Hermann Schwarz Explained

Hermann Schwarz should not be confused with Laurent Schwartz.

Hermann Schwarz
Birth Date:25 January 1843
Birth Place:Hermsdorf, Silesia, Prussia
Death Place:Berlin, Germany
Nationality:Prussian
Field:Mathematician
Work Institution:University of Halle
Swiss Federal Polytechnic
Göttingen University
Alma Mater:Gewerbeinstitut
Doctoral Advisor:Karl Weierstrass
Ernst Kummer
Doctoral Students:Lipót Fejér
Harris Hancock
Gerhard Hessenberg
Paul Koebe
Leon Lichtenstein
Heinrich Maschke
Robert Remak
Rudolf Rothe
Theodor Vahlen
Ernst Zermelo
Known For:Cauchy–Schwarz inequality

Karl Hermann Amandus Schwarz (pronounced as /de/; 25 January 1843 – 30 November 1921) was a German mathematician, known for his work in complex analysis.

Life

Schwarz was born in Hermsdorf, Silesia (now Sobieszów, Poland). In 1868 he married Marie Kummer,[1] who was the daughter to the mathematician Ernst Eduard Kummer[2] and Ottilie née Mendelssohn (a daughter of Nathan Mendelssohn's and granddaughter of Moses Mendelssohn). Schwarz and Kummer had six children, including his daughter Emily Schwarz.

Schwarz originally studied chemistry in Berlin but Ernst Eduard Kummer and Karl Theodor Wilhelm Weierstrass persuaded him to change to mathematics.[3] He received his Ph.D. from the Universität Berlin in 1864 and was advised by Kummer and Weierstrass.[4] Between 1867 and 1869 he worked at the University of Halle, then at the Swiss Federal Polytechnic.[5] From 1875 he worked at Göttingen University, dealing with the subjects of complex analysis, differential geometry and the calculus of variations. He died in Berlin.

Work

Schwarz's works include Bestimmung einer speziellen Minimalfläche, which was crowned by the Berlin Academy in 1867 and printed in 1871, and Gesammelte mathematische Abhandlungen (1890).

Among other things, Schwarz improved the proof of the Riemann mapping theorem,[6] developed a special case of the Cauchy–Schwarz inequality, and gave a proof that the ball has less surface area than any other body of equal volume.[7] His work on the latter allowed Émile Picard to show solutions of differential equations exist (the Picard–Lindelöf theorem).

In 1892 he became a member of the Berlin Academy of Science and a professor at the University of Berlin, where his students included Lipót Fejér, Paul Koebe and Ernst Zermelo. In total, he advised at least 22 Ph. D students. In 1914 Schwarz's friends and former students published a volume with 34 articles in celebration of the 50th anniversary of his doctoral dissertation.[8]

His name is attached to many ideas in mathematics, including the following:

Notes and References

  1. Carathéodory . C . Hermann Amandus Schwarz . Deutsches biographisches Jahrbuch . 1921 . III . 6 . 236–238 . 10.1002/zamm.19210010615 . 1921ZaMM....1..494M . 7 July 2021.
  2. Book: Creators of Mathematical and Computational Sciences. Agarwal. Ravi. Sen. Syamal. 2014-11-11. Springer. 9783319108704. 297–298. en.
  3. Web site: Schwarz biography. O'Connor. J. J.. Robertson. E. F.. www-gap.dcs.st-and.ac.uk. The MacTutor History of Mathematics. 2016-05-22. https://web.archive.org/web/20160605014322/http://www-gap.dcs.st-and.ac.uk/~history/Biographies/Schwarz.html. 2016-06-05. dead.
  4. Web site: The Mathematics Genealogy Project – Hermann Schwarz. www.genealogy.math.ndsu.nodak.edu. 2016-05-22.
  5. Book: Chang, Sooyoung. Academic Genealogy of Mathematicians. 2011-01-01. World Scientific. 9789814282291. 77–78. en.
  6. Bottazzini. Umberto. 2003-04-30. Algebraic truths vs geometric fantasies: Weierstrass' Response to Riemann. math/0305022.
  7. Schwarz. Hermann Amandus. 1884. Proof of the theorem that the ball has less surface area than any other body of the same volume. News of the Royal Society of Sciences and the Georg-August-Universität Göttingen. 1884. 1–13.
  8. 10.1090/S0002-9904-1916-02811-4. Book Review: Mathematische Abhandlungen, Hermann Amandus Schwarz zu seinem fünfzigjährigen Doktorjubiläum am 6. August 1914 gewidmet von Freunden und Schülern. 1916. Gronwall. T. H.. Thomas Hakon Grönwall. Bulletin of the American Mathematical Society. 22. 8. 406–408. free.