Geometry.Net - the online learning center
Home  - Scientists - Zermelo Ernst

e99.com Bookstore
  
Images 
Newsgroups
Page 4     61-80 of 89    Back | 1  | 2  | 3  | 4  | 5  | Next 20
A  B  C  D  E  F  G  H  I  J  K  L  M  N  O  P  Q  R  S  T  U  V  W  X  Y  Z  

         Zermelo Ernst:     more detail
  1. Zermelo's axiom of choice: Its origins, development, and influence (Studies in the history of mathematics and physical sciences 8) by Gregory H. Moore, 1982-11-17
  2. Ernst Zermelo: An Approach to His Life and Work by Heinz-Dieter Ebbinghaus, 2010-11-30
  3. Einführung in die Mengenlehre: Die Mengenlehre Georg Cantors und ihre Axiomatisierung durch Ernst Zermelo (Springer-Lehrbuch) (German Edition) by Oliver Deiser, 2009-10-29
  4. Ernst Zermelo - Collected Works/Gesammelte Werke: Volume I/Band I - Set Theory, Miscellanea/Mengenlehre, Varia (Schriften der Mathematisch-naturwissenschaftlichen ... Wissenschaften) (English and German Edition) by Ernst Zermelo, 2010-03-05
  5. Ernst Zermelo - Collected Works/Gesammelte Werke: Volume II/Band II - Calculus of Variations, Applied Mathematics, and Physics/Variationsrechnung, Angewandte ... und Physik (English and German Edition) by Ernst Zermelo, 2011-06-29
  6. Untersuchungen zur Variations-rechnung (German Edition) by Ernst Zermelo, 1894-01-01
  7. Gesammelte Abhandlungen mathematischen und philosophischen Inhalts: Mit erläuternden Anmerkungen sowie mit Ergänzungen aus dem Briefwechsel Cantor-Dedekind (German Edition) by Georg Cantor, 1980-09-01
  8. Untersuchungen zur Variations-Rechnung, Inaugural-Dissertation... von Ernst Zermelo,... by Ernst Friedrich Ferdinand (1871-1953). ZERMELO, 1894-01-01
  9. Gesammelte Abhandlungen Mathematischen Und Philosophischen Inhalts by Georg, Herausgegeben Von Ernst Zermelo Cantor, 1966

61. PHILTAR - Compendium Of Philosophers/Z
Zeno of Sidon (c150c70) An introduction to his life and work. zermelo,ernst Friedrich Ferdinand (1871-1953) An introduction to
http://philtar.ucsm.ac.uk/compendium_of_philosophers/z/
Compendium of Philosophers
Z

Links to materials by and/or about over a thousand philosophers from thousands of years from all over the world from A to Z This compendium contains entries large and small, single or multiple, on hundreds of philosophers. Links vary in size from a few lines of biography to the whole of the Summa Theologica. Sometimes you are directed to a site which has further links. In that case there is no guarantee that all the further links will work, but enough work to make a visit worthwhile. This compendium does not provide links to philosophers’ own home pages. A list of them can be found here A B C ... Z Zallinger zum Thurn, Jacob Anton (1735-1813) Zarathustra [Zoroaster] (7th century BC) Zeno of Citium (342-270 BC) Zeno of Elea (5th century BC) Zeno of Sidon (c150-c70) Zermelo, Ernst Friedrich Ferdinand (1871-1953)

62. Science Timeline
Translate this page Zeeman, Pieter, 1896. Zeno of Elea, 470 bce. zermelo, ernst, 1897, 1908. Zernicke,Frits, 1932. zero, 2700 bce, 250 bce, 458, first half seventh century, 1783.
http://www.sciencetimeline.net/siteindex_w-z.htm
use checkboxes to select items you wish to download
Select Index Letter:
a
b c d ... w-x-y-z
Waddington, Conrad Hal, early 1930s, 1942, 1949, 1956 Wagner, Moritz, 1873 Wagoner, Robert V., 1966 Wahl, Arthur, 1941 Waksman, Selman, 1944 Walcott, Charles D., 1909 Waldeyer, Heinrich Wilhelm Gottfried, 1888, 1891 Walker, Alan, 1984 Walker, Merle F., 1964 Wallace, Alfred Russel, 335 bce, 1810, 1829, 1855, 1858, 1867, 1876, 1881, 1889 walled communities, 5500 bce, Wallis, John, 1656 Walton, Ernest T. S., 1932 Wang, An, 1953 Wankel, Felix, 1936 Warburg, Otto Heinrich, 1923, 1926, 1934, 1937 Warner, Noel L., 1959 watches, end of the fifteenth century, Waterston, Robert, 1998 Watson, James Dewey, 1953 Watson, John Broadus, 1912 Watson-Watt, Robert Alexander, 1926, 1935

63. Liste Historischer Mathematischer Dissertationen Von 1810 Bis 1933
Translate this page Promotion (Bemerkungen). 119, zermelo, ernst (1871-1953), H, Untersuchungenzur Variationsrechnung. (Schwarz, Fuchs), 6.10.1894. 130, Ziegel
http://dochost.rz.hu-berlin.de/listen/histdisslist.php3?sec=Z

64. Directory :: Look.com
zermelo ernst Friedrich Ferdinand zermelo (1871-1953) zermelo in 1908 was thefirst to attempt an axiomatisation of set theory al-Khwarizmi - Abu Ja'far al
http://www.look.com/searchroute/directorysearch.asp?p=142472

65. Practical Foundations Of Mathematics
Paul Taylor. 2.2 Sets (zermelo Type Theory). These methods of constructionwere first set out as a basis of set theory by ernst zermelo in 1908.
http://www.dcs.qmul.ac.uk/~pt/Practical_Foundations/html/s22.html
Practical Foundations of Mathematics
Paul Taylor
Sets (Zermelo Type Theory)
These methods of construction were first set out as a basis of set theory by Ernst Zermelo in 1908. The subsequent work sought to formalise them in terms of a notion of membership in which any entity in the universe may serve either as an element or as a set, and where it is legitimate to ask of any two entities whether one bears this relation to the other. We shall make a distinction between elements and sets, though in such a formalism it is usual to refer to terms and types as we did in Section . We shall also modify what Zermelo did very slightly, taking the cartesian product XxY X Y cf Examples Our system conforms very closely to the way mathematical constructions have actually been formulated in the twentieth century. The claim that set theory provides the foundations of mathematics is only justified via an encoding of this system, and not directly. It is, or at least it should be, surprising that it took 60 years to arrive at an axiomatisation which is, after all, pretty much as Zermelo did it in the first place. V - 1pt. For a detailed account of the modern system and its history, see [

66. Thomas Steiner's Homepage
Translate this page Mai, 19, Mai, 20, Mai, 21, Dürer, Albrecht, 1471, Mai, 21, zermelo, ernst FriedrichFerdinand, 1953. Mai, 22, Cauchy, Augustin-Louis, 1857. Mai, 23, Skolem, ThoralfAlbert, 1887,
http://fsmat.htu.tuwien.ac.at/~thire/mathkal.php
Thomas Steiners Homepage Thomas Steiner's Homepage :9550 views since 10/06/02
Last modified
Tue, dem 01.Oct 02 um 18:06 by Thomas Steiner
optimized for Microsoft Internet Explorer 5.0 at 1024x768 resolution
website hosted by Fachschaft Technische Mathemaik, TU Wien
Familie
Freunde Irene Thomas ... Zugriffe
Mathematik - Kalender
Monat Tag Mathematiker Geburtstag Sterbetag Bernulli, Johann I Newton, Isaac Cramer, Gabriel Jordan, Camille Marie Ennemont Cantor, Georg Borel, Emil Galilei, Galileo Courant, Richard Legendre, Adrien-Marie Fermat, Pierre de Robbins, Herbert Ellis Halley, Edmond Dodgson, Charles Lutwidge (Lewis Caroll) Hermite, Charles Tarski, Alfred Menger, Karl Galton, Sir Francis Watt Kantorowitsch Jordan, Camille Marie Ennemont Hilbert, David Lagrange, Joseph Louis Schwarz, Hermann Amandus Briggs, Henry Dodgson, Charles Lutwidge (Lewis Caroll) Courant, Richard Ceulen, Ludolph von Pohlke, Karl-Wilhelm Kummer, Ernst Eduard Februar Heisenberg, Werner Februar Ferrari Februar Kuratowski Februar Waerden, Bartel Leendert van der

67. Biografisk Register
Translate this page 1238-98) Zagier, Don B. Zenon (ca. 490-430 f.Kr.) zermelo, ernst (1871-1953)Zeuthen, Hieronymus Georg (1839-1920) Zorn, Max (1606-93)
http://www.geocities.com/CapeCanaveral/Hangar/3736/biografi.htm
Biografisk register
Matematikerne er ordnet alfabetisk på bakgrunn av etternavn. Linker angir at personen har en egen artikkel her. Fødsels- og dødsår oppgis der dette har vært tilgjengelig.
Abel, Niels Henrik
Abu Kamil (ca. 850-930)
Ackermann, Wilhelm (1896-1962)
Adelard fra Bath (1075-1160)
Agnesi, Maria G. (1718-99)
al-Karaji (rundt 1000)
al-Khwarizmi, Abu Abd-Allah Ibn Musa (ca. 790-850)
Anaximander (610-547 f.Kr.)
Apollonis fra Perga (ca. 262-190 f.Kr.)
Appel, Kenneth
Archytas fra Taras (ca. 428-350 f.Kr.) Argand, Jean Robert (1768-1822) Aristoteles (384-322 f.Kr.) Arkimedes (287-212 f.Kr.) Arnauld, Antoine (1612-94) Aryabhata (476-550) Aschbacher, Michael Babbage, Charles (1792-1871) Bachmann, Paul Gustav (1837-1920) Bacon, Francis (1561-1626) Baker, Alan (1939-) Ball, Walter W. R. (1892-1945) Banach, Stéfan (1892-1945) Banneker, Benjamin Berkeley, George (1658-1753) Bernoulli, Jacques (1654-1705) Bernoulli, Jean (1667-1748) Bernstein, Felix (1878-1956) Bertrand, Joseph Louis Francois (1822-1900) Bharati Krsna Tirthaji, Sri (1884-1960)

68. À¯¸íÇÑ ¼öÇÐÀÚ
? Chapman, Sydney (1888.1.29~1970.6.16) Church, Alonzo (1903) zermelo, ernst (1871.7.27~1953.5.21) Chebyshyov
http://user.chollian.net/~jjang88/mathman/mathman.htm

69. életrajzok: Z
zermelo, ernst Friedrich Ferdinand (1871. július 27.—1953. május 21.) németmatematikus. A halmazelmélet elso axiómarendszerének kidolgozója.
http://www.iif.hu/~visontay/ponticulus/eletrajzok/z.html
rovatok j¡t©k arch­vum jegyzetek mutat³k kitekintő v©lem©nyek inform¡ci³k
©letrajzok magyar¡zatok forr¡sok
Z‰NON (Kr. e. 450 k¶r¼l): eleai filoz³fus. Ap³ri¡i (Akhilleusz ©s a teknősb©ka; a rep¼lő ny­l stb.) nagy hat¡ssal voltak a matematikai gondolkod¡s fejlőd©s©re. ZERMELO, Ernst Friedrich Ferdinand (1871. jºlius 27.—1953. m¡jus 21.): n©met matematikus. A halmazelm©let első axi³marendszer©nek kidolgoz³ja.
Berlinben sz¼letett. A g¶ttingeni ©s a z¼richi egyetem professzora volt. Axi³marendszer©t FRAENKEL t¶k©letes­tette. Nev©hez fűződik a sok vit¡t kavar³ kiv¡laszt¡si axi³ma is. A matematika sz¡mos ter¼let©n ©rt el eredm©nyeket.

70. Zermelo'nun Biyografisi
Bir Alman matematikçisi olan ernst zermelo, 1891 yilinda Berlin'de dogdu. Özellikle,kümeler kuraminin gelistirilmesinde çok katkilarda bulundu.
http://matematikcecom.kolayweb.com/biyografi/zermelo.htm
Zermelo (1891 - 1953)
Bir Alman matematikçisi olan Ernst Zermelo, 1891 yýlýnda Berlin'de doðdu. Özellikle, kümeler kuramýnýn geliþtirilmesinde çok katkýlarda bulundu. 1904 yýlýnda Zermelo aksiyomunu veya seçme aksiyomunu ortaya attý. Bu aksiyoma göre, verilen bir kümenin her alt kümesinde, tek ve belirli bir þekilde üstünlüðü bulunan bir öðe seçmek olanaðý vardýr. Her küme iyi sýralanabilir. Ancak bazý matematikçiler bunu kabul etmiþ, bazýlarý da karþý çýkmýþtýr. Bu konudaki tartýþmalar, matematiðin modern evriminde önemli yer tutar. Ýyi sýralama, yirminci yüzyýlýn baþýnda oldukça ateþli tartýþmalara konu olmuþ ve bugün herkes tarafýndan kabul edilmiþtir. Zermelo, 1953 yýlýnda Freinburrg'da ölmüþtür.
(Biyografiler genel sayfa)
Ana sayfa
Matematik Tarihi
Ýncelenen Konular ... Ziyaretci Defteri

71. Zermelo Résumé
à la théorie des Echecs (1913) du mathématicien allemand ernst zermelo.
http://mamasphi.free.fr/Zermelo_resume.htm

72. The Mathematics Genealogy Project - Index Of ZE
Translate this page Zerling, David, University of Pennsylvania, 1973. zermelo, ernst,Universität Berlin, 1894. Zerna, Wolfgang, Universität Hannover,1947.
http://genealogy.math.ndsu.nodak.edu/html/letter.phtml?letter=ZE

73. Salvador Vera: Directorio - Algebra
Translate this page zermelo - ernst Friedrich Ferdinand zermelo (1871-1953) zermelo in 1908was the first to attempt an axiomatisation of set theory. Journals (2).
http://www.satd.uma.es/matap/svera/links/matnet01.html
Álgebra Restaurar marco Añade tu web Anterior Home ... Siguiente en todo el directorio Dmoz sólo en Matemáticas/Álgebra_Lineal Top Directorio Español: Matemáticas Álgebra Lineal Descripción Genéricas: Específicas: Esta categoría en otros idiomas:
  • Inglés Álgebra abstracta - Conceptos generales de álgebra abstracta y lógica. Definiciones y teoremas. Álgebra Matricial . Programa de Álgebra Matricial perteneciente al curriculum de 2º de Bachillerato. Esta Web genera matrices para que el alumno opere con ellas on line y comprueba las respuesta del alumno. Todos los contenidos de la Web están orientados a conseguir soltura en la manipulación de matrices y determinantes usando el método de Gauss o de triangulación. Puedes descargar la Web en formato zip (302 Kb). Matrices y Determinantes - Breve tutorial sobre cálculo matricial con numerosos ejemplos y un apartado para el cálculo interactivo. Teoría de conjuntos . Teoría de conjuntos, tratada de manera elemental.

74. Epsilon And Omega
rational numbers ). ( II ) The Basic Axioms of Set Theory ZFC,the AxiomSystem of ernst zermelo and Abraham Fraenkel. A naive
http://www.mathematik.uni-muenchen.de/~deiser/set.html
Set Theory
The mathematical study of infinity
Epsilon and omega are two basic symbols in set theory, representing the membership relation and infinity.
(Click on the stop button of your browser to stop the animations.)
Four basic aspects of set theory
  • Cantor's Diagonal Argument : Uncountable sets The Basic Axioms of Set Theory (ZFC) Interpretability of Mathematics inside Set Theory The Independence of the Continuum Hypothesis and extensions of ZFC
  • ( I ) Cantor's Diagonal Argument ("Diagonalverfahren") : Uncountable Sets
    Now we can apply this diagonalization procedure (switching diagonal entries from to 1 and vice versa) to an infinite table which has rows and columns for every natural number. Given any sequence B(0), B(1), B(2), ..., B(n), ... of subsets of the natural numbers N we can build such a table: Fill row number n with the infinite sequence representing B(n). Now build D as before by switching the infinite diagonal of the infinite table. Again it follows that D is not represented by any row of the table, i.e., D is different from every B(n). (It is easy to see that n is an element of D if and only if n is not an element of B(n): This gives a neat definition of D, but a table as above is better for visualizing D.) We have just proven one of the most important theorems of set theory: A sequence B(0), B(1), ..., B(n), ... of subsets of

    75. Russell's Paradox [Internet Encyclopedia Of Philosophy]
    Examines selfreferential linguistics used to describe properties and sets.Category Society Philosophy Internet Encyclopedia of Philosophy...... (First published in 1902.); zermelo, ernst. Investigations in the Foundationsof Set Theory I. In From Frege to Gödel, ed. by Jean van Heijenoort.
    http://www.utm.edu/research/iep/p/par-russ.htm
    Russell's Paradox Russell's paradox represents either of two interrelated logical antinomies. The most commonly discussed form is a contradiction arising in the logic of sets or classes. Some classes (or sets) seem to be members of themselves, while some do not. The class of all classes is itself a class, and so it seems to be in itself. The null or empty class, however, must not be a member of itself. However, suppose that we can form a class of all classes (or sets) that, like the null class, are not included in themselves. The paradox arises from asking the question of whether this class is in itself. It is if and only if it is not. The other form is a contradiction involving properties. Some properties seem to apply to themselves, while others do not. The property of being a property is itself a property, while the propery of being a cat is not itself a cat. Consider the property that something has just in case it is a property (like that of being a cat ) that does not apply to itself. Does this property apply to itself? Once again, from either assumption, the opposite follows. The paradox was named after Bertrand Russell, who discovered it in 1901.
    Table of Contents (Clicking on the links below will take you to that part of this article)
    History Russell's discovery came while he was working on his Principles of Mathematics . Although Russell discovered the paradox independently, there is some evidence that other mathematicians and set-theorists, including Ernst Zermelo and David Hilbert, had already been aware of the first version of the contradiction prior to Russell's discovery. Russell, however, was the first to discuss the contradiction at length in his published works, the first to attempt to formulate solutions and the first to appreciate fully its importance. An entire chapter of the

    76. Collected Works
    Hrsg. von ernst zermelo. Nebst 1965. Added Entry zermelo, ernst, 1871ed. CALL NO QA300 C3 1960 AUTHOR Carleman, Torsten, 1892-1949.
    http://lib.nmsu.edu/subject/math/mbib.html
    C OLLECTED W ORKS F M ATHEMATICIANS B IBLIOGRAPHY
    CALL NO: QA3 A14 1881
    AUTHOR: Abel, Niels Henrik, 1802-1829.
    MAIN TITLE: OEuvres completes de Niels Henrik Abel.
    EDITION: Nouv. ed., publiee aux frais de l'etat norve-gien par L. Sylow
    PUBLISHER: Christiania [Sweden] Grondahl, 1881.
    LOCATION: Branson
    Material: 2 v. in 1. 28 cm.
    Contents: t. 1. Memoires publies par Abel.t. 2. Memoires posthumes d'Abel
    Subject: Mathematics. cm
    Added Entry: Sylow, Peter Ludvig Mejdel, 1832-
    Added Entry: Lie, Sophus, 1842-1899. CALL NO: QB3 A2 AUTHOR: Adams, John Couch, 1819-1892. MAIN TITLE: The scientific papers of John Adams Couch, edited by William Grylls
    Adams, with a memoir by J. W. L. Glaisher. PUBLISHER: Cambridge, University press, 1896-1900. LOCATION: Branson V.1 and V.2
    Material: 2 v. front. (port.) fold. map, facsims., diagr. 30 cm.
    Contents: v. 1. Biographical notice, by J. W. L. Glaisher. [Original papers published by the author during his lifetime, 1844-1890, ed. by William Grylls Adams]v. 2. pt. 1. Extracts from unpublished manuscripts, ed. by Ralph Allen Simpson. pt. 2. Terrestial magnetism, ed. by William Grylls Adams.
    Subject: Geomagnetism.

    77. PlanetMath: Zermelo-Fraenkel Axioms
    ernst zermelo and Abraham Fraenkel proposed these axioms as a foundationfor what is now called zermeloFraenkel set theory, or ZF.
    http://planetmath.org/encyclopedia/ZermeloFraenkelSetTheory.html
    Math for the people, by the people. Encyclopedia Books Papers Expositions ... Random Login create new user name: pass: forget your password? Main Menu the math Encyclop¦dia
    Papers

    Books

    Expositions

    meta Requests
    Orphanage

    Unclass'd

    Unproven
    ...
    Corrections

    talkback Polls
    Forums
    Feedback Bug Reports information Docs Classification News Legalese ... TODO List Zermelo-Fraenkel axioms (Axiom) Existence of the empty set : There exists a set with the property that there does not exist any such that Equality of sets : If and are sets, and iff , then Pair set : If and are sets, then there is a set containing only and Union over a set : If is a set, then there exists a set that contains every element of each axiom of power set : If is a set, then there exists a set with the property that iff any element is also in Replacement axiom : Let be some formula . If, for all , there is exactly one such that is true, then for any set there exists a set with the property that iff there exists some such that is true. regularity axiom : Let be some formula. If there is some that makes true, then there is a set

    78. People
    Click on the Image for more information about ernst zermelo zermelo is bestknown for his work on the axiom of choice and axiomatic set theory.
    http://ergo.ucsd.edu/~movellan/courses/245/people/Zermelo.html
    Click on the Image for more information about Ernst Zermelo Zermelo is best known for his work on the axiom of choice and axiomatic set theory. After studying the set paradoxes, he made the first attempt to axiomatise set theory in 1908. He gave seven axioms : Axiom of extensionality, Axiom of elementary sets, Axiom of separation, Power set axiom, Union axiom, Axiom of choice and Axiom of infinity. Zermelo usually stated his axioms and theorems in words rather than symbols.

    79. The Factasia Glossary - Z
    Z zermelo Set Theory The first axiomatisation of set theory published by ernst zermeloin 1908 zermelo08 in response to the antinomies found in informal set
    http://www.rbjones.com/rbjpub/philos/glossary/z.htm
    ..Z
    Z
    Zermelo Set Theory
    The first axiomatisation of set theory published by Ernst Zermelo in 1908 in response to the antinomies found in informal set theory by Russell and others. Intended to provide a consistent foundation for mathematics, its consistency remains unimpeached, though it has been found necessary to augment the theory with the axiom of replacement (see ZF ) to provide an adequate foundation for modern mathematics. Zermelo's system includes the axiom of choice, but the letter "Z" is now normally used to refer to his system with the axiom of choice omitted.
    The Z specification language
    A language developed by Jean Raymond Abrial and others at the University of Oxford, broadly similar in strength and character to Zermelo set theory (though the etymology seems uncertain), but with a much richer syntax oriented to applications in the specification of software.
    ZF
    Zermelo-Fraenkel set theory , an axiomatisation of set theory consisting of Zermelo set theory (see above) strengthened with the axiom of replacement, due to Abraham Fraenkel, the effect of which is to ensure that any collection of sets which can be shown to be no greater in size than an existing set is itself a set.
    ZFC
    Zermelo-Fraenkel set theory augmented by the axiom of choice.

    80. Zermelo Set Theory From FOLDOC
    zermelo set theory. mathematics A set theory with the following set of. axioms zermeloFr nkel set theory adds the Replacement axiom. FOLDOC. 200103-16 .
    http://www.swif.uniba.it/lei/foldop/foldoc.cgi?Zermelo set theory

    A  B  C  D  E  F  G  H  I  J  K  L  M  N  O  P  Q  R  S  T  U  V  W  X  Y  Z  

    Page 4     61-80 of 89    Back | 1  | 2  | 3  | 4  | 5  | Next 20

    free hit counter