works are needed.
The achievement of students will be evaluated by exam and reports. If the score is 60% or more, you can pass.
Participations in group works are needed.
The achievement of students will be evaluated by exam and reports. If the score is 60% or more, you can pass.
| Class schedule | HW assignments (Including preparation and review of the class.) | Amount of Time Required | |
|---|---|---|---|
| 1. | Introduction Mathematical models for describing physical and chemical phenomena |
Review calculus, linear algebra probability theory and differential equations | 190minutes |
| 2. | Mathematical Modeling 2: Mathematical models for describing ecological and social phenomena | Review differential equations and review the previous notes and materials. | 190minutes |
| 3. | Mathematical Modeling 3: Group work on ecosystem models, etc. | Review the previous notes and materials. | 190minutes |
| 4. | Qualitative analysis of nonlinear differential equation systems: fixed points and linearization equations (1D) | Review the previous notes and materials. Review Taylor’s theorem. | 190minutes |
| 5. | ・Qualitative analysis of nonlinear differential equation systems: fixed points and linearization equations (multidimensional) ・Analysis of the behavior of solutions of linear models |
Review the previous notes and materials. Review Taylor’s theorem for functions of two variables. | 190minutes |
| 6. | ・Linearization matrices and eigenvalue problems ・Stability of the origin of linearized equations |
Review the previous notes and materials. Review eigenvalue problems for matrices. | 190minutes |
| 7. | Behavior of solutions around the origin of linearized equations | Review the previous notes and materials. | 190minutes |
| 8. | Analysis of typical mathematical models / Group work | Review the previous notes and materials. | 190minutes |
| 9. | Invariant sets, stable sets, unstable sets, separatrix | Review the previous notes and materials. | 190minutes |
| 10. | Gradient systems, Hamiltonian systems | Review the previous notes and materials. | 190minutes |
| 11. | Limit sets and their invariance, asymptotic behavior of solutions | Review the previous notes and materials. | 190minutes |
| 12. | Lyapunov function | Review the previous notes and materials. | 190minutes |
| 13. | Stability of periodic solutions | Review the previous notes and materials. | 190minutes |
| 14. | ・Differential equation systems with parameters, bifurcation phenomena ・Final assignment (group work) |
Review the previous notes and materials. | 190minutes |
| Total. | - | - | 2660minutes |
| ways of feedback | specific contents about "Other" |
|---|---|
| The Others | 授業内、およびScombZ/LMSにてフィードバックを行う。 |
Calculus(Multi-variable), Linear Algebra (especially Eigenvalue Problems), Differential Equations
- Course that cultivates an ability for utilizing knowledge
- Course that cultivates a basic problem-solving skills
- Course that cultivates a basic self-management skills
| Work experience | Work experience and relevance to the course content if applicable |
|---|---|
| N/A | N/A |
- 4.QUALITY EDUCATION
- 9.INDUSTRY, INNOVATION AND INFRASTRUCTURE
Last modified : Mon Mar 23 04:07:11 JST 2026