Adrien-Marie Legendre
Adrien-Marie Legendre | |
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École Polytechnique |
Adrien-Marie Legendre (/ləˈʒɑːndər, -ˈʒɑːnd/;[3] French: [adʁiɛ̃ maʁi ləʒɑ̃dʁ]; 18 September 1752 – 9 January 1833) was a French mathematician who made numerous contributions to mathematics. Well-known and important concepts such as the Legendre polynomials and Legendre transformation are named after him. He is also known for his contributions to the method of least squares, and was the first to officially publish on it, though Carl Friedrich Gauss had discovered it before him.[4][5]
Life
Adrien-Marie Legendre was born in
The
He assisted with the
Legendre lost his private fortune in 1793 during the French Revolution. That year, he also married Marguerite-Claudine Couhin, who helped him put his affairs in order. In 1795, Legendre became one of six members of the mathematics section of the reconstituted Académie des Sciences, renamed the Institut National des Sciences et des Arts. Later, in 1803, Napoleon reorganized the Institut National, and Legendre became a member of the Geometry section. From 1799 to 1812, Legendre served as mathematics examiner for graduating artillery students at the École Militaire and from 1799 to 1815 he served as permanent mathematics examiner for the
Legendre died in Paris on 9 January 1833, after a long and painful illness, and Legendre's widow carefully preserved his belongings to memorialize him. Upon her death in 1856, she was buried next to her husband in the village of Auteuil, where the couple had lived, and left their last country house to the village. Legendre's name is one of the 72 names inscribed on the Eiffel Tower.
Mathematical work
His major work is Exercices de Calcul Intégral, published in three volumes in 1811, 1817 and 1819. In the first volume he introduced the basic properties of elliptic integrals, beta functions and gamma functions, introducing the symbol Γ normalizing it to Γ(n+1) = n!. Further results on the beta and gamma functions along with their applications to mechanics – such as the rotation of the earth, and the attraction of ellipsoids – appeared in the second volume.[10] In 1830, he gave a proof of Fermat's Last Theorem for exponent n = 5, which was also proven by Lejeune Dirichlet in 1828.[10]
In
Legendre did an impressive amount of work on
He is known for the Legendre transformation, which is used to go from the Lagrangian to the Hamiltonian formulation of classical mechanics. In thermodynamics it is also used to obtain the enthalpy and the Helmholtz and Gibbs (free) energies from the internal energy. He is also the namesake of the Legendre polynomials, solutions to Legendre's differential equation, which occur frequently in physics and engineering applications, such as electrostatics.
Legendre is best known as the author of Éléments de géométrie, which was published in 1794 and was the leading elementary text on the topic for around 100 years. This text greatly rearranged and simplified many of the propositions from Euclid's Elements to create a more effective textbook.
Honors
- Foreign Honorary Member of the American Academy of Arts and Sciences (1832)[11]
- The Moon crater Legendre is named after him.
- Main-belt asteroid 26950 Legendreis named after him.
- Legendre is one of the 72 prominent French scientists who were commemorated on plaques at the first stage of the Eiffel Tower when it first opened.
Publications
- Essays
- 1782 Recherches sur la trajectoire des projectiles dans les milieux résistants (prize on projectiles offered by the Berlin Academy)
- Books
- Eléments de géométrie, textbook 1794
- Essai sur la Théorie des Nombres 1797-8 ("An VI"), 2nd ed. 1808, 3rd ed. in 2 vol. 1830
- Nouvelles Méthodes pour la Détermination des Orbites des Comètes, 1805
- Exercices de Calcul Intégral, book in three volumes 1811, 1817, and 1819
- Traité des Fonctions Elliptiques, book in three volumes 1825, 1826, and 1830
- Memoires in Histoire de l'Académie Royale des Sciences
- 1783 Sur l'attraction des Sphéroïdes homogènes (work on Legendre polynomials)
- 1784 Recherches sur la figure des Planètes p. 370
- 1785 Recherches d'analyse indéterminée p. 465 (work on number theory)
- 1786 Mémoire sur la manière de distinguer les Maxima des Minima dans le Calcul des Variations p. 7 (as Legendre)
- 1786 Mémoire sur les Intégrations par arcs d'ellipse p. 616 (as le Gendre)
- 1786 Second Mémoire sur les Intégrations par arcs d'ellipse p. 644
- 1787 L'intégration de quelques équations aux différences Partielles (Legendre transform)
- In Memoires présentés par divers Savants à la l'Académie des Sciences de l'Institut de France
- 1806 Nouvelle formula pour réduire en distances vraies les distances apparentes de la Lune au Soleil ou à une étoile (30–54)
- 1807 Analyse des triangles tracés sur la surface d'un sphéroide (130–161)
- Tome 10 Recherches sur diverses sortes d'intégrales défines (416–509)
- 1819 Méthode des moindres carrés pour trouver le milieu le plus probable entre les résultats de différentes observations (149–154), Mémoire sur l'attraction des ellipsoïdes homogènes (155–183)
- 1823 Recherches sur quelques objets d'Analyse indéterminée et particulièrement sur le théorème de Fermat (1–60)
- 1828 Mémoire sur la détermination des fonctions Y et Z que satisfont à l'équation 4(X^n-1) = (X-1)(Y^2+-nZ^2), n étant un nombre premier 4i-+1 (81–100)
- 1833 Réflexions sur différentes manières de démontrer la théorie des parallèles ou le théorème sur la somme des trois angles du triangle, avec 1 planche (367–412)
Mistaken portrait
For two centuries, until the recent discovery of the error in 2005, books, paintings and articles have incorrectly shown a profile portrait of the obscure French politician Louis Legendre (1752–1797) as a portrait of the mathematician. The error arose from the fact that the sketch was labelled simply "Legendre" and appeared in a book along with contemporary mathematicians such as Lagrange. The only known portrait of Legendre, rediscovered in 2008, is found in the 1820 book Album de 73 portraits-charge aquarellés des membres de I'Institut, a book of caricatures of seventy-three members of the Institut de France in Paris by the French artist Julien-Léopold Boilly as shown below:[12][2]
See also
- List of things named after Adrien-Marie Legendre
- Associated Legendre polynomials
- Gauss–Legendre algorithm
- Legendre's constant
- Legendre's equation in number theory
- Legendre's functional relation for elliptic integrals
- Legendre's conjecture
- Legendre sieve
- Legendre symbol
- Legendre's theorem on spherical triangles
- Saccheri–Legendre theorem
- Least squares
- Least-squares spectral analysis
- Seconds pendulum
Notes
- ^ Aldrich, John. "Earliest Uses of Symbols of Calculus". Retrieved 20 April 2017.
- ^ a b c Duren, Peter (December 2009). "Changing Faces: The Mistaken Portrait of Legendre" (PDF). Notices of the AMS. 56 (11): 1440–1443, 1455.
- ^ "Legendre". Random House Webster's Unabridged Dictionary.
- Plackett, R.L. (1972). "The discovery of the method of least squares"(PDF). Biometrika. 59 (2): 239–251.
- JSTOR 2240811.
- ^ a b O'Connor, John J.; Robertson, Edmund F., "Adrien-Marie Legendre", MacTutor History of Mathematics Archive, University of St Andrews
- ^ "Library and Archive". Royal Society. Retrieved 6 August 2012.
- ^ André Weil, Number Theory: An approach through history From Hammurapi to Legendre, Springer Science & Business Media2006, p. 325.
- .
- ^ OCLC 895161901.
- ^ "Book of Members, 1780–2010: Chapter L" (PDF). American Academy of Arts and Sciences. Retrieved 28 July 2014.
- ^ a b Boilly, Julien-Léopold. (1820). Album de 73 portraits-charge aquarellés des membres de I'Institut (watercolor portrait Archived 27 August 2022 at the Wayback Machine #29). Biliotheque de l'Institut de France.
External links
- Media related to Adrien-Marie Legendre at Wikimedia Commons
- Adrien-Marie Legendre at PlanetMath.
- The True Face of Adrien-Marie Legendre (Portrait of Legendre)
- Biography at Fermat's Last Theorem Blog
- References for Adrien-Marie Legendre
- (in French) Eléments de géométrie (Paris : F. Didot, 1817)
- Elements of geometry and trigonometry, from the works of A. M. Legendre. Revised and adapted to the course of mathematical instruction in the United States, by Charles Davies. (New York: A. S. Barnes & co., 1858) : English translation of the above text
- Mémoires sur la méthode des moindres quarrés, et sur l'attraction des ellipsoïdes homogènes (1830)
- Théorie des nombres (Paris : Firmin-Didot, 1830)
- Traité des fonctions elliptiques et des intégrales eulériennes (Paris : Huzard-Courcier, 1825–1828)
- Nouvelles Méthodes pour la Détermination des Orbites des Comètes (Paris : Courcier, 1806)
- Essai sur la Théorie des Nombres (Paris : Duprat, 1798)
- Exercices de Calcul Intégral V.3 (Paris : Courcier, 1816)
- Correspondance mathématique avec Legendre in C. G. J. Jacobis gesammelte Werke (Berlin: 1852)