| Preface |
|
vii | |
|
1 Introduction and Preliminaries |
|
|
1 | (39) |
|
1.1 Summability of systems of real numbers |
|
|
2 | (2) |
|
|
|
4 | (2) |
|
|
|
6 | (3) |
|
1.4 Metric spaces and normed vector spaces |
|
|
9 | (8) |
|
|
|
17 | (2) |
|
|
|
19 | (5) |
|
|
|
24 | (11) |
|
1.8 Extension of continuous functions |
|
|
35 | (1) |
|
|
|
36 | (1) |
|
1.10 Locally compact spaces |
|
|
37 | (3) |
|
2 A Glimpse of Measure and Integration |
|
|
40 | (25) |
|
2.1 Families of sets and set functions |
|
|
40 | (3) |
|
2.2 Measurable spaces and measurable functions |
|
|
43 | (4) |
|
2.3 Measure space and integration |
|
|
47 | (2) |
|
2.4 Egoroff theorem and monotone convergence theorem |
|
|
49 | (3) |
|
2.5 Concepts related to sets of measure zero |
|
|
52 | (3) |
|
2.6 Fatou lemma and Lebesgue dominated convergence theorem |
|
|
55 | (2) |
|
2.7 The space Lp(Ω, Σ, μ,) |
|
|
57 | (4) |
|
2.8 Miscellaneous remarks |
|
|
61 | (4) |
|
3 Construction of Measures |
|
|
65 | (39) |
|
|
|
65 | (2) |
|
3.2 Lebesgue outer measure on R |
|
|
67 | (3) |
|
3.3 Σ-algebra of measurable sets |
|
|
70 | (2) |
|
3.4 Premeasures and outer measures |
|
|
72 | (8) |
|
3.5 Caratheodory measures |
|
|
80 | (2) |
|
3.6 Construction of Caratheodory measures |
|
|
82 | (2) |
|
3.7 Lebesgue--Stieltjes measures |
|
|
84 | (4) |
|
3.8 Borel regularity and Radon measures |
|
|
88 | (1) |
|
3.9 Measure-theoretical approximation of sets in Rn |
|
|
89 | (5) |
|
|
|
94 | (5) |
|
3.11 Existence of nonmeasurable sets |
|
|
99 | (1) |
|
3.12 The axiom of choice and maximality principles |
|
|
100 | (4) |
|
4 Functions of Real Variables |
|
|
104 | (75) |
|
|
|
104 | (2) |
|
4.2 Riemann and Lebesgue integral |
|
|
106 | (4) |
|
4.3 Push-forward of measures and distribution of functions |
|
|
110 | (4) |
|
4.4 Functions of bounded variation |
|
|
114 | (5) |
|
4.5 Riemann-Stieltjes integral |
|
|
119 | (7) |
|
4.6 Covering theorems and differentiation |
|
|
126 | (14) |
|
4.7 Differentiability of functions of a real variable and related functions |
|
|
140 | (10) |
|
4.8 Product measures and Fubini theorem |
|
|
150 | (6) |
|
4.9 Smoothing of functions |
|
|
156 | (4) |
|
4.10 Change of variables for multiple integrals |
|
|
160 | (8) |
|
4.11 Polar coordinates and potential integrals |
|
|
168 | (11) |
|
5 Basic Principles of Linear Analysis |
|
|
179 | (47) |
|
5.1 The Baire category theorem |
|
|
179 | (5) |
|
5.2 The open mapping theorem |
|
|
184 | (1) |
|
5.3 The closed graph theorem |
|
|
185 | (2) |
|
5.4 Separation principles |
|
|
187 | (9) |
|
5.5 Complex form of Hahn--Banach theorem |
|
|
196 | (2) |
|
|
|
198 | (6) |
|
5.7 Lebesgue--Nikodym theorem |
|
|
204 | (3) |
|
5.8 Orthonormal families and separability |
|
|
207 | (4) |
|
|
|
211 | (10) |
|
|
|
221 | (5) |
|
|
|
226 | (39) |
|
|
|
226 | (3) |
|
6.2 Signed and complex measures |
|
|
229 | (13) |
|
6.3 Linear functionals on Lp |
|
|
242 | (5) |
|
6.4 Modular distribution function and Hardy--Littlewood maximal function |
|
|
247 | (5) |
|
|
|
252 | (6) |
|
6.6 The Sobolev space Wk,p(Ω) |
|
|
258 | (7) |
|
7 Fourier Integral and Sobolev Space Hs |
|
|
265 | (34) |
|
7.1 Fourier integral for L1 functions |
|
|
265 | (9) |
|
7.2 Fourier integral on L2 |
|
|
274 | (3) |
|
|
|
277 | (3) |
|
7.4 Weak solutions of the Poisson equation |
|
|
280 | (5) |
|
7.5 Fourier integral of probability distributions |
|
|
285 | (14) |
| Postscript |
|
299 | (2) |
| Bibliography |
|
301 | (2) |
| List of Symbols |
|
303 | (4) |
| Index |
|
307 | |
