线性代数II综合大纲

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《线性代数II》教学大纲

一、课程基本信息

开课单位:	数学科学研究所	课程代码:	MATH1122
课程名称:	线性代数II	英文名称:	Linear Algebra II
学分:	4	学时:	64
授课对象:		授课语言:	中英文
先修课程:	线性代数I

二、课程简介和教学目的

This is an advanced course of “Linear Algebra, I”, and we will take a more abstract view of points on the subjects in linear algebra. That is to say, we will begin with notions of vector spaces and linear maps. They are actually the abstract version of R^n and matrices. Then we will go through different types of vector spaces, like inner product spaces, real and complex vector spaces. Finally, we hope to end up with the studying of operators on the  these special vector spaces. This course is the preparation for more advanced courses like “Algebra” and “Functional Analysis”.

三、教学内容、教学方式和学时安排

(each table is for 1 week, 4 periods )

Chapter 1	Vector Spaces
1.1	Real and complex numbers
1.2	Definition of vector spaces
1.3	Subspaces

Chapter 2	Finite-dimensional vector spaces
2.1	Span and linear independence
2.2	Bases
2.3	Dimension

Chapter 3	Linear Maps
3.1	The vector spaces of Linear Maps
3.2	Null spaces and Ranges
3.3	Matrices

Chapter 4	More on Linear Maps
4.1	Isomorphisms
4.2	Products and Quotients
4.3	Duality

Chapter 5	Polynomials
5.1	Uniqueness of coefficients for Polynomials
5.2	The Division Algorithm
5.3	Factorization of Polynomials

Chapter 6	Invariant Subspaces
6.1	Invariant subspaces
6.2	Eigenvectors and Eigenvalues
6.3	Polynomials applied to operators

Chapter 7	Upper-Triangluar Matrices
7.1	Existence of eigenvalues
7.2	Upper-Triangluar Matrices
7.3	Diagonal Matrices

Chapter 8	Inner product spaces
8.1	Inner products and Norms
8.2	Orthonormal Bases
8.3	Orthonormal complements

Chapter 9	Operators on Inner product spaces
9.1	Self-adjoint operators
9.2	Normal operators
9.3	The Spectral Theorem

Chapter 10	Positive Operators
10.1	Positive operators
10.2	Polar Decomposition
10.3	Singular Value Decomposition

Chapter 11	Operators on complex vector spaces
11.1	Nilpotent operators
11.2	Generalized eignevectors
11.3	Decomposition of an operator
11.4

Chapter 12	More on complex vector spaces
12.1	Square root of metrices
12.2	Block Matrices
12.3	Characteristic Polynomials

Chapter 13	Jordan Forms
13.1	Minimal Polynomials
13.2	Jordan blocks
13.3	Jordan decomposition

Chapter 14	Operator on Real Vector spaces
14.1	Complexification of a vector space
14.2	Complexification of an operator

Chapter 15	Complexification continued
15.1	The minimal Polynomial of the complexification
15.2	Characteristic Polynomial of the complexification

Chapter 16	Traces and Determinant
16.1	Change of basis
16.2	Determinant of an operator
Final Exam	The 17th. Week

四、推荐教材

书名	作者	译者	出版社	出版时间	ISBN
Linear Algebra Done Right	Sheldon Axler		Springer; 3rd Edition	November 14, 2016	3319307657

五、参考书目

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