Emil Hilb

Emil Hilb (born 26 April 1882 in Stuttgart;[1] died 6 August 1929[2] in Würzburg) was a German-Jewish[3] mathematician who worked in the fields of special functions, differential equations, and difference equations. He was one of the authors of the Enzyklopädie der mathematischen Wissenschaften (Encyclopedia of mathematical sciences), contributing on the topics of trigonometric series and differential equations. He wrote a book on Lamé functions.[4]

Hilb obtained his Ph.D. in 1903 under the supervision of Ferdinand von Lindemann.[5] He worked as a high school mathematics teacher in Augsburg until 1906, when Max Noether hired him as an assistant; in 1908 he found a position as a lecturer at the University of Erlangen. He won a position as a professor at the University of Würzburg in 1909, in preference over Ernst Zermelo.[6] His students at Würzberg included Richard Bär, who later became a distinguished experimental physicist,[7] Otto Haupt, and Axel Schur.[4][5]

Books

Other biographical sources on Hilb[4]

References

  1. ^ Hilb, E. (1903), "Lebenslauf", Beiträge zur theorie der lame'schen Funktionen, p. 60, http://books.google.com/books?id=ls4TAQAAIAAJ&pg=PA60 .
  2. ^ "Notes", Bull. Amer. Math. Soc. 35: 885–888, 1929, doi:10.1090/S0002-9904-1929-04829-8 .
  3. ^ Flade, Roland (1985), Juden in Würzburg, 1918–1933, Mainfränkische Studien, 34 (2nd ed.), p. 47 .
  4. ^ a b c http://www.didaktik.mathematik.uni-wuerzburg.de/history/vollrath/papers/073.pdf Hans-Joachim Vollrath: Emil Hilb (1882–1929), In: P. Baumgart (Hrsg.), Lebensbilder bedeutender Würzburger Professoren, Neustadt/Aisch (Degener), 1995, pages 320–338
  5. ^ a b Emil Hilb at the Mathematics Genealogy Project.
  6. ^ Zermelo, Ernst (2009), Collected Works: Volume I, Springer-Verlag, p. 19, ISBN 9783540793830, http://books.google.com/books?id=XB2nd2ovakIC&pg=PA19 .
  7. ^ Mehra, Jagdish; Rechenberg, Helmut (2001), Erwin Schrodinger and the Rise of Wave Mechanics: Schrodinger in Vienna and Zurich 1887–1925, Part 1, The historical development of quantum theory, Springer-Verlag, p. 285, ISBN 9780387951799, http://books.google.com/books?id=AwmQTGB8LwMC&pg=PA285 .