Siméon Denis Poisson

Siméon Poisson
Siméon Denis Poisson (1781-1840)
Siméon Denis Poisson (1781-1840)
Born 21 June 1781
Pithiviers, France
Died 25 April 1840
Sceaux, France
Residence Flag of France.svg France
Nationality Flag of France.svg French
Fields Mathematician
Institutions École Polytechnique
Bureau des Longitudes
Faculté des Sciences
École de Saint-Cyr
Alma mater École Polytechnique
Doctoral advisor Joseph Louis Lagrange
Doctoral students Michel Chasles
Lejeune Dirichlet
Joseph Liouville
Other notable students Nicolas Léonard Sadi Carnot
Known for Poisson process
Poisson equation
Poisson kernel
Poisson distribution
Poisson regression
Poisson summation formula
Poisson's spot
Poisson's ratio
Poisson zeros
Conway-Maxwell-Poisson distribution
Euler–Poisson–Darboux equation
Religious stance Atheist

Siméon-Denis Poisson (21 June 1781 – 25 April 1840), was a French mathematician, geometer, and physicist. The name is pronounced [simeõ d̪əni pwasõ] in French.

Contents

Biography

Poisson was born in Pithiviers, south of Paris.

In 1798, he entered the École Polytechnique in Paris as first in his year, and immediately began to attract the notice of the professors of the school, who left him free to make his own choices as to what he would study. In 1800, less than two years after his entry, he published two memoirs, one on Étienne Bézout's method of elimination, the other on the number of integrals of a finite difference equation. The latter was examined by Sylvestre-François Lacroix and Adrien-Marie Legendre, who recommended that it should be published in the Recueil des savants étrangers, an unprecedented honour for a youth of eighteen. This success at once procured entry for Poisson into scientific circles. Joseph Louis Lagrange, whose lectures on the theory of functions he attended at the École Polytechnique, recognized his talent early on, and became his friend (the Mathematics Genealogy Project lists Lagrange as his advisor, but this may be an approximation); while Pierre-Simon Laplace, in whose footsteps Poisson followed, regarded him almost as his son. The rest of his career, till his death in Sceaux near Paris, was almost entirely occupied by the composition and publication of his many works and in fulfilling the duties of the numerous educational positions to which he was successively appointed.

Immediately after finishing his studies at the École Polytechnique, he was appointed répétiteur (teaching assistant) there, a position which he had occupied as an amateur while still a pupil in the school; for his schoolmates had made a custom of visiting him in his room after an unusually difficult lecture to hear him repeat and explain it. He was made deputy professor (professeur suppléant) in 1802, and, in 1806 full professor succeeding Jean Baptiste Joseph Fourier, whom Napoleon had sent to Grenoble. In 1808 he became astronomer to the Bureau des Longitudes; and when the Faculté des Sciences was instituted in 1809 he was appointed professor of rational mechanics (professeur de mécanique rationelle). He went on to become a member of the Institute in 1812, examiner at the military school (École Militaire) at Saint-Cyr in 1815, graduation examiner at the École Polytechnique in 1816, councillor of the university in 1820, and geometer to the Bureau des Longitudes succeeding Pierre-Simon Laplace in 1827.

In 1817, he married Nancy de Bardi and with her he had [several?] children. His father, whose early experiences had led him to hate aristocrats, bred him in the stern creed of the First Republic. Throughout the Revolution, the Empire, and the following restoration, Poisson was not interested in politics, concentrating on mathematics. He was appointed to the dignity of baron in 1821; but he neither took out the diploma or used the title. The revolution of July 1830 threatened him with the loss of all his honours; but this disgrace to the government of Louis-Philippe was adroitly averted by François Jean Dominique Arago, who, while his "revocation" was being plotted by the council of ministers, procured him an invitation to dine at the Palais Royal, where he was openly and effusively received by the citizen king, who "remembered" him. After this, of course, his degradation was impossible, and seven years later he was made a peer of France, not for political reasons, but as a representative of French science.

Like many scientists of his time, he was an atheist.

As a teacher of mathematics Poisson is said to have been extraordinarily successful, as might have been expected from his early promise as a répétiteur at the École Polytechnique. As a scientific worker, his productivity has rarely if ever been equalled. Notwithstanding his many official duties, he found time to publish more than three hundred works, several of them extensive treatises, and many of them memoirs dealing with the most abstruse branches of pure mathematics, applied mathematics, mathematical physics, and rational mechanics.

A list of Poisson's works, drawn up by himself, is given at the end of Arago's biography. All that is possible is a brief mention of the more important ones. It was in the application of mathematics to physics that his greatest services to science were performed. Perhaps the most original, and certainly the most permanent in their influence, were his memoirs on the theory of electricity and magnetism, which virtually created a new branch of mathematical physics.

Next (or in the opinion of some, first) in importance stand the memoirs on celestial mechanics, in which he proved himself a worthy successor to Pierre-Simon Laplace. The most important of these are his memoirs Sur les inégalités séculaires des moyens mouvements des planètes, Sur la variation des constantes arbitraires dans les questions de mécanique, both published in the Journal of the École Polytechnique (1809); Sur la libration de la lune, in Connaissances des temps (1821), etc.; and Sur le mouvement de la terre autour de son centre de gravité, in Mémoires de l'Académie (1827), etc. In the first of these memoirs Poisson discusses the famous question of the stability of the planetary orbits, which had already been settled by Lagrange to the first degree of approximation for the disturbing forces. Poisson showed that the result could be extended to a second approximation, and thus made an important advance in planetary theory. The memoir is remarkable inasmuch as it roused Lagrange, after an interval of inactivity, to compose in his old age one of the greatest of his memoirs, entitled Sur la théorie des variations des éléments des planètes, et en particulier des variations des grands axes de leurs orbites. So highly did he think of Poisson's memoir that he made a copy of it with his own hand, which was found among his papers after his death. Poisson made important contributions to the theory of attraction.

Contributions

Poisson's well-known correction of Laplace's second order partial differential equation for potential:

 \nabla^2 \phi = - 4 \pi \rho \;

today named after him Poisson's equation or the potential theory equation, was first published in the Bulletin de la société philomatique (1813). If a function of a given point ρ = 0, we get Laplace's equation:

 \nabla^2 \phi = 0 \;  .

In 1812 Poisson discovered that Laplace's equation is valid only outside of a solid. A rigorous proof for masses with variable density was first given by Carl Friedrich Gauss in 1839. Both equations have their equivalents in vector algebra. Poisson's equation for the divergence of the gradient of a scalar field, φ in 3-dimensional space is:

 \nabla^2 \phi = \rho (x, y, z) \; .

Consider for instance Poisson's equation for surface electrical potential, Ψ as a function of the density of electric charge, ρe at a particular point:

 \nabla^2 \Psi = {\partial ^2 \Psi\over \partial x^2 } +
                     {\partial ^2 \Psi\over \partial y^2 } +
                     {\partial ^2 \Psi\over \partial z^2 } =
                     - {\rho_{e} \over \varepsilon \varepsilon_{0}} \;  .

The distribution of a charge in a fluid is unknown and we have to use the Poisson-Boltzmann equation:

 \nabla^2 \Psi = {n_{0} e \over \varepsilon \varepsilon_{0}}
     \left( e^{e\Psi (x,y,z)/k_{B}T} -
            e^{-e\Psi (x,y,z)/ k_{B}T} \right), \;

which in most cases cannot be solved analytically. In polar coordinates the Poisson-Boltzmann equation is:

 {1\over r^{2}} {d\over dr} \left( r^{2} {d\Psi \over dr} \right) =
     {n_{0} e \over \varepsilon \varepsilon_{0}}
     \left( e^{e\Psi (r) / k_{B}T} - e^{-e\Psi (r) / k_{B}T} \right) \;

which also cannot be solved analytically. If a field, φ is not scalar, the Poisson equation is valid, as can be for example in 4-dimensional Minkowski space:

 \sqrt \phi_{ik} = \rho (x, y, z, ct) \; .

If ρ(x, y, z) is a continuous function and if for r→ ∞ (or if a point 'moves' to infinity) a function φ goes to 0 fast enough, a solution of Poisson's equation is the Newtonian potential of a function ρ(x, y, z):

 \phi_M = - {1\over 4 \pi} \int {\rho (x, y, z)\, dv \over r} \;

where r is a distance between a volume element dv and a point M. The integration runs over the whole space.

Another "Poisson's integral" is the solution for the Green function for Laplace's equation with Dirichlet condition over a circular disk:

 \phi(\xi \eta) = {1\over 4 \pi} \int _0^{2\pi}
     {R^2 - \rho^2\over R^2 + \rho^2 - 2R \rho \cos (\psi - \chi) } \phi
     (\chi)\, d \chi \;

where

 \xi = \rho \cos \psi, \;
\quad \eta = \rho \sin \psi, \;
φ is a boundary condition holding on the disk's boundary.

In the same manner, we define the Green function for the Laplace equation with Dirichlet condition, ∇² φ = 0 over a sphere of radius R. This time the Green function is:

 G(x,y,z;\xi,\eta,\zeta) = {1\over r} - {R\over r_1 \rho} \; ,

where

 \rho = \sqrt {\xi^2 + \eta^2 + \zeta^2} is the distance of a point (ξ, η, ζ) from the center of a sphere,

r is the distance between points (x, y, z) and (ξ, η, ζ), and

r1 is the distance between the point (x, y, z) and the point (Rξ/ρ, Rη/ρ, Rζ/ρ), symmetrical to the point (ξ, η, ζ).

Poisson's integral now has a form:

 \phi(\xi, \eta, \zeta) = {1\over 4 \pi} \int\!\!\!\int_S {R^2 - 
        \rho^2 \over R r^3} \phi\, ds \; .

Poisson's two most important memoirs on the subject are Sur l'attraction des sphéroides (Connaiss. ft. temps, 1829), and Sur l'attraction d'un ellipsoide homogène (Mim. ft. l'acad., 1835). In concluding our selection from his physical memoirs, we may mention his memoir on the theory of waves (Mém. ft. l'acad., 1825).

In pure mathematics, his most important works were his series of memoirs on definite integrals and his discussion of Fourier series, the latter paving the way for the classic researches of Peter Gustav Lejeune Dirichlet and Bernhard Riemann on the same subject; these are to be found in the Journal of the École Polytechnique from 1813 to 1823, and in the Memoirs de l'Académie for 1823. He also studied Fourier integrals. We may also mention his essay on the calculus of variations (Mem. de l'acad., 1833), and his memoirs on the probability of the mean results of observations (Connaiss. d. temps, 1827, &c). The Poisson distribution in probability theory is named after him.

In his Traité de mécanique (2 vols. 8vo, 1811 arid 1833), which was written in the style of Laplace and Lagrange and was long a standard work, he showed many novelties such as an explicit usage of impulsive coordinates:

 p_i = {\partial T\over {\partial q_i\over \partial t}} \;

which influenced the work of William Rowan Hamilton and Carl Gustav Jakob Jacobi.

Besides his many memoirs, Poisson published a number of treatises, most of which were intended to form part of a great work on mathematical physics, which he did not live to complete. Among these may be mentioned

In 1815 Poisson studied integrations along paths in the complex plane. In 1831 he derived the Navier-Stokes equations independently of Claude-Louis Navier.

See also

  • Poisson process
  • Poisson equation
  • Screened Poisson equation
  • Poisson kernel
  • Poisson distribution
  • Poisson regression
  • Poisson summation formula
  • Poisson's spot
  • Poisson's ratio
  • Poisson (crater) (named after Siméon Denis Poisson)
  • Poisson bracket
  • Euler–Poisson–Darboux equation
  • Poisson Zeros
  • Conway-Maxwell-Poisson distribution

References

External links

Awards and achievements
Preceded by
George Biddell Airy
Copley Medal
1832
jointly with Michael Faraday
Succeeded by
Giovanni Antonio Amedeo Plana