Paul Koebe

Paul Koebe (15 February 1882 – 6 August 1945) was a 20th-century German mathematician. His work dealt exclusively with the complex numbers, his most important results being on the uniformization of Riemann surfaces in a series of four papers in 1907–1909. He did his thesis at Berlin, where he worked under Hermann Schwarz. He was an extraordinary professor at Leipzig from 1910 to 1914, then an ordinary professor at the University of Jena before returning to Leipzig in 1926 as an ordinary professor. He died in Leipzig.^[1]

Paul Koebe
Paul Koebe (1930)
Born	(1882-02-15)15 February 1882 Luckenwalde, German Empire
Died	6 August 1945(1945-08-06) (aged 63) Leipzig, Germany
Nationality	German
Alma mater	University of Berlin
Known for	Koebe function Koebe 1/4 theorem Koebe–Andreev–Thurston theorem Planar Riemann surface Uniformization theorem
Awards	Ackermann–Teubner Memorial Award (1922)
Scientific career
Fields	Mathematics
Institutions	University of Leipzig University of Jena
Academic advisors	Hermann Schwarz Friedrich Schottky
Notable students	Georg Feigl Herbert Grötzsch

He conjectured the Koebe quarter theorem on the radii of disks in the images of injective functions, in 1907. His conjecture became a theorem when it was proven by Ludwig Bieberbach in 1916, and the function ${\displaystyle f(z)=z/(1-z)^{2}}$ providing a tight example for this theorem became known as the Koebe function.^[2]

Awards

• 1922, Ackermann–Teubner Memorial Award^[3]

See also

• Koebe groups
• Midsphere
• Riemann mapping theorem