Contents of Early Fourier Analysis

Early Fourier Analysis

Preface ix

0 Background 1

0.1 Elementary mathematics 1

0.2 Real analysis 3

0.3 Lebesgue measure theory 7

1 Complex numbers 9

1.1 Basics 9

1.2 Euclidean geometry via complex numbers 13

1.3 Polynomials 17

1.4 Power series 21

Notes 31

2 The Discrete Fourier Transform 33

2.1 Sums of roots of unity 33

2.2 The Transform 36

2.3 The Fast Fourier Transform 48

Notes 51

3 Fourier Coefficients and First Fourier Series 53

3.1 Definitions and basic properties 53

3.2 Other periods 68

3.3 Convolution 69

3.4 First Convergence Theorems 75

Notes 88

4 Summability of Fourier Series 91

4.1 Cesàro summability of Fourier Series 91

4.2 Special coefficients 111

4.3 Summability 120

4.4 Summability kernels 130

Notes 134

5 Fourier Series in Mean Square 135

5.1 Vector spaces of functions 135

5.2 Parseval's Identity 138

Notes 148

6 Trigonometric Polynomials 149

6.1 Sampling and interpolation 149

6.2 Bernstein's inequality 158

6.3 Real-valued and nonnegative trigonometric polynomials 162

6.4 Littlewood polynomials 165

6.5 Quantitative approximation of continuous functions 175

Notes 182

7 Absolutely Convergent Fourier Series 183

7.1 Convergence 183

7.2 Wiener's theorem 191

Notes 194

8 Convergence of Fourier Series 195

8.1 Conditions ensuring convergence 195

8.2 Functions of bounded variation 198

8.3 Examples of divergence 205

Notes 209

9 Applications of Fourier Series 211

9.1 The heat equation 211

9.2 The wave equation 213

9.3 Continuous, nowhere differentiable functions 215

9.4 Inequalities 217

9.5 Bernoulli polynomials 220

9.6 Uniform distribution 229

9.7 Positive definite kernels 239

9.8 Norms of polynomials 241

Notes 246

10 The Fourier Transform 249

10.1 Definition and basic properties 249

10.2 The inversion formula 255

10.3 Fourier transforms in mean square 263

10.4 The Poisson summation formula 270

10.5 Linear combinations of translates 277

Notes 278

11 Higher Dimensions 279

11.1 Multiple Discrete Fourier Transforms 279

11.2 Multiple Fourier Series 280

11.3 Multiple Fourier Transforms 286

Notes 290

Appendices

B The Binomial Theorem 291

B.1 Binomial coefficients 291

B.2 Binomial theorems 293

C Chebyshev polynomials 299

F Applications of the Fundamental Theorem of Algebra 309

F.1 Zeros of the derivative of a polynomial 309

F.2 Linear differential equations with constant coefficients 312

F.3 Partial fraction expansions 313

F.4 Linear recurrences 315

I Inequalities 319

I.1 The Arithmetic-Geometric Mean Inequality 319

I.2 Hölder's Inequality 325

Notes 338

293

L Topics in Linear Algebra 339

L.1 Familiar vector spaces 339

L.2 Abstract vector spaces 344

L.3 Circulant matrices 347

Notes 348

O Orders of Magnitude 349

T Trigonometry 351

T.1 Trigonometric functions in plane geometry 351

T.2 Trigonometric functions in calculus 357

T.3 Inverse trigonometric functions 364

T.4 Hyperbolic functions 369

References 377

Notation 383

Index 385

Preface		ix

0	Background	1
0.1	Elementary mathematics	1
0.2	Real analysis	3
0.3	Lebesgue measure theory	7

1	Complex numbers	9
1.1	Basics	9
1.2	Euclidean geometry via complex numbers	13
1.3	Polynomials	17
1.4	Power series	21
Notes		31

2	The Discrete Fourier Transform	33
2.1	Sums of roots of unity	33
2.2	The Transform	36
2.3	The Fast Fourier Transform	48
Notes		51

3	Fourier Coefficients and First Fourier Series	53
3.1	Definitions and basic properties	53
3.2	Other periods	68
3.3	Convolution	69
3.4	First Convergence Theorems	75
Notes		88

4	Summability of Fourier Series	91
4.1	Cesàro summability of Fourier Series	91
4.2	Special coefficients	111
4.3	Summability	120
4.4	Summability kernels	130
Notes		134

5	Fourier Series in Mean Square	135
5.1	Vector spaces of functions	135
5.2	Parseval's Identity	138
Notes		148

6	Trigonometric Polynomials	149
6.1	Sampling and interpolation	149
6.2	Bernstein's inequality	158
6.3	Real-valued and nonnegative trigonometric polynomials	162
6.4	Littlewood polynomials	165
6.5	Quantitative approximation of continuous functions	175
Notes		182

7	Absolutely Convergent Fourier Series	183
7.1	Convergence	183
7.2	Wiener's theorem	191
Notes		194

8	Convergence of Fourier Series	195
8.1	Conditions ensuring convergence	195
8.2	Functions of bounded variation	198
8.3	Examples of divergence	205
Notes		209

9	Applications of Fourier Series	211
9.1	The heat equation	211
9.2	The wave equation	213
9.3	Continuous, nowhere differentiable functions	215
9.4	Inequalities	217
9.5	Bernoulli polynomials	220
9.6	Uniform distribution	229
9.7	Positive definite kernels	239
9.8	Norms of polynomials	241
Notes		246

10	The Fourier Transform	249
10.1	Definition and basic properties	249
10.2	The inversion formula	255
10.3	Fourier transforms in mean square	263
10.4	The Poisson summation formula	270
10.5	Linear combinations of translates	277
Notes		278

11	Higher Dimensions	279
11.1	Multiple Discrete Fourier Transforms	279
11.2	Multiple Fourier Series	280
11.3	Multiple Fourier Transforms	286
Notes		290

Appendices

B	The Binomial Theorem	291
B.1	Binomial coefficients	291
B.2	Binomial theorems	293

C	Chebyshev polynomials	299

F	Applications of the Fundamental Theorem of Algebra	309
F.1	Zeros of the derivative of a polynomial	309
F.2	Linear differential equations with constant coefficients	312
F.3	Partial fraction expansions	313
F.4	Linear recurrences	315

I	Inequalities	319
I.1	The Arithmetic-Geometric Mean Inequality	319
I.2	Hölder's Inequality	325
Notes		338
293

L	Topics in Linear Algebra	339
L.1	Familiar vector spaces	339
L.2	Abstract vector spaces	344
L.3	Circulant matrices	347
Notes		348

O	Orders of Magnitude	349

T	Trigonometry	351
T.1	Trigonometric functions in plane geometry	351
T.2	Trigonometric functions in calculus	357
T.3	Inverse trigonometric functions	364
T.4	Hyperbolic functions	369

References		377

Notation		383

Index		385

Early Fourier Analysis

Contents

Home