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Trigonometrical series

Antoni Zygmund — 1935

PREFACE................................... III ERRATA.................................... IV CHAPTER I. Trigonometrical series and Fourier series...... 1 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. Farseval’s relation. 1.7. Remarks on series and integrals. 1.8. Miscellaneous theorems and examples. CHAPTER II. Fourier coefficients. Tests...

Analytic functions

Stanisław SaksAntoni Zygmund — 1952

CONTENTS PREFACE................................... III PREFACE TO THE ENGLISH EDITION................................... VII INTRODUCTION. THEORY OF SETS § 1. Fundamental definitions................................... 1 § 2. Denumerable sets................................... 3 § 3. Abstract topological space................................... 4 § 4. Closed and open sets................................... 6 § 5. Connected sets................................... 11 § 6. Compact sets......................................

Funkcje analityczne

Antoni ZygmundStanisław Saks — 1938

PRZEDMOWA................. III ERRATA.................... VII WSTĘP TEORIA MNOGOŚCI § 1. Definicje podstawowe....... 1 § 2. Zbiory przeliczalne......... 3 § 3. Przestrzeń topologiczna abstrakcyjna..... 4 § 4. Zbiory domknięte i otwarte........ 6 § 5. Zbiory spójne....................... 11 § 6. Zbiory zwarte....................... 13 § 7. Przekształcenia ciągłe................ 15 § 8. Płaszczyzna........................... 17 § 9. Zbiory spójne na płaszczyźnie.......... 26 § 10. Siatki kwadratowe...

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