|
課程名稱 |
實分析一
Real Analysis (Ⅰ) |
|
開課學期 |
111-1 |
|
授課對象 |
理學院 應用數學科學研究所 |
|
授課教師 |
陳俊全 |
|
課號 |
MATH7201 |
|
課程識別碼 |
221 U2870 |
|
班次 |
|
|
學分 |
3.0 |
|
全/半年 |
半年 |
|
必/選修 |
必修 |
|
上課時間 |
星期一3,4(10:20~12:10)星期三3,4(10:20~12:10) |
|
上課地點 |
天數101天數101 |
|
備註 |
總人數上限:65人
外系人數限制:20人 |
|
|
|
|
課程簡介影片 |
|
|
核心能力關聯 |
核心能力與課程規劃關聯圖 |
|
課程大綱
|
|
為確保您我的權利,請尊重智慧財產權及不得非法影印
|
|
課程概述 |
The first semester of this course will cover the following topics :
1. Measure Theory: outer measure, Caratheodory outer measures, n-dimensional Lebesgue measure
2. Integration Theory: measurable functions, Lebesgue integral, monotone convergence and Lebesgue dominated convergence theorem,
Fubini’s theorem
3. Elements of Functional Analysis: Baire Category Theorem and its consequences, open mapping theorem and closed graph theorem,
separation principles and Hahn-Banach theorem, Hilbert spaces
The topics in the second semester will include:
4. Differentiation and Integration: Hardy-Littlewood maximal function, Lebesgue differentiation theorem, functions of bounded variation,
absolutely continuous functions, differentiability of functions
5. L^p spaces
6. Abstract Measure and Signed Measures: absolute continuity, Radon-Nikodym Theorem
7. Convolution operators and Fourier Transform
|
|
課程目標 |
Course Goal:This course aims to introduce basic theory and techniques of modern analysis. |
|
課程要求 |
Introduction to Mathematical Analysis I, II; Linear Algebra
|
|
預期每週課後學習時數 |
|
|
Office Hours |
另約時間 備註: TA's email
吳悠:R10221008@ntu.edu.tw
閻天立:R09221014@ntu.edu.tw |
|
指定閱讀 |
|
|
參考書目 |
(1) Fon-Che Liu, Real Analysis, Oxford University Press (2) Elias M. Stein and Rami Shakarchi, Real Analysis |
|
評量方式
(僅供參考) |
|
No. |
項目 |
百分比 |
說明 |
|
1. |
Homework |
30% |
|
2. |
Midterm Exam |
30% |
|
3. |
Final Exam |
40% |
|
|
|
週次 |
日期 |
單元主題 |
|
第1週 |
9/5-9/7 |
0. Introduction:
Background and motivation:
(0) continuous nowhere differentiable functions, functions of bounded
variation, Cantor's set, a space-filling curve, Borel's measurable
sets, Lebesgue's theory, non-measurable sets
(1) Length, area, volume
(2) Fourier series
(3) Limits of Integrals
1. Measure theory
1-1 Properties of area (length, volume)
1-2 Rectangles and open sets |
|
第2週 |
9/12-9/14 |
1. Measure theory
1-3 Jordan exterior (outer) measure
1-4 Lebesgue exterior (outer) measure
Examples, Cantor set,
Equivalent definitions of the Lebesgue exterior measure
Properties of exterior measure: monotonicity, sub-additivity |
|
第3週 |
9/19-9/21 |
1-4 Lebesgue exterior (outer) measure
Properties of exterior measure: monotonicity, sub-additivity,
open sets approximation, disjoint sets with a distance
1-5 Measurable sets and the Lebesgue measure
Motivation
Basic properties:
(1) Open sets, measure zero sets, and closed sets are measurable.
(2) A countable union of measurable sets is measurable. |
|
第4週 |
9/26-9/28 |
1-5 Measurable sets and the Lebesgue measure
(3) The complement of a measurable is measurable
(4) A countable intersection of measurable sets is measurable.
Theorem: Countable additivity holds for disjoint measurable sets
Sigma-algebra |
|
第5週 |
10/3-10/5 |
1-5 Measurable sets and the Lebesgue measure
- Increasing and decreasing sequences of sets
- sigama-algebra and Borel sets: G_delta sets and F_sigma sets, relation
between Borel sets and Lebesgue measurable sets
- Non-measurable sets |
|
第6週 |
10/10-10/12 |
- Invariance properties: translation, reflection, dilation
- Caratheodory measurable |
|
第7週 |
10/17-10/19 |
1-6 Measurable function
- Riemann integral and Lebesgue integral
- Definition: equivalent definitions
- Continuous functions are measurable
- sup, inf , limsup, liminf, and lim of measurable functions
- sum and product of measurable functions |
|
第8週 |
10/24-10/26 |
- measure zero
- almost everywhere
1-7 Approximation by simple functions and step functions
- approximation by simple function |
|
第9週 |
10/31-11/1 |
- approximation by step functions
- midterm examination |
|
第10週 |
11/7-11/9 |
1-8 Littlewood's three principles
- Egorov's Theroem
- Lusin's Theorem
- Littlewood's three principles
Chapter 2 Integration Theorey
2-1 The Lebesgue integral
- 4 steps: simple function, bounded functions supported on a set of
finite measure, non-negative functions, general functions |
|
第11週 |
11/14-11/16 |
- Step 1 simple functions: Independence of representation, linearity,
additivity, monotonicity, triangle inequality
- Step 2 bounded functions supported on a set of finite measure: limit of
the integrals of convergent simple functions |
|
第12週 |
11/21-11/23 |
- Step 2 bounded functions supported on a set of finite measure:
linearity, additivity, monotonicity, triangle inequality, Bounded
Convergent Theorem, Riemann integrable implies Lebesgue
integrable
- Step 3 nonnegative functions: linearity, additivity, monotonicity, |
|
第13週 |
11/28-11/30 |
- Step 3 Fatou's lemma, Monotone Convergence Theorem
- Step 4 general case: integrable functions, linearity, additivity,
monotonicity, Dominated Convergence Theorem, invariance
properties
2-2 L1 space: completeness of L1 |
|
第14週 |
12/5-12/7 |
2-2 L1 space: convergence in L1 implies convergence of a subsequence almost everywhere; approximation by simple functions, step functions, or continuous functions of compact support; invariance properties; complex valued functions |
|
第15週 |
12/12-12/14 |
2-3 Fubini's Theorem: statement and proof |
|