- Ernst Zermelo
Ernst Friedrich Ferdinand Zermelo (
July 27 1871 ,Berlin ,German Empire –May 21 1953 ,Freiburg im Breisgau ,West Germany ) was a Germanmathematician , whose work has major implications for thefoundations of mathematics and hence onphilosophy .Life
He graduated from Berlin's "Luisenstädtisches Gymnasium" in 1889. He then studied
mathematics ,physics andphilosophy at the universities ofBerlin , Halle andFreiburg . He finished his doctorate in 1894 at theUniversity of Berlin , awarded for a dissertation on thecalculus of variations ("Untersuchungen zur Variationsrechnung"). Zermelo remained at the University of Berlin, where he was appointed assistant to Planck, under whose guidance he began to studyhydrodynamics . In 1897, Zermelo went toGöttingen , at that time the leading centre for mathematical research in the world, where he completed hishabilitation thesis in 1899.In 1910, Zermelo left Göttingen upon being appointed to the chair of mathematics at
Zurich University , which he resigned in 1916.He was appointed to an honorary chair atFreiburg im Breisgau in 1926, which he resigned in 1935 because he disapproved of Hitler's regime. At the end ofWorld War II and at his request, Zermelo was reinstated to his honorary position in Freiburg.Research in set theory
In 1900, in the Paris conference of the
International Congress of Mathematicians ,David Hilbert challenged the mathematical community with his famousHilbert's problems , a list of 23 unsolved fundamental questions which mathematicians should attack during the coming century. The first of these, a problem ofset theory , was thecontinuum hypothesis introduced by Cantor in 1878.Zermelo began to work on the problems of
set theory and in 1902 published his first work concerning the addition of transfinite cardinals. In 1904, he succeeded in taking the first step suggested by Hilbert towards thecontinuum hypothesis when he proved thewell-ordering theorem ("every set can be well ordered"). This result brought fame to Zermelo, who was appointed Professor in Göttingen, in 1905. His proof of thewell-ordering theorem , based on theaxiom of choice , was not accepted by all mathematicians, partly becauseset theory was not axiomatized at this time. In 1908, Zermelo succeeded in producing a much more widely-accepted proof.In 1905, Zermelo began to axiomatize set theory; in 1908, he published his results despite his failure to prove the consistency of his axiomatic system. See the article on
Zermelo set theory for an outline of this paper, together with the original axioms, with the original numbering.In 1922,
Adolf Fraenkel andThoralf Skolem independently improved Zermelo's axiom system. The resulting 10 axiom system, now called Zermelo-Fraenkel axioms (ZF), is now the most commonly used system foraxiomatic set theory .Zermelo's Navigation Problem
Proposed in 1913, the
Zermelo's Navigation Problem is a classicoptimal control problem. The problems deals with a boat navigating on a body of water, originating from a point O to a destination point D. The boat is capable of a certain maximum speed, and we want to derive the best possible control to reach D in the least possible time.Without considering external forces such as current and wind, the optimal control is to follow a straight line segment from O to D. WIth consideration of current and wind, the shortest path from O to D is in fact, not the optimal solution.
ee also
Zermelo–Fraenkel set theory Bibliography
Primary literature in English translation:
*Jean van Heijenoort , 1967. "From Frege to Godel: A Source Book in Mathematical Logic, 1879-1931". Harvard Univ. Press.
**1904. "Proof that every set can be well-ordered," 139-41.
**1908. "A new proof of the possibility of well-ordering," 183-98.
**1908. "Investigations in the foundations of set theory I," 199-215.
*1913. "On an Application of Set Theory to the Theory of the Game of Chess" in Rasmusen E., ed., 2001. "Readings in Games and Information", Wiley-Blackwell: 79-82.
*1930. "On boundary numbers and domains of sets: new investigations in the foundations of set theory" in Ewald, William B., ed., 1996. "From Kant to Hilbert: A Source Book in the Foundations of Mathematics", 2 vols. Oxford Uni. Press: 1219-33.Secondary:
*Ivor Grattan-Guinness , 2000. "The Search for Mathematical Roots 1870-1940". Princeton Uni. Press.
*Citation | last1=Kanamori | first1=Akihiro | title=Zermelo and set theory | url=http://www.math.ucla.edu/~asl/bsl/1004-toc.htm | id=MathSciNet | id = 2136635 | year=2004 | journal=The Bulletin of Symbolic Logic | issn=1079-8986 | volume=10 | issue=4 | pages=487–553
*Schwalbe and Walker , 1999, "Zermelo and the Early History of Game Theory", http://www.econ.canterbury.ac.nz/personal_pages/paul_walker/pubs/zermelo-geb.pdf (including English translation of Zermelo [1913] )
*Heinz-Dieter Ebbinghaus , 2007. "Ernst Zermelo: An Approach to His Life and Work". Springer-Verlag.External links
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