%0 Journal Article %1 mackey1980harmonic %A Mackey, George W. %D 1980 %I American Mathematical Society %J Bulletin (New Series) of the American Mathematical Society %K Fourier_transform harmonic_analysis representation_theory review %N 1.P1 %P 543 -- 698 %R bams/1183546470 %T Harmonic analysis as the exploitation of symmetry--a historical survey %U https://projecteuclid.org/journals/bulletin-of-the-american-mathematical-society-new-series/volume-3/issue-1.P1/Harmonic-analysis-as-the-exploitation-of-symmetrya-historical-survey/bams/1183546470.full %V 3 %X Preface 1. Introduction 2. The Characters of Finite Groups and the Connection with Fourier Analysis 3. Probability Theory Before the Twentieth Century 4. The Method of Generating Functions in Probability Theory 5. Number Theory Before 1801 6. The Work of Gauss and Dirichlet and the Introduction of Characters and Harmonic Analysis into Number Theory 7. Mathematical Physics Before 1807 8. The Work of Fourier, Poisson, and Cauchy, and Early Applications of Harmonic Analysis to Physics 9. Harmonic Analysis, Solutions by Definite Integrals, and the Theory of Functions of a Complex Variable 10. Elliptic Functions and Early Applications of the Theory of Functions of a Complex Variable to Number Theory 11. The Emergence of the Group Concept 12. Introduction to Sections 13-16 13. Thermodynamics, Atoms, Statistical Mechanics, and the Old Quantum Theory 14. The Lebesgue Integral, Integral Equations, and the Development of Real and Abstract Analysis 15. Group Representations and Their Characters 16. Group Representations in Hilbert Space and the Discovery of Quantum Mechanics 17. The Development of the Theory of Unitary Group Representations Be- tween 1930 and 1945 18. Harmonie Analysis in Probability; Ergodic Theory and the Generalized Harmonie Analysis of Norbert Wiener 19. Early Application of Group Representations to Number Theory—The Work of Artin and Hecke 20. Idèles, Adèles, and Applications of Pontrjagin-van Kampen Duality to Number Theory, Connections with Almost-Periodic Functions, and the Work of Hardy and Littlewood 21. The Development of the Theory of Unitary Group Representations af- ter 1945—A Brief Sketch with Emphasis on the First Decade 22. Applications of the General Theory 23. Summary and Conclusion Notes Bibliography

@article{mackey1980harmonic, abstract = {Preface 1. Introduction 2. The Characters of Finite Groups and the Connection with Fourier Analysis 3. Probability Theory Before the Twentieth Century 4. The Method of Generating Functions in Probability Theory 5. Number Theory Before 1801 6. The Work of Gauss and Dirichlet and the Introduction of Characters and Harmonic Analysis into Number Theory 7. Mathematical Physics Before 1807 8. The Work of Fourier, Poisson, and Cauchy, and Early Applications of Harmonic Analysis to Physics 9. Harmonic Analysis, Solutions by Definite Integrals, and the Theory of Functions of a Complex Variable 10. Elliptic Functions and Early Applications of the Theory of Functions of a Complex Variable to Number Theory 11. The Emergence of the Group Concept 12. Introduction to Sections 13-16 13. Thermodynamics, Atoms, Statistical Mechanics, and the Old Quantum Theory 14. The Lebesgue Integral, Integral Equations, and the Development of Real and Abstract Analysis 15. Group Representations and Their Characters 16. Group Representations in Hilbert Space and the Discovery of Quantum Mechanics 17. The Development of the Theory of Unitary Group Representations Be- tween 1930 and 1945 18. Harmonie Analysis in Probability; Ergodic Theory and the Generalized Harmonie Analysis of Norbert Wiener 19. Early Application of Group Representations to Number Theory—The Work of Artin and Hecke 20. Idèles, Adèles, and Applications of Pontrjagin-van Kampen Duality to Number Theory, Connections with Almost-Periodic Functions, and the Work of Hardy and Littlewood 21. The Development of the Theory of Unitary Group Representations af- ter 1945—A Brief Sketch with Emphasis on the First Decade 22. Applications of the General Theory 23. Summary and Conclusion Notes Bibliography}, added-at = {2021-09-27T00:34:31.000+0200}, author = {Mackey, George W.}, biburl = {https://www.bibsonomy.org/bibtex/2e187d08d70b3100fc7d0b905c1804a0f/peter.ralph}, doi = {bams/1183546470}, interhash = {d94ea7f21e11866405a526e7dcfe908f}, intrahash = {e187d08d70b3100fc7d0b905c1804a0f}, journal = {Bulletin (New Series) of the American Mathematical Society}, keywords = {Fourier_transform harmonic_analysis representation_theory review}, number = {1.P1}, pages = {543 -- 698}, publisher = {American Mathematical Society}, timestamp = {2021-09-27T00:34:31.000+0200}, title = {Harmonic analysis as the exploitation of symmetry--a historical survey}, url = {https://projecteuclid.org/journals/bulletin-of-the-american-mathematical-society-new-series/volume-3/issue-1.P1/Harmonic-analysis-as-the-exploitation-of-symmetrya-historical-survey/bams/1183546470.full}, volume = 3, year = 1980 }