研究生课程开设申请表
开
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课院(系、所): 免费送彩金白菜网
课程申请开设类型: 新开□ 重开□ 更名□(请在□内打勾,下同)
课程 名称 | 中文 | 泛函分析与变分法 | ||||||||||
英文 | Functional AnalysisandVariational method | |||||||||||
待分配课程编号 | MS004317 | 课程适用学位级别 | 博士 | 硕士 | √ | |||||||
总学时 | √ 48 | 课内学时 | 48 | 学分 | 3 | 实践环节 | 用机小时 | |||||
课程类别 | □公共基础 □ 专业基础 □ 专业必修 □ 专业选修 | |||||||||||
开课院(系) | √ √ 免费送彩金白菜网 | 开课学期 | 秋季 | |||||||||
考核方式 | A.□笔试(□开卷 □闭卷) B. □口试 C.□笔试与口试结合 D. □其他 | |||||||||||
课程负责人 | 教师 姓名 | 孙连友 | 职称 | 副教授 | ||||||||
lianyousun@seu.edu.cn | 网页地址 | /2018/0423/c19950a213721/page.htm | ||||||||||
授课语言 | 汉语 | 课件地址 | 爱课程网站 | |||||||||
适用学科范围 | 公共 | 所属一级学科名称 | ||||||||||
实验(案例)个数 | 先修课程 | 高等数学、线性代数、数学物理方程 | ||||||||||
教学用书 | 教材名称 | 教材编者 | 出版社 | 出版年月 | 版次 | |||||||
主要教材 | 自编讲义 | 孙连友 | ||||||||||
主要参考书 | 实变函数论与泛函分析(上、下) | 夏道行等 | 高等教育出版社 | 1985 | 2st | |||||||
索伯列夫空间引论 | 李立康等 | 上海科学技术出版社 | 1981 | 1st | ||||||||
泛函分析与变分法 | 苏家铎 | 中国科学技术大学出版社 | 1993 | 1st | ||||||||
一、课程介绍(含教学目标、教学条件等)(300字以内)
本课程主要介绍工科类专业所涉及到的泛函分析概念和方法。让研究生能用泛函概念和观点理解现代分析的各种方法和应用,并进一步应用泛函方法解决各类工程问题。
教学条件:条件学生通过课程学习,理解并掌握泛函的基本概念,理解Lebesgue测度和Lebesgue积分,理解度量空间、赋范空间、Lp空间、希尔伯特空间、算子及算子空间、共轭空间、广义函数和广义函数空间以及索伯列夫空间等各类空间和其中的相关概念,以及它们的特性。了解泛函方法的一些基本应用。理解并掌握变分法,通过变分法将各种泛函方法和原理应用于解决工程问题。
二、教学大纲(含章节目录):(可附页)
绪论——数学物理方程(静电场方程)的经典解和广义解
§1 经典解
§2 广义解
§3 数值解
Lebesgue测度和Lebesgue积分
§1 Lebesgue测度
一、 Lebesgue 测度
二、Lebesgue可测集
§2 Lebesgue积分
可测函数
二、Lebesgue积分
度量空间和赋范线性空间
§1 度量空间
§2 赋范线性空间
线性空间
线性空间上的范数
三、 Lp空间
§3 度量空间的完备性及Banach空间
完备空间及性质
度量空间的完备化
稠密性(稠密性概念、可析点集)
四、Banach空间
§4 不动点原理
有界算子与泛函
§1 有界线性算子
线性算子与线性泛函概念
线性算子的有界性与连续性
三、线性算子空间
§2有界线性泛函与共轭空间
有界线性泛函
二、*共轭空间与连续线性泛函延拓
三、二次共轭空间与共轭算子
第四章 Hilbert 空间
§1 内积
内积与内积空间
二、内积与范数
§2 Hilbert空间
一、Hilbert空间
二、内积与范数
三、正交与投影
四、最小二乘法
§3标准正交系与Fourier展开
标准正交系
正交化方法
三、Fourier级数
四、完备的标准正交基及其性质
§4有界线性泛函的内积表示与自共轭空间
一、有界线性泛函及其表示(Riesz泛函表示)
二、自共轭空间
三、共轭算子的内积定义
§5 双线性Hermite泛函与自共轭算子
第五章 广义函数与索伯列夫(Sobolev)空间
§1 基本函数与广义函数
§2 广义函数的导数
§3 广义函数的Fourier变换
§4 Sobolev空间
§5 实指数Sobolev空间
§6* 嵌入定理
§7 迹定理
第六章 变分方法
§1 变分法原理及基本概念
一、函数的变分
二、泛函的变分
三、泛函极值
§2 Euler方程与奥氏方程
§3 微分方程的变分形式
§4 变分形式与双线性泛函(内积)
§5 有限维空间上的近似解与精确解的关系
第七章 求解电磁场问题的泛函方法
§1 电磁场问题的泛函模型
§2 矩量法原理
§3 加权余量法原理
§4 Ritz方法
§5 Galerkin方法
§6* 有限元方法
§7* 矢量有限元方法(Edge Element)
注:星号部分为选讲内容。
三、教学周历
周次 | 教学内容 | 教学方式 |
1 | 数学物理方程(静电场方程)的经典解和广义解,经典解,广义解,数值解, Lebesgue测度, Lebesgue可测集 | 讲课 |
2 | Lebesgue测度, Lebesgue可测集,可测函数, Lebesgue积分 | 讲课 |
3 | 度量空间,线性空间,线性空间上的范数, | 讲课 |
4 | 赋范线性空间, Lp空间 | 讲课 |
5 | 度量空间的完备性及Banach空间,完备空间及性质,度量空间的完备化, | 讲课 |
6 | 稠密性(稠密性概念、可析点集),Banach空间, 不动点原理 | 讲课 |
7 | 有界线性算子,线性算子与线性泛函概念,线性算子的有界性与连续性,线性算子空间 | 讲课 |
8 | 有界线性泛函与共轭空间,有界线性泛函,共轭空间与连续线性泛函延拓,二次共轭空间与共轭算子 | 讲课 |
9 | 内积与Hilbert空间,内积与范数, Hilbert空间,正交与投影,最小二乘法 | 讲课 |
10 | 标准正交系与Fourier展开,标准正交系,正交化方法,Fourier级数,完备的标准正交基及其性质,有界线性泛函与共轭空间。 | 讲课 |
11 | 有界线性泛函及其表示(Riesz泛函表示),共轭空间与自共轭空间,共轭算子,双线性Hermite泛函与自共轭算子 | 讲课 |
12 | 基本函数与广义函数,广义函数的导数,广义函数的Fourier变换, Sobolev空间,实指数Sobolev空间,嵌入定理, 迹定理 | 讲课 |
13 | 变分法原理及基本概念, 函数的变分,泛函的变分,泛函极值, Euler方程与奥氏方程 | 讲课 |
14 | 微分方程的变分形式,变分形式与双线性泛函(内积),有限维空间上的近似解与精确解的关系 | 讲课 |
15 | 电磁场问题的泛函模型,矩量法原理,加权余量法原理, | 讲课 |
16 | Ritz方法,Galerkin方法,有限元方法*,矢量有限元方法*(Edge Element) | 讲课 |
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注:1.以上一、二、三项内容将作为中文教学大纲,在研究生院中文网页上公布,四、五内容将保存在研究生院。2.开课学期为:春季、秋季或春秋季。3.授课语言为:汉语、英语或双语教学。4.适用学科范围为:公共,一级,二级,三级。5.实践环节为:实验、调研、研究报告等。6.教学方式为:讲课、讨论、实验等。7.学位课程考试必须是笔试。8.课件地址指在网络上已经有的课程课件地址。9.主讲教师简介主要为基本信息(出生年月、性别、学历学位、专业职称等)、研究方向、教学与科研成果,以100至500字为宜。
四、主讲教师简介:
孙连友:1990年7月毕业于复旦大学数学研究所,获硕士学位。2003年7月于跳槽彩金优惠活动的网站无线电工程系获博士学位。1990年到1998年1月期间在跳槽彩金优惠活动的网站数学系工作,从事教学和应用数学方面的研究。2005年8月至2006年8月由国家留学基金委公派到加拿大McGill大学从事博士后研究。1998年1月至今在免费送彩金白菜网工作。目前,主要从事计算电磁学数值理论和计算方法方面的教学和科研工作。在IEEE和国内核心期刊及国际会议上发表论文二十余篇,其中有十多篇篇被EI、SCI收录。合著有《电磁场边值问题的区域分解算法》,由科学出版社出版。
五、任课教师信息(包括主讲教师):
任课 教师 | 学科 (专业) | 办公 电话 | 住宅 电话 | 手机 | 电子邮件 | 通讯地址 | 邮政 编码 |
孙连友 | 电磁场与微波技术 | lianyousun@seu.edu.cn | 跳槽彩金优惠活动的网站 免费送彩金白菜网 | 210096 | |||
六、课程开设审批意见
所在院(系) 审批意见 | 负责人: 日期: |
所在学位评定分 委员会审批意见 | 分委员会主席: 日期: |
研究生院审批意见 | 负责人: 日期: |
备注 |
说明:1.研究生课程重开、更名申请也采用此表。表格下载:http:/seugs.seu.edu.cn/down/1.asp
2.此表一式三份,交研究生院、院(系)和自留各一份,同时提交电子文档交研究生院。
Application Form For Opening Graduate Courses
S
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chool (Department/Institute):
Course Type: New Open □ Reopen □ Rename □(Please tick in □, the same below)
Course Name | Chinese | 泛函分析与变分法 | |||||||||||
English | Functional AnalysisandVariational method | ||||||||||||
Course Number | Type of Degree | Ph. D | Master | √ | |||||||||
Total Credit Hours | √ 48 | In Class Credit Hours | 48 | Credit | 3 | Practice | Computer-using Hours | ||||||
Course Type | □Public Fundamental □Major Fundamental □Major Compulsory □Major Elective | ||||||||||||
School (Department) | √ | Term | Autumn | ||||||||||
Examination | A. □Paper(□Open-book □ Closed-book)B. □Oral C. □Paper-oral Combination D. □ Others | ||||||||||||
Chief Lecturer | Name | Sun Lian-you | Professional Title | Associate Professor | |||||||||
lianyousun@seu.edu.cn | Website | /2018/0423/c19950a213721/page.htm | |||||||||||
Teaching Language used in Course | Chinese | Teaching Material Website | www.icourses.cn | ||||||||||
Applicable Range of Discipline | General Course | Name of First-Class Discipline | |||||||||||
Number of Experiment | Preliminary Courses | Advanced Mathematics, Linear Algebra, Mathematical Physics Equations | |||||||||||
Teaching Books | Textbook Title | Author | Publisher | Year of Publication | Edition Number | ||||||||
Main Textbook | Teaching materials written by myself | Sun Lian-you | |||||||||||
Main Reference Books | Theory of Functions of Real Variable and Functional Analysis | Xia Dao-xing etc. | Higher Education Press | 1985 | 2st | ||||||||
Introduction of Sobolev space | Li Li-kang etc. | Shanghai Science and Technology Press | 1981 | 1st | |||||||||
Functional Analysis and Variations Method | Su Jia-yi | Press of University of Science and technology of China | 1993 | 1st | |||||||||
Course Introduction (including teaching goals and requirements) within 300 words:
The course mainly expatiates on the functional concepts and numerical methods applied to electromagnetical field problems. Students need understand and use variational principle, moment methods and weighted residual methods etc. to model the electromagnetical field problems. Furthermore, students need compare them to each other, and understand them relationships.
Teaching Syllabus (including the content of chapters and sections. A sheet can be attached):
Introduction---Classical and Generalized Solutions of Mathematical Physics Equations
§1 Classical Solutions
§2Distributions
§3Numerical Solutions
Chapter 1. Lebesgue Measure & Lebesgue Integral
§1 Lebesgue Messure
1. Lebesgue Measure
2.Lebesgue Measurable Set
§2 Lebesgue Integral
1.Measurable function
2. Lebesgue Integral
Chapter2. Metric Space & Normed Linear Space
§1 Metric Space
§2 Normed Linear Space
1. Linear Space
2. Norm on Linear Space
3. Lp Space
§3 Completeness of Metric Space and Banach Space
1. Completed Space and its Properties
2. Completion of Metric Space
3. Density(Concept of Density, Separable Metric Space)
4. Banach Space
§4 Fixed Point Theory
Chaper 3 Bounded Operator and Functional
§2 bounded Linear Operators
1. Concepts of Linear Operator and Linear Functional
2. Continuation and bound of Linear Operators
3. Space of Linear Operators
§3 Bounded Linear Functional and Conjugate Space
1. Bounded Linear Functional
2. Conjugate Spaceand Prolongation of Linear Continuous Functional
3. Quadratic Conjugate Space and Conjugate Operator
Chaper 4Hilbert Space
§1 Inner Product
1. Inner Product and Its Space
2. Inner Product and Norm
3. Space of Linear Operators
§2 Hilbert Space
1. Hilbert Space
2. Inner Product and Norm
3. Orthogonal Vector and Its Projection
4. Method of Least Squares
§3 Normal Orthogonal System and Fourier Expansion
1. Normal Orthogonal System
2. Methods of Orthogonalization
3. Fourier Series
4. Completed Normal Orthogonal System and Its Properties
§4 Bounded Linear Functional and Its Conjugate Space
1. Bounded Linear Functional and Its Representation
2. Conjugate Space and Self- Conjugate Space
3. Conjugate Operator
§5 Bilinear Hermite Functional and Self-Conjugate Operator
Chapter 5 Distribution and Sobolev Space
§1 Basic Function and Distribution
§2 Derivatives of Distribution
§3 Fourier Transformation of Distribution
§4 Sobolev Space
§5Sobolev Space With Real Exponent
§6 Embedding Theorem
§7 Trace Theorem
Chapter 6 Variational Method for Electromagnetical Field
§1 Variational Principle and Its Basic Concepts
1. Variational of Function
2. Variational of Functional
3. Extremum of Functional
§2 Euler Equations and OCTPOГPaДCКИЙEquations
§3 Variational Formula of Differential Equations
§4 Variational Formula and Bilinear Functional
§5Relationship of Solutions Between Finite Dimensional Space and Infinite Dimensional Space
Chapter 7 Numerical Methods of Electromagnetical Field Problems
§1. Moment Methods
§2. Weighted Residual Method
§3. Ritz Method
§4.Galerkin Method
§5*. Edge Element Method
§6*. Finite Element Method
Teaching Schedule:
Week | Course Content | Teaching Method |
1 | Classical Solutions of Mathematical Physics Equations(Static field), Distribution, Numerical Solution, Lebesgue Measure, Lebesgue Measurable Set | Lecture |
2 | Measurable Function, Lebesgue's Integral,Metric Space,Linear Space, Normed linear Space | Lecture |
3 | Norm on Linear Space, Lp Space | Lecture |
4 | Completeness of Metric Space, Banach Space, Complete Space and its Property | Lecture |
5 | Completion of Metric Space,Density(Concept of Density, Separable Metric Space), Fixed Point Theory | Lecture |
6 | Bounded Linear Operator, Concepts of Linear Operator and Linear Functional | Lecture |
7 | Continuation and bound of Linear Operators, Space of Linear Operators | Lecture |
8 | Bounded Linear Functional and Conjugate Space, Bounded Linear Functional,Conjugate Spaceand Prolongation of Linear Continuous Functional, Quadratic Conjugate Space and Conjugate Operator | Lecture |
9 | Inner Product and Its Space, Inner Product and Norm, Space of Linear Operators, Hilbert Space, Inner Product and Norm, Orthogonal Vector and Its Projection, Method of Least Squares | Lecture |
10 | Normal Orthogonal System and Fourier Expansion, Normal Orthogonal System, Methods of Orthogonalization, Fourier Series, Completed Normal Orthogonal System and Its Properties, Bounded Linear Functional and Its Conjugate Space | Lecture |
11 | Bounded Linear Functional and Its Representation, Conjugate Space and Self- Conjugate Space, Conjugate Operator, Bilinear Hermite Functional and Self-Conjugate Operator | Lecture |
12 | Basic Function and Distribution, Derivatives of Distribution, Fourier Transformation of Distribution, Sobolev Space, Sobolev Space With Real Exponent , Embedding Theorem, Trace Theorem | Lecture |
13 | Variational Principle and Its Basic Concepts, Variational of Function, Variational of Functional, Extremum of Functional,Euler Equations and OCTPOГPaДCКИЙEquations | Lecture |
14 | Variational Formula of Differential Equations, Variational Formula and Bilinear Functional, Relationship of Solutions Between Finite Dimensional Space and Infinite Dimensional Space | Lecture |
15 | Moment Methods, Weighted Residual Method, | Lecture |
16 | Ritz Method, Galerkin Method, Edge Element Method*, Finite Element Method* | Lecture |
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Note: 1.Above one, two, and three items are used as teaching Syllabus in Chinese and announced on the Chinese website of Graduate School. The four and five items are preserved in Graduate School.
2. Course terms: Spring, Autumn , and Spring-Autumn term.
3. The teaching languages for courses: Chinese, English or Chinese-English.
4. Applicable range of discipline: public, first-class discipline, second-class discipline, and third-class discipline.
5. Practice includes: experiment, investigation, research report, etc.
6. Teaching methods: lecture, seminar, practice, etc.
7. Examination for degree courses must be in paper.
8. Teaching material websites are those which have already been announced.
9. Brief introduction of chief lecturer should include: personal information (date of birth, gender, degree achieved, professional title), research direction, teaching and research achievements. (within 100-500 words)
Brief Introduction of Chief lecturer:
Lianyou Sun received M.Sc. degree in applied mathematics from Fudan University, Shanghai, China, in 1990. PhD degree in electromagnetic field and microwave technology from Southeast University, Nanjing, China, in 2003.
He worked at Southeast University, Nanjing, China, firstly in Department of Applied Mathematics as a lecturer from 1990 to 1997, and then in Department of Radio Engineering as a associate professor from 1998 to 2005. With Financial support of China Scholarship Council, he pursued his postdoctoral studies in computational electromagnetics at McGill University, Montreal, Canada from Aug. 2005 to Aug. 2006. His current interests are in numerical methods for electromagnetic problems, especially for large scale problems. He also is a co-authorof a book:Domain Decomposition Methods for Solving the Electromagnetic field Boundary Value Problems,Beijing, China: Science Press, 2005. He has published more than ten papers on computational electromagnetics.
Lecturer Information (include chief lecturer)
Lecturer | Discipline (major) | Office Phone Number | Home Phone Number | Mobile Phone Number | Address | Postcode | |
Sun Lianyou | Electromagnetical field & Microwave Technology | lianyousun@seu.edu.cn | 2 Si Pai Lou, School of Information Science and Engineering | 210096 |
