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LEONHARD EULER: MATHEMATICAL GENIUS IN THE ENLIGHTENMENT
Título:
LEONHARD EULER: MATHEMATICAL GENIUS IN THE ENLIGHTENMENT
Subtítulo:
Autor:
CALINGER, R
Editorial:
PRINCETON UNIVERSITY PRESS
Año de edición:
2016
Materia
MATEMATICAS - GENERAL
ISBN:
978-0-691-11927-4
Páginas:
696
56,50 €

 

Sinopsis

This is the first full-scale biography of Leonhard Euler (1707-83), one of the greatest mathematicians and theoretical physicists of all time. In this comprehensive and authoritative account, Ronald Calinger connects the story of Euler's eventful life to the astonishing achievements that place him in the company of Archimedes, Newton, and Gauss. Drawing chiefly on Euler's massive published works and correspondence, which fill more than eighty volumes so far, this biography sets Euler's work in its multilayered context-personal, intellectual, institutional, political, cultural, religious, and social. It is a story of nearly incessant accomplishment, from Euler's fundamental contributions to almost every area of pure and applied mathematics-especially calculus, number theory, notation, optics, and celestial, rational, and fluid mechanics-to his advancements in shipbuilding, telescopes, ballistics, cartography, chronology, and music theory.

The narrative takes the reader from Euler's childhood and education in Basel through his first period in St. Petersburg, 1727-41, where he gained a European reputation by solving the Basel problem and systematically developing analytical mechanics. Invited to Berlin by Frederick II, Euler published his famous Introductio in analysin infinitorum, devised continuum mechanics, and proposed a pulse theory of light. Returning to St. Petersburg in 1766, he created the analytical calculus of variations, developed the most precise lunar theory of the time that supported Newton's dynamics, and published the best-selling Letters to a German Princess-all despite eye problems that ended in near-total blindness. In telling the remarkable story of Euler and how his achievements brought pan-European distinction to the Petersburg and Berlin academies of sciences, the book also demonstrates with new depth and detail the central role of mathematics in the Enlightenment.

Ronald S. Calinger is professor emeritus of history at the Catholic University of America and the founding chancellor of the Euler Society. His books include A Contextual History of Mathematics, Vita Mathematica, and Classics of Mathematics.



TABLE OF CONTENTS:

Preface ix
Acknowledgments xv
Author´s Notes xvii
Introduction 1
1. The Swiss Years: 1707 to April 1727 4
´Das alte ehrwürdige Basel´ (Worthy Old Basel) 4
Lineage and Early Childhood 8
Formal Education in Basel 14
Initial Publications and the Search for a Position 27
2. ´Into the Paradise of Scholars´: April 1727 to 1730 38
Founding Saint Petersburg and the Imperial Academy of Sciences 40
A Fledgling Camp Divided 53
The Entrance of Euler 65
3. Departures, and Euler in Love: 1730 to 1734 82
Courtship and Marriage 87
Groundwork Research and Massive Computations 90
4. Reaching the ´Inmost Heart of Mathematics´: 1734 to 1740 113
The Basel Problem and the Mechanica 118
The Königsberg Bridges and More Foundational Work in Mathematics 130
Scientia navalis, Polemics, and the Prix de Paris 140
Pedagogy and Music Theory 150
Daniel Bernoulli and Family 160
5. Life Becomes Rather Dangerous: 1740 to August 1741 165
Another Paris Prize, a Textbook, and Book Sales 165
Health, Interregnum Dangers, and Prussian Negotiations 169
6. A Call to Berlin: August 1741 to 1744 176
´Ex Oriente Lux´: Toward a Frederician Era for the Sciences 176
The Arrival of the Grand Algebraist 185
The New Royal Prussian Academy of Sciences 189
Europe´s Mathematician, Whom Others Wished to Emulate 200
Relations with the Petersburg Academy of Sciences 211
7. ´The Happiest Man in the World´: 1744 to 1746 215
Renovation, Prizes, and Leadership 215
Investigating the Fabric of the Universe 224
Contacts with the Petersburg Academy of Sciences 234
Home, Chess, and the King 237
8. The Apogee Years, I: 1746 to 1748 239
The Start of the New Royal Academy 241
The Monadic Dispute, Court Relations, and Accolades 247
Exceeding the Pillars of Hercules in the MathematicalSciences 255
Academic Clashes in Berlin, and Euler´s Correspondence with the Petersburg Academy 279
The Euler Family 282
9. The Apogee Years, II: 1748 to 1750 285
The Introductio and Another Paris Prize 287
Competitions and Disputes 292
Decrial, Tasks, and Printing Scientia navalis 298
A Sensational Retraction and Discord 303
State Projects and the ´Vanity of Mathematics´ 308
The König Visit and Daily Correspondence 313
Family Affairs 316
10. The Apogee Years, III: 1750 to 1753 318
Competitions in Saint Petersburg, Paris, and Berlin 320
Maupertuis´s Cosmologie and Selected Research 325
Academic Administration 329
Family Life and Philidor 333
Rivalries: Euler, d´Alembert, and Clairaut 335
The Maupertuis-König Affair: The Early Second Phase 337
Two Camps, Problems, and Inventions 344
Botany and Maps 348
The Maupertuis-König Affair: The Late Second and Early Third Phases 350
Planetary Perturbations and Mechanics 359
Music, Rameau, and Basel 360
Strife with Voltaire and the Academy Presidency 363
11. Increasing Precision and Generalization in the Mathematical Sciences: 1753 to 1756 368
The Dispute over the Principle of Least Action: The Third Phase 369
Administration and Research at the Berlin Academy 374
The Charlottenburg Estate 384
Wolff, Segner, and Mayer 385
A New Correspondent and Lessons for Students 391
Institutiones calculi differentialis and Fluid Mechanics 395
A New Telescope, the Longitude Prize, Haller, and Lagrange 399
Anleitung zur Nauturlehre and Electricity and Optimism Prizes 401
12. War and Estrangement, 1756 to July 1766 404
The Antebellum Period 404
Into the Great War and Beyond 409
Losses, Lessons, and Leadership 415
Rigid-Body Disks, Lambert, and Better Optical Instruments 427
The Presidency of the Berlin Academy 430
What Soon Happened, and Denouement 432
13. Return to Saint Petersburg: Academy Reform and Great Productivity, July 1766 to 1773 451
Restoring the Academy: First Efforts 452
The Grand Geometer: A More Splendid Oeuvre 456
A Further Research Corpus: Relentless Ingenuity 471
The Kulibin Bridge, the Great Fire, and One Fewer Distraction 485
Persistent Objectives: To Perfect, to Create, and to Order 488
14. Vigorous Autumnal Years: 1773 to 1782 495
The Euler Circle 496
Elements of Number Theory and Second Ship Theory 497
The Diderot Story and Katharina´s Death 499
The Imperial Academy: Projects and Library 502
The Russian Navy, Turgot´s Request, and a Successor 504
At the Academy: Technical Matters and a New Director 506
A Second Marriage and Rapprochement with Frederick II 509
End of Correspondence and Exit from the Academy 515
Mapmaking and Prime Numbers 517
A Notable Visit and Portrait 518
Magic Squares and Another Honor 520
15. Toward ´a More Perfect State of Dreaming´: 1782 to October 1783 526
The Inauguration of Princess Dashkova 526
1783 Articles 529
Final Days 530
Major Eulogies and an Epilogue 532
Notes 537
General Bibliography of Works Consulted 571
Register of Princi