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         De Rham Georges:     more detail
  1. Varietes differentiables: Formes, Courants, Formes Harmoniques. by Georges de Rham, 1955
  2. Essays on Topology and Related Topics: Memoires dedies a Georges de Rham (English and French Edition)
  3. Georges de Rham: An entry from Gale's <i>Science and Its Times</i>
  4. Varietes Differentiables: Formes, Courants, Formes Harmoniques by Georges De Rham, 1960
  5. Differentiable Manifolds: Forms, Currents, Harmonic Forms (Grundlehren der mathematischen Wissenschaften) by Georges de Rham, 1984-09-19
  6. Varietes differentiables: Formes, courants, formes harmoniques (Actualites scientifiques et industrielles) (French Edition) by Georges de Rham, 1973
  7. Harmonic integrals by Georges de Rham, 1954
  8. Varietes Differentiables: Formes, Courants, Formes Hamoniques: La Seconde Edition (Actualites Scientifiques et Industrielles.Publications l'Institute de Mathematique de l'Universite de Nancago III) by Georges De Rham, 1960
  9. Essays on Topology and Related Topics: Memoires dédiés à Georges de Rham by André Haefliger and Raghavan Narasimhan, 1970
  10. Variétés différentiables: Formes, courants, formes harmoniques (Publications de l'Institut mathématique de l'université de Nancago) by Georges de Rham, 1955
  11. Lectures on introduction to algebraic topology, (Tata Institute of Fundamental Research. Lectures on mathematics and physics. Mathematics, 44) by Georges de Rham, 1969
  12. A History of Algebraic and Differential Topology, 1900 - 1960 (Modern Birkhäuser Classics) by Jean Dieudonné, 2009-06-09

1. Person Georges De Rham
Person Georges de Rham Ernst C. G. St ckelberg an Arnold Sommerfeld, 15. M rz 1937
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2. Georges De Rham - Definition Of Georges De Rham In Encyclopedia
Georges de Rham (10 September 19039 October 1990) was a Swiss mathematician, known for his contributions to differential topology.He studied at the
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3. Station Information - Georges De Rham
Georges de Rham (10 September 1903 9 October 1990) was a Swiss mathematician, known for his contributions to differential topology.
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4. Georges De Rham - InfoSearchPoint.com
Georges de Rham (10 September 1903 9 October 1990) was a Swiss mathematician, known for his contributions to differential topology.
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5. Klaus N Bernatzki, Lawrence Conlon, Georges De Rham, Penny Florence
Conlon Francis A Burgener Martti Kormano Differential Diagnosis in Computed Tomography Georges de Rham Differentiable Manifolds Forms Currents
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6. Georges De Rham
Georges de Rham (10 September 1903 9 October 1990) was a Swiss mathematician, known for his contributions to differential topology.
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7. NodeWorks - Encyclopedia Georges De Rham
Georges de Rham
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8. Georges De Rham - Mathematicians @ Onebraincell.com
Georges de Rham Biography and Picture collection of Georges de Rham. Georges de Rham
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9. BookkooB Differentiable Manifolds - Georges De Rham
This page lets you compare prices for Differentiable Manifolds by Georges De Rham from the leading UK book stores in seconds and save money by
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10. 14000
Translate this page de rham georges, JEANQUARTIER P. Œuvres mathématiques. L’Enseignement mathématique,1981. Cote RHA 14501 EXCLU DU PRÊT
http://www.univ-rouen.fr/LMRS/Biblio/acquis0306.html
BIBLIOTHÈQUE DE MATHÉMATIQUES Site Colbert MONT SAINT-AIGNAN LES ACQUISITIONS RÉCENTES JUIN 2003 Au 30 juin 2003 - 20 documents - ABHYANKAR Shreeram Shankar Local analytic geometry World scientific, 2001 Cote : ABH ALEXANDERSON Gerald L., MUGLER Dale H. (eds) MAA, 1995 Cote : ALE ARNOUX P., AUBERT P.-L., de la HARPE et JHABVALA K., et alii Théorie ergodique. Séminaire de théorie ergodique, Les Plans-sur-Bex, 23-29 mars 1980 Cote : ARN BRIGGS Richard J. Electron-stream interaction with plasmas Massachusetts Institute of Technology, 1964 Cote : BRI CASTILLO-CHAVEZ Carlos, BLOWER Sally Mathematical approaches for emerging and reemerging infectious diseases : an introduction Springer, 2002 Cote : CAS CASTILLO-CHAVEZ Carlos, BLOWER Sally Springer, 2002 Cote : CAS FEYNMAN Richard, BROWN Laurie M. (ed.) Selected papers of Richard Feynman with commentary World scientific, 2000 Cote : FEY HORA Heinrich Nonlinear plasma dynamics at laser irradiation Springer, 1979 Lecture Notes in Physics n° 102 Cote : LNPY ISE Mikio, TAKEUCHI Masaru Lie groups I. Lie groups II AMS, 1996

11. De_Rham
Biography of georges de rham (19031990) georges de rham attended the secondaryschool Collège d Aigle from 1914 to 1919 and then at the Gymnase
http://www-groups.dcs.st-and.ac.uk/~history/Mathematicians/De_Rham.html
Georges de Rham
Born: 10 Sept 1903 in Roche, Canton Vaud, Switzerland
Died: 9 Oct 1990 in Lausanne, Switzerland
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to see a larger version Show birthplace location Previous (Chronologically) Next Biographies Index Previous (Alphabetically) Next Main index
Version for printing
Georges de Rham However de Rham also held a position at the University of Geneva. He was appointed there as extraordinary professor in 1936, being promoted to full professor in 1953. He retired from Geneva and was given an honorary position there in 1973. In addition to these permanent appointments de Rham held a number of visiting professorships. He visited Harvard in 1949/50 and the Institute for Advanced Study at Princeton in 1950 and again in 1957/58. He also visited the Tata Institute in Bombay in 1966. In [4] Raoul Bott describes the context of de Rham's famous theorem:- In some sense the famous theorem that bears his name dominated his mathematical life, as indeed it dominates so much of the mathematical life of this whole century. When I met de Rham in at the Institute in Princeton he was lecturing on the Hodge theory in the context of his 'currents'. These are the natural extensions to

12. References For De_Rham
Translate this page References for the biography of georges de rham. H Cartan, Les travaux degeorges de rham sur les variétés différentiables, in A Haefliger and R
http://www-groups.dcs.st-and.ac.uk/~history/References/De_Rham.html
References for Georges de Rham
Version for printing Books:
  • (Berlin - Heidelberg - New York, 1970).
  • (Geneva, 1981).
  • A Haefliger and R Narasimhan (eds.), (Berlin - Heidelberg - New York, 1970). Articles:
  • R Bott, Georges de Rham: 1901-1990, Notices Amer. Math. Soc.
  • H Cartan, La vie et l'oeuvre de Georges de Rham,
  • B Eckmann, Georges de Rham 1903-1990, Elem. Math.
  • Georges de Rham (1903-1990), Enseign. Math. Main index Birthplace Maps Biographies Index
    History Topics
    ... Anniversaries for the year
    JOC/EFR June 1997 School of Mathematics and Statistics
    University of St Andrews, Scotland
    The URL of this page is:
    http://www-history.mcs.st-andrews.ac.uk/References/De_Rham.html
  • 13. Georges De Rham - Wikipedia, The Free Encyclopedia
    georges de rham de rham himself developed a theory of homological currents,that showed how this fitted with the generalised function concept.
    http://en.wikipedia.org/wiki/Georges_de_Rham
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    Georges de Rham
    From Wikipedia, the free encyclopedia.
    Georges de Rham 10 September 9 October ) was a Swiss mathematician , known for his contributions to differential topology He studied at the University of Lausanne and then in Paris for a doctorate, becoming a lecturer in Lausanne in 1931; where he held positions until retirement in 1971; he held positions in Geneva in parallel. In 1931 he proved de Rham's theorem , identifying the de Rham cohomology groups as topological invariants. This proof can be considered as sought-after, since the result was implicit in the points of view of Henri Poincar© and ‰lie Cartan . The first proof of the general Stokes' theorem , for example, is attributed to Poincar©, in 1899. At the time there was no cohomology theory , one could reasonably say: for manifolds the homology theory was known to be self-dual with the switch of dimension to codimension (that is, from H k to H n-k , where n is the dimension). That is true, anyway, for

    14. BibScout - Rham, Georges De
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    15. De Rham Cohomology -- Facts, Info, And Encyclopedia Article
    de rham s theorem. de rham s theorem, proved by (Click link for more info andfacts about georges de rham) georges de rham in 1931, states that for a (A
    http://www.absoluteastronomy.com/encyclopedia/d/de/de_rham_cohomology.htm
    De Rham cohomology
    [Categories: Differential geometry, Theorems, Homology theory, Algebraic topology]
    In (A science (or group of related sciences) dealing with the logic of quantity and shape and arrangement) mathematics de Rham cohomology is a tool belonging both to (Click link for more info and facts about algebraic topology) algebraic topology and to (Click link for more info and facts about differential topology) differential topology , capable of expressing basic topological information about (Click link for more info and facts about smooth manifold) smooth manifold s in a form particularly adapted to computation and the concrete representation of (Click link for more info and facts about cohomology class) cohomology class es. It is a (Click link for more info and facts about cohomology theory) cohomology theory based on the existence of (Click link for more info and facts about differential form) differential form s with prescribed properties. It is in different, definite senses dual both to (Click link for more info and facts about singular homology) singular homology , and to (Click link for more info and facts about Alexander-Spanier cohomology) Alexander-Spanier cohomology
    Definition
    The set of smooth, differentiable differential

    16. List Of Swiss People -- Facts, Info, And Encyclopedia Article
    Michel Plancherel (18851967), mathematician (Click link for more info andfacts about georges de rham) georges de rham (1903-1990), mathematician
    http://www.absoluteastronomy.com/encyclopedia/L/Li/List_of_Swiss_people.htm
    List of Swiss people
    [Categories: Lists of people by nationality, Swiss people, Switzerland]
    This is a list of famous Swiss and notable people from or resident in (A landlocked federal republic in central Europe) Switzerland and (A small administrative division of a country) cantons forming present-day Switzerland.
    Architecture
    (Click link for more info and facts about Francesco Borromini) Francesco Borromini (1599-1667), architect in Italy
    (Click link for more info and facts about Mario Botta) Mario Botta (born 1943), architect
    (French architect (born in Switzerland) (1887-1965)) Le Corbusier Charles-Edouard Jeanneret
    (Click link for more info and facts about Jacques Herzog) Jacques Herzog (born 1950), architect
    (Click link for more info and facts about William Lescaze) William Lescaze
    (Click link for more info and facts about Pierre de Meuron) Pierre de Meuron (born 1950), architect
    Art
    (Click link for more info and facts about Jacques-Laurent Agasse) Jacques-Laurent Agasse (1767-1849), painter
    (Click link for more info and facts about Cuno Peter Amiet) Cuno Peter Amiet
    (Click link for more info and facts about Albert Anker) Albert Anker
    (Alsatian artist and poet who was cofounder of Dadaism in Zurich; noted for abstract organic sculptures (1887-1966))

    17. AIM Reprint Library:
    rham, georges 4. Reidemeister sTorsion Invariant and Rotations of S^n de rham, georges
    http://www.aimath.org/library/library.cgi?database=reprints;mode=display;BrowseT

    18. Georges De Rham - Linix Encyclopedia
    de rham himself developed a theory of homological currents, de rham alsoworked on the torsion invariants of smooth manifolds.degeorges de rham
    http://web.linix.ca/pedia/index.php/De_Rham
    Georges de Rham
    Georges de Rham 10 September 9 October ) was a Swiss mathematician , known for his contributions to differential topology He studied at the University of Lausanne and then in Paris for a doctorate, becoming a lecturer in Lausanne in 1931; where he held positions until retirement in 1971; he held positions in Geneva in parallel. In 1931 he proved de Rham's theorem , identifying the de Rham cohomology groups as topological invariants. This proof can be considered as sought-after, since the result was implicit in the points of view of Henri Poincaré and Élie Cartan . The first proof of the general Stokes' theorem , for example, is attributed to Poincaré, in 1899. At the time there was no cohomology theory , one could reasonably say: for manifolds the homology theory was known to be self-dual with the switch of dimension to codimension (that is, from H k to H n-k , where n is the dimension). That is true, anyway, for orientable manifolds , an orientation being in differential form terms an n -form that is never zero (and two being equivalent if related by a positive scalar field). The duality can to great advantage be reformulated in terms of the Hodge dual - intuitively, 'divide into' an orientation form - as it was in the years succeeding the theorem. Separating out the homological and differential form sides allowed the coexistence of 'integrand' and 'domains of integration', as

    19. De Rham Cohomology - Linix Encyclopedia
    de rham s theorem, proved by georges de rham in 1931, states that for a compactoriented smooth manifold M, the groups H k dR (M) are isomorphic as real
    http://web.linix.ca/pedia/index.php/De_Rham_cohomology
    De Rham cohomology
    In mathematics de Rham cohomology is a tool belonging both to algebraic topology and to differential topology , capable of expressing basic topological information about smooth manifolds in a form particularly adapted to computation and the concrete representation of cohomology classes . It is a cohomology theory based on the existence of differential forms with prescribed properties. It is in different, definite senses dual both to singular homology , and to Alexander-Spanier cohomology Table of contents showTocToggle("show","hide") 1 Definition
    2 Harmonic forms

    3 Hodge decomposition

    4 de Rham's theorem
    ...
    edit
    Definition
    The set of smooth, differentiable differential k -forms on any smooth manifold M form an abelian group (in fact a real vector space ) called
    k M
    under addition . The exterior derivative d gives mappings
    d k M k M
    There is a fundamental relationship
    d
    this follows essentially from symmetry of second derivatives . Therefore vector spaces of k -forms along with the exterior derivative are a cochain complex , the de Rham complex In differential geometry terminology, forms which are exterior derivatives are called

    20. Georges De La Tour - Definition Of Georges De La Tour By The Free Online Diction
    Information about georges de La Tour in the free online English dictionary andencyclopedia. georges de rham georges de rham georges de Scudery
    http://www.thefreedictionary.com/Georges de La Tour
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    Cite / link Email Feedback Thesaurus Legend: Synonyms Related Words Antonyms Noun Georges de La Tour - French painter of religious works (1593-1652) La Tour old master - a great European painter prior to 19th century Mentioned in References in classic literature No references found No references found Dictionary/thesaurus browser Full browser George Westinghouse George William Russell Georges Bank Georges Bizet ... Georges Cuvier Georges de La Tour Georges Enesco Georges Eugene Benjamin Clemenceau Georges Gilles de la Tourette Georges Henri Lemaitre ... Georges de la Nézière Georges de La Tour Georges de Rham Georges de Rham' Georges de Scudery Georges de Scudéry ... Georges Eugene Benjamin Clemenceau Word (phrase): Word Starts with Ends with Definition Free Tools: For surfers: Browser extension Word of the Day NEW!

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