Arthur Moritz Schoenflies

Arthur Moritz Schoenflies (German: [ˈʃøːnfliːs]; 17 April 1853 – 27 May 1928), sometimes written as Schönflies, was a German mathematician, known for his contributions to the application of group theory to crystallography, and for work in topology.

Arthur Moritz Schoenflies
Born(1853-04-17)17 April 1853
Landsberg an der Warthe, Brandenburg, Prussia
Died27 May 1928(1928-05-27) (aged 75)
Frankfurt am Main, Hesse-Nassau, Germany
Alma materUniversity of Berlin
Known forSchoenflies problem
Jordan–Schoenflies theorem
Schoenflies notation
Schoenflies displacement
Spouse(s)Emma Levin (1868–1939)
ChildrenHanna (1897–1985), Albert (1898–1944), Elizabeth (1900–1991), Eva (1901–1944), Lotte (1905–1981)
Scientific career
FieldsGroup theory, crystallography, and topology
Academic advisorsErnst Kummer
Karl Weierstrass
InfluencesFelix Klein

Schoenflies was born in Landsberg an der Warthe (modern Gorzów, Poland). He studied under Ernst Kummer and Karl Weierstrass, and was influenced by Felix Klein.

The Schoenflies problem is to prove that an -sphere in Euclidean n-space bounds a topological ball, however embedded. This question is much more subtle than it initially appears.

He studied at the University of Berlin from 1870–1875. He obtained a doctorate in 1877, and in 1878 he was a teacher at a school in Berlin. In 1880, he went to Colmar to teach.

Schoenflies was a frequent contributor to Klein's encyclopedia: In 1898 he wrote on set theory, in 1902 on kinematics, and on projective geometry in 1910.

He was a great-uncle of Walter Benjamin.

Selected works

  • Geometrie der Bewegung in synthetischer Darstellung. Teubner, 1886; translated by Charles Speckel as La Géométrie du Mouvement. Exposé synthétique. Gauthier-Villars 1893[1]
  • Einführung in die mathematische Behandlung der Naturwissenschaft. 1st edition, Dr. E. Wolff, 1895; 2nd editions 1931 (with Walther Nernst)
  • Entwicklung der Mengenlehre und ihrer Anwendungen. Teubner, 1913 (with Hans Hahn).
  • Kristallsysteme und Kristallstruktur, Teubner 1891
  • Theorie der Kristallstruktur. Ein Lehrbuch. Gebr. Borntraeger, 1923.
  • Einführung in die Hauptgesetze der zeichnerischen Darstellungsmethoden, Teubner 1908, Project Gutenberg ebook
  • Articles: Mengenlehre (1898), Projektive Geometrie (1909), Kinematik (1902), Kristallographie (with Theodor Liebisch, Otto Mügge), in Klein's encyclopedia.
gollark: Consider: cons should not cons its arguments.
gollark: No, it generates infinitely large reference cycles using a monad, I think. You didn't explain it well.
gollark: You should know since you're using it.
gollark: Macron uses infinite cyclic reference counting.
gollark: Oh, one of the times that comes up it is asking about the universe Int Act, which restricts its floating point throughout. You should have turned it off.

See also

References


This article is issued from Wikipedia. The text is licensed under Creative Commons - Attribution - Sharealike. Additional terms may apply for the media files.