Book:Antoni Zygmund/Trigonometrical Series

Subject Matter

 * Trigonometrical Series

Contents

 * Preface


 * CHAPTER I. Trigonometrical series and Fourier series
 * 1.1. Definitions. - 1.2. Abel s transformation. - 1.3. Orthogonal systems of functions. Fourier series. - 1.4. The trigonometrical system - .1.5. Completness of the trigonometrical system. - 1.6. Bessel's inequality. Parseval's relation. - 1.7. Remark: on series and integrals - .1.8. Miscellaneous theorems and examples.


 * CHAPTER II. Fourier coefficients. Tests for the convergence on Fourier series
 * 2.1. Operations on Fourier series. - 2.2. Modulus of continuity. Fourier coefficients. - 2.3. Formulae for partial sums. - 2.4. Dini's test. - 2.5. Theorems on localization. - 2.6. Functions of bounded variation. - 2.7. Tests of Lebesgue and Dini-Lipschitz. - 2.8. Tests of de la Vallée-Poussin, Young, and Hardy and Littlewood. - 2.9. Miscellaneous theorems and examples.


 * CHAPTER III. Summability of Fourier series
 * 3.1. Toeplitz matrices. Abel and Cesàro means. - 3.2. Fejér's theorem. - 3.3. Summability $$(C, r)$$ of Fourier series and conjugate series - 3.4. Abel's summability. - 3.5. The Cesàro summation of differentiated series. - 3.6. Fourler sine series. - 3.7. Convergence factors. - 3.8. Summability of Fourier-Stieltjes series. - 3.9. Miscellaneous theorems and examples.


 * CHAPTER IV. Classes on functions and Fourier series
 * 4.1. Inequalities. - 4 2. Mean convergence. The Riesz-Fiseher theorem. - 4.3. Classes $$B$$, $$C$$, $$S$$, and $$L_\varphi$$ of functions. - 3.4. Parseval's relations. - 4.5. Linear operations. - 4.6 Transformations of Fourier series. - 4.7. Miscellaneous theorems and examples.


 * CHAPTER V. Properties of some special series
 * 5.1. Series with coefficients monotonically tending to $$0$$. - 5.2. Approximate expressions for such series. - 5.3. A power series. - 5.4. Lacunary series. - 5.5. Rademacher's series. - 5 6. Applications of Rademacher's functions. - 5.7. Miscellaneous theorems and examples.


 * CHAPTER VI. The absolute convergence of trigonometrical series
 * 6.1. The Lusin-Denjoy theorem. - 6.2. Fatou's theorems. - 6.3. The absolute convergence of Fourier series. - 6.4. Szidon's theorem on lacunary series. - 6.5. The theorems of Wiener and Lévy. - 6.6. Miscellaneous theorems and examples.


 * CHAPTER VII. Conjugate series and complex methods in the theory of Fourier series
 * 7.1. Suitability of conjugate series. - 7.2. Conjugate series and Fourier series. - 7.3. Mean convergence of Fourier series. - 7.4. Privaloff's theorem. - 7.5. Power series of bounded variation. - 7.6. Miscellaneous theorems and examples.


 * CHAPTER VIII. Divergence on Fouler series. Gibbs's phenomenon
 * 8.1. Continuous functiona with divergent Fourier series. - 8.2. A theorem of Faber and Lebesgue. - 8.3. Lebesgue's constants. - 8.4. Kolmogoroff's example. - 8.5. Gibbs's phenomenon. - 8.6. Theorems of Rogosinski. - 8.7. Cramér's theorem. - 8.8. Miscellaneous theorems and examples.


 * CHAPTER IX. Further theorems on Fourier coefficients. Integration of fractional order
 * 9.1. Remarks on the theorems of Hausdorff-Young and F. Riesz. - 9.2. M. Riesz's convexity theorems. - 9.3. Proof of F. Riesz's theorem. - 9.4. Theorems of Paley. - 9.5. Theorems of Hardy and Littlewood. - 9.6. Banach's theorems on lacunary coefficients. - 9.7. Wiener's theorem on functions of bounded variation. - 9.8. Integrals of fractional order. - 9.9. Miscellaneous theorems and examples.


 * CHAPTER X. Further theorems on the summability and convergence of Fourier series
 * 10.1. An extension of Fejér's theorem. - 10.2. Maximal theorems of Hardy and Littlewood. - 10.3. Partial sums of $$\mathfrak S [f]$$ for $$f \in L^2$$. - 10.4. Summability $$C$$ of Fourier series. - 10.5. Miscellaneous theorems and examples.


 * CHAPTER XI. Riemannian theory of trigonometrical series
 * 11.1. The Cantor-Lebesgue theorem and its generalization. - 11.2. Riemann's and Fatou's theorems. - 11.3. Theorems of uniqueness. - 11.4. The principle of localisation. Rajchman's theory of formal multiplication. - 11.5. Sets of uniqueness and gets of multiplicity. - 11.6. Uniqueness in the case of summable series. - 11.7. Miscellaneous theorems and examples.


 * CHAPTER XII. Fourier's integral
 * 12.1. Fourier's single integral. - 12.2. Fourier's repeated integral. - 12.3. Summability of integrals. - 12.4. Fourier transforms.


 * TERMINOLOGICAL INDEX, NOTATIONS


 * BIBLIOGRAPHY