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Wilhelm Gross graduated from the Gymnasium in [[Linz]] and then studied from 1905 to 1910 at the [[University of Vienna]], where he received his Ph.D. ([[Promotion (Germany)|''Promotion'']]) on 20 May 1910 with [[Wilhelm Wirtinger]] as thesis advisor. In October 1910 Gross passed his teaching qualification examination in mathematics and physics. After a three-semester stay in [[Göttingen]] during the years 1910–1912, he became in 1912 an assistant and from 1913 a [[Privatdozent]] at the University of Vienna. In the year 1918 he was promoted there to professor extraordinarius. In the same year he was awarded the [[Lieben Prize#Richard Lieben Prize|Richard Lieben Prize]] for his research on the calculus of variations, but he died of influenza in the [[1918 flu pandemic|1918-1920 pandemic]].<ref>[[Josef Lense]]: ''Groß, Wilhelm'', in: Neue Deutsche Biographie 7 (1966), p. 146; [http://www.deutsche-biographie.de/pnd116869461.html Online]</ref> |
Wilhelm Gross graduated from the Gymnasium in [[Linz]] and then studied from 1905 to 1910 at the [[University of Vienna]], where he received his Ph.D. ([[Promotion (Germany)|''Promotion'']]) on 20 May 1910 with [[Wilhelm Wirtinger]] as thesis advisor. In October 1910 Gross passed his teaching qualification examination in mathematics and physics. After a three-semester stay in [[Göttingen]] during the years 1910–1912, he became in 1912 an assistant and from 1913 a [[Privatdozent]] at the University of Vienna. In the year 1918 he was promoted there to professor extraordinarius. In the same year he was awarded the [[Lieben Prize#Richard Lieben Prize|Richard Lieben Prize]] for his research on the calculus of variations, but he died of influenza in the [[1918 flu pandemic|1918-1920 pandemic]].<ref>[[Josef Lense]]: ''Groß, Wilhelm'', in: Neue Deutsche Biographie 7 (1966), p. 146; [http://www.deutsche-biographie.de/pnd116869461.html Online]</ref> |
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Gross did research on [[function theory]], [[differential equations]], [[measure theory]], [[geometry]] and [[invariant theory]]. In function theory he is known for his investigations of singularities of meromorphic functions on Riemann surfaces, in particular, the Gross star theorem.<ref>{{cite book|author=Nevanlinna, R.|year=1970|title=Analytic Functions|page=289|url=http://books.google.com/books?id=gYLqCAAAQBAJ&pg=PA289}}</ref> |
Gross did research on [[complex analysis|function theory]], [[differential equations]], [[measure theory]], [[geometry]] and [[invariant theory]]. In function theory he is known for his investigations of singularities of meromorphic functions on Riemann surfaces, in particular, the Gross star theorem.<ref>{{cite book|author=Nevanlinna, R.|year=1970|title=Analytic Functions|page=289|url=http://books.google.com/books?id=gYLqCAAAQBAJ&pg=PA289}}</ref> |
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==Selected publications== |
==Selected publications== |
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*"Das isoperimetrische Problem bei Doppelintegralen." Monatshefte für Mathematik und Physik 27, no. 1 (1916): 70–120. {{doi|10.1007/BF01726737}} |
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*"Bedingt konvergente Reihen." Monatshefte für Mathematik und Physik 28, no. 1 (1917): 221–237. {{doi|10.1007/BF01698244}} |
*"Bedingt konvergente Reihen." Monatshefte für Mathematik und Physik 28, no. 1 (1917): 221–237. {{doi|10.1007/BF01698244}} |
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*"Zum Verhalten analytischer Funktionen in der Umgebung singulärer Stellen." Mathematische Zeitschrift 2, no. 3 (1918): 242–294. {{doi|10.1007/BF01199411}} |
*"Zum Verhalten analytischer Funktionen in der Umgebung singulärer Stellen." Mathematische Zeitschrift 2, no. 3 (1918): 242–294. {{doi|10.1007/BF01199411}} |
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*"Eine ganze Funktion, für die jede komplexe Zahl Konvergenzwert ist." Mathematische Annalen 79, no. 1 (1918): 201–208. {{doi|10.1007/BF01457182}} |
*"Eine ganze Funktion, für die jede komplexe Zahl Konvergenzwert ist." Mathematische Annalen 79, no. 1 (1918): 201–208. {{doi|10.1007/BF01457182}} |
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*"Über die Singularitäten analytischer Funktionen." Monatshefte für Mathematik 29, no. 1 (1918): 3–47. {{doi|10.1007/BF01700480}}}} |
*"Über die Singularitäten analytischer Funktionen." Monatshefte für Mathematik 29, no. 1 (1918): 3–47. {{doi|10.1007/BF01700480}}}} |
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*"Über das lineare Maß von Punktmengen." Monatshefte für Mathematik und Physik 29, no. 1 (1918): 177–193. {{doi|10.1007/BF01700486}} |
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==Gross star theorem== |
==Gross star theorem== |
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Revision as of 22:43, 21 December 2017
Wilhelm Gross (24 March 1886, Molln – 22 October 1918, Vienna) was an Austrian mathematician, known for the Gross star theorem.[1]
Wilhelm Gross graduated from the Gymnasium in Linz and then studied from 1905 to 1910 at the University of Vienna, where he received his Ph.D. (Promotion) on 20 May 1910 with Wilhelm Wirtinger as thesis advisor. In October 1910 Gross passed his teaching qualification examination in mathematics and physics. After a three-semester stay in Göttingen during the years 1910–1912, he became in 1912 an assistant and from 1913 a Privatdozent at the University of Vienna. In the year 1918 he was promoted there to professor extraordinarius. In the same year he was awarded the Richard Lieben Prize for his research on the calculus of variations, but he died of influenza in the 1918-1920 pandemic.[2]
Gross did research on function theory, differential equations, measure theory, geometry and invariant theory. In function theory he is known for his investigations of singularities of meromorphic functions on Riemann surfaces, in particular, the Gross star theorem.[3]
Selected publications
- "Das isoperimetrische Problem bei Doppelintegralen." Monatshefte für Mathematik und Physik 27, no. 1 (1916): 70–120. doi:10.1007/BF01726737
- "Bedingt konvergente Reihen." Monatshefte für Mathematik und Physik 28, no. 1 (1917): 221–237. doi:10.1007/BF01698244
- "Zum Verhalten analytischer Funktionen in der Umgebung singulärer Stellen." Mathematische Zeitschrift 2, no. 3 (1918): 242–294. doi:10.1007/BF01199411
- "Eine ganze Funktion, für die jede komplexe Zahl Konvergenzwert ist." Mathematische Annalen 79, no. 1 (1918): 201–208. doi:10.1007/BF01457182
- "Über die Singularitäten analytischer Funktionen." Monatshefte für Mathematik 29, no. 1 (1918): 3–47. doi:10.1007/BF01700480}}
- "Über das lineare Maß von Punktmengen." Monatshefte für Mathematik und Physik 29, no. 1 (1918): 177–193. doi:10.1007/BF01700486
Gross star theorem
- Hypothesis: Let f be a meromorphic function which is the ratio of two entire functions. Suppose that z is a complex number which is not a singular point of f. Define w = f(z). Consider the germ ϕz of the inverse of f, such that ϕz(w) = z.
- Conclusion: Then the set { eiθ : 0 ≤ θ ≤ 2 π and ϕz has an analytic continuation along the ray { w + r eiθ : 0 ≤ r < ∞ } } is equal to the unit circle, except for a set with Lebesgue measure zero.[1]
Sources
- Wilhelm Blaschke: Nachruf auf Gross. Berichte über die Verhandlungen der Königlich Sächsischen Gesellschaft der Wissenschaften zu Leipzig, Mathematisch-Physische Classe, vol. 70 (1918), pp. 339–340.
- "Gross Wilhelm". In: Österreichisches Biographisches Lexikon 1815–1950 (ÖBL). Vol. 2, Austrian Academy of Sciences, Vienna 1959, p. 76.
References
- ^ a b Nevanlinna, R. (1970). Analytic Functions. Springer-Verlag. pp. 288–289; translated from the 2nd German edition by Phillip Emig
{{cite book}}: CS1 maint: postscript (link) - ^ Josef Lense: Groß, Wilhelm, in: Neue Deutsche Biographie 7 (1966), p. 146; Online
- ^ Nevanlinna, R. (1970). Analytic Functions. p. 289.
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