Gotthold Eisenstein
Gotthold Eisenstein | |
---|---|
Born | |
Died | 11 October 1852 | (aged 29)
Nationality | German |
Alma mater | University of Berlin |
Scientific career | |
Fields | Mathematics |
Doctoral advisor | Ernst Eduard Kummer Nikolaus Wolfgang Fischer |
Ferdinand Gotthold Max Eisenstein (16 April 1823 – 11 October 1852) was a German mathematician. He specialized in number theory and analysis, and proved several results that eluded even Gauss. Like Galois and Abel before him, Eisenstein died before the age of 30. He was born and died in Berlin, Prussia.
Early life
His parents, Johan Konstantin Eisenstein and Helene Pollack, were of Jewish descent and converted to Protestantism prior to his birth.[1] From an early age, he demonstrated talent in mathematics and music. As a young child he learned to play piano, and he continued to play and compose for piano throughout his life.
He suffered various health problems throughout his life, including meningitis as an infant, a disease that took the lives of all five of his brothers and sisters. In 1837, at the age of 14, he enrolled at Friedrich Wilhelm Gymnasium, and soon thereafter at Friedrich Werder Gymnasium in Berlin. His teachers recognized his talents in mathematics, but by 15 years of age he had already learned all the material taught at the school. He then began to study differential calculus from the works of Leonhard Euler and Joseph-Louis Lagrange.
At 17, still a student, Eisenstein began to attend classes given by Peter Gustav Lejeune Dirichlet and others at the University of Berlin. In 1842, before taking his final exams, he traveled with his mother to England, to search for his father. In 1843 he met William Rowan Hamilton in Dublin, who gave him a copy of his book on Niels Henrik Abel's proof of the impossibility of solving fifth degree polynomials, a work that would stimulate Eisenstein's interest in mathematical research.
Five remarkable years
In 1843 Eisenstein returned to Berlin, where he passed his graduation exams and enrolled in the University the following autumn. In January 1844 he had already presented his first work to the Berlin Academy, on cubic forms in two variables. The same year he met for the first time with Alexander von Humboldt, who would later become Eisenstein's patron. Humboldt managed to find grants from the King, the government of Prussia, and the Berlin academy to compensate for Eisenstein's extreme poverty.[2] The monies, always late and grudgingly given, were earned in full measure by Eisenstein: in 1844 alone he published over 23 papers and two problems in Crelle's Journal, including two proofs of the law of quadratic reciprocity, and the analogous laws of cubic reciprocity and quartic reciprocity.
In June 1844 Eisenstein visited Carl Friedrich Gauss in Göttingen. In 1845, Kummer saw to it that he received an honorary doctorate at the University of Breslau. Jacobi also encouraged the distinction, but later relations between Jacobi and Eisenstein were always rocky, due primarily to a disagreement over the order of discoveries made in 1846. In 1847 Eisenstein habilitated at the University of Berlin, and he began to teach there. Bernhard Riemann attended his classes on elliptic functions.
Imprisonment and death
In 1848 Eisenstein was imprisoned briefly by the Prussian army for his revolutionary activities in Berlin. Eisenstein always had republican sympathies, and while he did not actively participate in the revolution of 1848, he was arrested on 19 March of that year. Although he was released just one day later, the harsh treatment he suffered damaged his already delicate health. But his association with the Republican cause led to his official stipends being revoked, despite Humboldt's tenaciously coming to his defense.
Despite his health, Eisenstein continued writing papers on quadratic partitions of prime numbers and the reciprocity laws. In 1851, at the instigation of Gauss, he was elected to the Academy of Göttingen; one year later, this time at the recommendation of Dirichlet, he was also elected to the Academy of Berlin.
He died of tuberculosis at the age of 29. Humboldt, then 83, accompanied his remains to the cemetery. He had recently obtained, too late, as it turned out, the funding necessary to send Eisenstein on holiday to Sicily.
Purported Gauss quote
Seit 1847 war er Privatdocent an der Universität zu Breslau, seit dem 24. April 1852 ordentliches Mitglied der dortigen Akademie der Wissenschaften, als welcher er am 1. Juli seine Antrittsrede hielt, ein Vierteljahr später starb der geniale Mathematiker, den ein Gauß so sehr seiner Freundschaft gewürdigt hatte, daß er eine Sammlung Eisenstein’scher Aufsätze, welche 1848, also noch während des Lebens des Verfassers, in Berlin erschien, mit einer Vorrede einleitete, und sich gesprächsweise einmal äußerte, es habe nur drei epochebildende Mathematiker gegeben: Archimed, Newton, Eisenstein.
Gauss ... in conversation once remarked that, there had been only three epoch-making mathematicians: Archimedes, Newton, and Eisenstein.
Moritz Cantor (1877) This is the origin of the quote sometimes attributed to Gauss about Eisenstein. (Bold added.)
E. T. Bell in his 1937 book Men of Mathematics (page 237) claims that Gauss said "There have been but three epoch-making mathematicians, Archimedes, Newton, and Eisenstein", and this has been widely quoted in writings about Eisenstein. This is not a quote by Gauss, but is (a translation of) the end of a sentence from the biography of Eisenstein by Moritz Cantor (1877), one of Gauss's last students and a historian of mathematics, who was summarizing his recollection of a remark made by Gauss about Eisenstein in a conversation many years earlier.
Although it is doubtful that Gauss really put Eisenstein in the same league as Newton, his writings show that Gauss thought very highly of Eisenstein. For example, a letter from Gauss to Humboldt, dated the 14th of April in 1846, says that Eisenstein's talent is one that nature bestows only a few times a century ("welche die Natur in jedem Jahrhundert nur wenigen erteilt").
Publications
- Eisenstein, Gotthold (1847), Mathematische Abhandlungen. Besonders aus dem Gebiete der höheren Arithmetik und der elliptischen Funktionen (in German), Reimer, Berlin
- Eisenstein, Gotthold (1975), Mathematische Werke (in German), New York: AMS Chelsea Publishing, ISBN 978-0-8284-1280-3, MR 0427029 Weil's review
See also
- Eisenstein's criterion
- Eisenstein ideal
- Eisenstein integer
- Eisenstein prime
- Eisenstein reciprocity
- Eisenstein sum
- Eisenstein series
- Eisenstein theorem
- Eisenstein–Kronecker number
- Elliptic Gauss sum
- Real analytic Eisenstein series
References
- ^ http://www.gap-system.org/~history/Biographies/Eisenstein.html
- ^ Helmut de Terra, Humboldt: The Life and Times of Alexander von Humboldt, 1769-1859. New York: Alfred A. Knopf 1955, pp. 334-36.
Further reading
- Biermann, Kurt-R. (1959), "Eisenstein, Ferdinand Gotthold Max", Neue Deutsche Biographie (in German), 4: 420
- Cantor, Moritz (1877), "Eisenstein, Gotthold", Allgemeine Deutsche Biographie (in German), 5: 774–775, wikisource
- Dunnington, G. Waldo (1955), Carl Friedrich Gauss: titan of science. A study of his life and work, New York: Exposition Press, ISBN 978-0-88385-547-8, MR 0072814
- O'Connor, John J.; Robertson, Edmund F., "Gotthold Eisenstein", MacTutor History of Mathematics Archive, University of St Andrews
- Schappacher, Norbert (1998), "Gotthold Eisenstein. 16 April 1823--11 October 1852", Mathematics in Berlin, Basel, Boston, Berlin: Birkhäuser, pp. 55–60, MR 1648677
- Warnecke, Heinz (1988), "Gotthold Eisenstein (1823--1852)---ein mathematisches und hochschulpädagogisches Talent aus Berlin", Wissenschaftliche Zeitschrift der Humboldt-Universität zu Berlin. Mathematisch-Naturwissenschaftliche Reihe, 37 (2): 187–193, ISSN 0863-0631, MR 0975243
- Weil, André (1976), "Review: Gotthold Eisenstein, Mathematische Werke", Bulletin of the American Mathematical Society, 82 (5): 658–663, doi:10.1090/s0002-9904-1976-14095-5, ISSN 0002-9904
External links
- Gotthold Eisenstein at the Mathematics Genealogy Project
- The life of Gotthold Ferdinand Eisenstein by M.Schmitz (PDF format)
- Ferdinand Eisenstein by Larry Freeman (2005), Fermat's Last Theorem Blog.