41. Introduction in diagrams in R 2 . kurt reidemeister proved that any rearrangement of a knot diagramcan be accomplished by three operations, called the reidemeister Moves http://yucc.yorku.ca/~mouse/knots/intro.html

42. Genealogischer Index Für Nachnamen, Die Beginnen Mit R Translate this page 4 März 1850 - ) reidemeister, Walter-Heinz Alfred ( lebt - ) reidemeister, WolfgangHeinrich Doris (20 November 1887 - ) Rosenthal, Udo Ernst kurt (8 Mai http://www.addsuxxess.de/gen/de/idx520.htm

A B C D ... Rambeke, Johann (ABT. 1300 - 1364 Rambeke, Ludolf (ABT. 1245 - AFT. 1303 Rambeke, Roleke Ramm, Andrea ( lebt - ) Ramm, Angela ( lebt - ) Ramm, Christine ( lebt - ) Ramm, Emil - 11 September 1945 Kottbus Ramm, Gerhard ( lebt - ) Ramm, Gertrud ( lebt - ) Ramm, Harald ( lebt - ) ( lebt - ) Ramm, Kerstin ( lebt - ) ( lebt - ) Ramm, Ralf ( lebt - ) Rangen, Friedrich Rangen, Margarete (ABT. 1590 - 1661) Rasmus, Hanna ( lebt - ) Raue, Carl Louis Emil (ABT. 1875 - ) Rausch, Julius August Karl (ABT. 1885 - ) Raven, "Corvus" Ludolf (ABT. 1270 - ) Raven, "Hans" Johann (1300 - BEF. 1381 Einbeck Raven, Alheit Raven, Anna Einbeck, Ni, D - 6 April 1651 Braunschweig, Ni, D Raven, Bruno ( - 1 November 1579) Raven, Dietrich (ABT. 1399 - 1449 Einbeck Raven, Dietrich Raven, Dietrich II. (ABT. 1435 - 1495) Raven, Dietrich III. Raven, Hans Einbeck Raven, Hans III. (ABT. 1412 - 1472 Einbeck Raven, Jobst Raven, Jobst Einbeck Einbeck Raven, Johann Philo (15 August 1609 Einbeck, 37574, Ni, D - 9 Juli 1665 Einbeck, 37574, Ni, D (ABT. 1520 - 1557) Raven, Lorenz

43. Genealogy Index For Surnames Beginning With R Translate this page March 1850 - ) reidemeister, Walter-Heinz Alfred ( living - ) reidemeister, WolfgangHeinrich Doris (20 November 1887 - ) Rosenthal, Udo Ernst kurt (8 May http://www.addsuxxess.de/gen/uk/idx520.htm

Genealogy Index for surnames beginning with R A B C D ... Rambeke, Johann (ABT. 1300 - 1364 Loneburg Rambeke, Johann (ABT. 1300 - 1364 Rambeke, Ludolf (ABT. 1245 - AFT. 1303 Rambeke, Ludolf (ABT. 1245 - AFT. 1303 Rambeke, Roleke Ramm, Andrea ( living - ) Ramm, Angela ( living - ) Ramm, Christine ( living - ) Ramm, Emil (31 March 1901 - 11 September 1945 Kottbus Ramm, Gerd ( living - ) Ramm, Gerhard ( living - ) Ramm, Harald ( living - ) ( living - ) Ramm, Kerstin ( living - ) ( living - ) Ramm, Ralf ( living - ) Rangen, Friedrich Rangen, Margarete (ABT. 1590 - 1661) Rasmus, Hanna ( living - ) Raue, Carl Louis Emil (ABT. 1875 - ) Rausch, Julius August Karl (ABT. 1885 - ) Raven, "Corvus" Ludolf (ABT. 1270 - ) Raven, "Hans" Johann (1300 - BEF. 1381 Einbeck Raven, Alheit Raven, Anna (22 March 1579 Einbeck, Ni, D - 6 April 1651 Braunschweig, Ni, D Raven, Bruno ( - 1 November 1579) Raven, Dietrich Raven, Dietrich (ABT. 1399 - 1449 Einbeck Raven, Dietrich II. (ABT. 1435 - 1495) Raven, Dietrich III. Raven, Hans Einbeck Raven, Hans III. (ABT. 1412 - 1472 Einbeck Raven, Jobst

44. CSC 370 Programming Assignment 4 - Prolog kurt reidemeister (1948) showed that any unknot can be untangled by performing anappropriate series of only three types of moves, called reidemeister moves. http://www.augustana.ab.ca/~mohrj/courses/2002.fall/csc370/assignments/prolog.kn

COMPUTING SCIENCE 370 Programming Languages Programming Assignment 4 Knot Theory in Prolog Due Date: Friday, December 6 (midnight) Objectives To learn the primary features of the Prolog language. To become acquainted with the techniques of logic programming. To become familiar with the recursive backtracking mechanism of Prolog. To become fluent in the list-handling notation and capabilities of Prolog. Knot Theory A tangle is a length of string which has been twisted around itself (possibly forming one or more knots) and then had its two ends joined. If the tangle can be converted into a simple loop without cutting the string, it is an unknot ; otherwise, it is a knot Knots may be represented by two-dimensional projections called knot diagrams , with letters labeling crossings , places where one portion of the string passes over or under another. Sections of string between two crossings are called arcs . The section of string passing under another is indicated by a broken line in the diagram. (See Figure 1 on the accompanying handout or an online figure of a knot diagram [without crossing labels].)

45. Mathematisches Seminar Translate this page Nachfolger Nielsens. Desweiteren stießen kurt reidemeister sowie RobertFurch in jenem Jahr im mathematischen Seminar dazu. Im Jahre http://www.math.uni-hamburg.de/math/ign/hh/1fi/mathsem.htm

Literatur Zum Seitenanfang Hessenberg (Breslau) Perron (Heidelberg) Erstes Ordinariat: Bieberbach (Frankfurt) Perron (Heidelberg) Zweites Ordinariat: Radon (Wien) Grammel (Halle) Extraordinariat: 1919-1922 Johann Radon (1887-1956), vorher in Wien, danach in Greifswald 1922-1925 Hans Rademacher (1892-1969), vorher in Berlin, danach in Breslau 1925-1937 Emil Artin (1898-1962), vorher PD in Hamburg, 1926 o. Prof., 1937 Emigration in die USA Die Anfangsjahre des mathematischen Seminars Zum Seitenanfang Rothenbaumchaussee 21 Emil Artin B.L. van der Waerden Literatur Zum Seitenanfang Behnke, H. Scharlau, W. (Hrsg.): Mathematische Institute in Deutschland, 1800-1945. Braunschweig/Wiesbaden: Vieweg, 1989 (Kulturgeschichte, Naturwissenschaft und Technik)

46. Virtueller Stadtrundgang In Hamburg - Kulturgeschichte, Naturwissenschaft Und Te Billstedt reidemeister, kurt (1893-1971) - Mathematiker, Assistent von Hecke http://www.math.uni-hamburg.de/math/ign/hh/1bio.htm

Fachbereich 11 - Mathematik HVV Tel.: +49 40 42838-2094 D-20146 Hamburg Fax: +49 40 42838-5260 Virtueller Stadtrundgang in Hamburg Kulturgeschichte Naturwissenschaften Technik und Verkehr Credits Personen Personen A B C ... Z Astronom, Astrophysiker Physiker Mathematiker, Rechenmeister oder Computerpionier/Informatiker Chemiker (auch chem. Industrie) Biologe, Zoologe, Botaniker Mediziner, Arzt, Physikus, Apotheker Geowissenschaftler, Seismologe, Kartograph, Meteorologe, Polarforscher, Seewarte Ingenieur, Techniker, Erfinder, Konstrukteur, Industrieller Siehe auch: Institutionen, Firmen, Themen Literatur A Abbe, Ernst (1840-1905) > Abbestr., Ottensen Aepinus, Johannes (1499-1553) - luth. Theologe, Superintendent in Hamburg Ambronn, Leopold Friedrich Anton (1854-1930) - Astronom in Hamburg, Ass., Obs. 1880-1897 Artin, Emil (1898-1962) - Mathematiker, Prof. in Hamburg, vgl. Artin, Emil B Baade, Walter (1893-1960) - Astrophysiker in Hamburg, 1919-1932, 1955 Bruce-Medaille Bagge, Erich (* 1912) - Physiker, auch Astronom Baule, B. (1891-1976) - Mathematiker, promovierte 1920 in Hamburg

47. Www.cmmacs.ernet.in/nal/icast/contents/48/48a.txt der Topologie by Paul Alexandroff, with an introduction by David Hilbert Einführungin die kombinatorische Topologie by kurt reidemeister Knotentheorie (vol. http://www.cmmacs.ernet.in/nal/icast/contents/48/48a.txt

Bulletin of the American Mathematical Society Volume 37, Number 1, January 2000 Donald G. Saari; Introductory comments Bull. Amer. Math. Soc. 37 (2000), pp. 1-2. President Thomas S. Fiske; Mathematical progress in America Bull. Amer. Math. Soc. 37 (2000), pp. 3-8. Professor James Pierpont; The history of mathematics in the nineteenth century Bull. Amer. Math. Soc. 37 (2000), pp. 9-24. Professor H. Poincaré; The present and the future of mathematical physics Bull. Amer. Math. Soc. 37 (2000), pp. 25-38. Albert Einstein; Elementary derivation of the equivalence of mass and energy Bull. Amer. Math. Soc. 37 (2000), pp. 39-44. Edward B. Van Vleck; Current tendencies of mathematical research Bull. Amer. Math. Soc. 37 (2000), pp. 45-53. Dr. L. E. J. Brouwer; Intuitionism and formalism Bull. Amer. Math. Soc. 37 (2000), pp. 55-64. G. D. Birkhoff; A mathematical critique of some physical theories Bull. Amer. Math. Soc. 37 (2000), pp. 65-74. Bhama Srinivasan; Editor's Introduction Bull. Amer. Math. Soc. 37 (2000), p. 75. H. Poincaré; Book Review Poincaré's review of Hilbert's Foundations of geometry, by David Hilbert Bull. Amer. Math. Soc. 37 (2000), pp. 77-78. J. M. Brooks; Book Review Vorlesungen über continuirliche Gruppen mit geometrischen undanderen Anwendungen by Sophus Lie Bull. Amer. Math. Soc. 37 (2000), pp. 78-79. R. D. Carmichael; Book Review Gesammelte Abhandlungen by Sophus Lie Bull. Amer. Math. Soc. 37 (2000), pp. 79-80. G. A. Miller; Book Review Theory of groups of a finite order by W. Burnside Bull. Amer. Math. Soc. 37 (2000), pp. 80-81. W. F. Osgood; Book Review Cours d'analyse mathématique by Édouard Goursat Bull. Amer. Math. Soc. 37 (2000), pp. 81-82. L. E. Dickson; Book Review Festschrift zur Feier des 100 Geburtstages Eduard Kummers mit Briefen an seine Mutter und an Leopold Kronecker Bull. Amer. Math. Soc. 37 (2000), pp. 82-83. E. B. Van Vleck; Book Review Lehrbuch der Funktionentheorie by Dr. W. F. Osgood Bull. Amer. Math. Soc. 37 (2000), pp. 83-84. G. E. Wahlin; Book Review Three lectures on Fermat's last theorem by L. J. Mordell Bull. Amer. Math. Soc. 37 (2000), pp. 84-85. S. Lefschetz; Book Review The Cambridge Colloquium, 1916, Part II. Analysis Situs by Oswald Veblen Bull. Amer. Math. Soc. 37 (2000), pp. 85-86. G. D. Birkhoff; Book Review Vorlesungen über Zahlentheorie by Edmund Landau Bull. Amer. Math. Soc. 37 (2000), p. 86. T. H. Hildebrandt; Book Review Leçons sur l'intégration et la recherche des fonctions primitives by H. Lebesgue Bull. Amer. Math. Soc. 37 (2000), p. 87. B. O. Koopman; Book Review Dynamical systems by G. D. Birkhoff Bull. Amer. Math. Soc. 37 (2000), p. 88. O. Ore; Book Review Moderne algebra by B. L. van der Waerden Bull. Amer. Math. Soc. 37 (2000), p. 89. P. A. Smith; Book Review Einfachste Grundbegriffe der Topologie by Paul Alexandroff, with an introduction by David Hilbert Einführung in die kombinatorische Topologie by Kurt Reidemeister Knotentheorie (vol. 1 of the Ergebnisse der Mathematik und ihrer Grenzgebiete) by K. Reidemeister Bull. Amer. Math. Soc. 37 (2000), pp. 90-91. H. L. Rietz; Book Review Grundbegriffe der Wahrscheinlichkeitsrechnung by A. Kolmogoroff Bull. Amer. Math. Soc. 37 (2000), pp. 91-92. A. W. Tucker; Book Review Vorlesungen über die Theorie der Polyeder unter Einschluss der Elementeder Topologie by Ernst Steinitz; edited and completed by Hans Rademacher Lehrbuch der Topologie by H. Seifert and W. Threlfall Bull. Amer. Math. Soc. 37 (2000), pp. 92-93. A. W. Tucker; Book Review Topologie I by Paul Alexandroff and Heinz Hopf Bull. Amer. Math. Soc. 37 (2000), pp. 93-94. Solomon Lefschetz; Book Review Algebraic surfaces by Oscar Zariski Bull. Amer. Math. Soc. 37 (2000), pp. 94-95. J. D. Tamarkin; Book Review Trigonometric series by Antoni Zygmund Bull. Amer. Math. Soc. 37 (2000), pp. 95-96. R. Salem; Book Review Trigonometric series by A. Zygmund Bull. Amer. Math. Soc. 37 (2000), p. 96. Hermann Weyl; Book Review La théorie des groupes finis et continus et la géométrie différentielle traitées par méthode du repère mobile by Élie Cartan Bull. Amer. Math. Soc. 37 (2000), pp. 96-97. Hermann Weyl; Book Review Methoden der mathematischen Physik, Vol. 2 by R. Courant and D. Hilbert Bull. Amer. Math. Soc. 37 (2000), pp. 97-98. E. T. Bell; Book Review An introduction to the theory of numbers by G. H. Hardy and E. M. Wright Bull. Amer. Math. Soc. 37 (2000), p. 99. N. Jacobson; Book Review The classical groups by Hermann Weyl Bull. Amer. Math. Soc. 37 (2000), p. 100 R. Brauer; Book Review The theory of group representations by Francis D. Murnaghan Bull. Amer. Math. Soc. 37 (2000), pp. 100-101. C. C. Torrance; Book Review Consistency of the axiom of choice and of the generalized continuum-hypothesis with the axioms of set theory by Kurt Gödel Bull. Amer. Math. Soc. 37 (2000), p. 102. D. J. Struik; Book Review The theory and applications of harmonic integrals by W. V. D. Hodge Bull. Amer. Math. Soc. 37 (2000), p. 102. A. H. Copeland; Book Review Theory of games and economic behavior by John von Neumann and Oskar Morgenstern Bull. Amer. Math. Soc. 37 (2000), p. 103. A. Weil; Book Review Introduction to the theory of algebraic functions of one variable by C. Chevalley Bull. Amer. Math. Soc. 37 (2000), pp. 103-105. P. A. Smith; Book Review The theory of Lie groups, I by Claude Chevalley Bull. Amer. Math. Soc. 37 (2000), p. 105. Oscar Zariski; Book Review Foundations of algebraic geometry by André Weil Bull. Amer. Math. Soc. 37 (2000), pp. 106-107. C. B. Allendoerfer; Book Review Regular polytopes by H. S. M. Coxeter Bull. Amer. Math. Soc. 37 (2000), pp. 107-108. Maurice Heins; Book Review Funktionentheorie by C. Carathéodory Bull. Amer. Math. Soc. 37 (2000), pp. 108-109. J. Wolfowitz; Book Review An introduction to probability theory and its applications, Vol. I by William Feller Bull. Amer. Math. Soc. 37 (2000), pp. 109-110. N. Levinson; Book Review The theory of the Riemann zeta-function by E. C. Titchmarsh Bull. Amer. Math. Soc. 37 (2000), p. 110. A. C. Schaeffer; Book Review Complex analysis by L. V. Ahlfors Bull. Amer. Math. Soc. 37 (2000), p. 111. E. R. Lorch; Book Review Leçons d'analyse functionelle by F. Riesz and B. Sz.-Nagy Bull. Amer. Math. Soc. 37 (2000), pp. 111-112. E. Artin; Book Review Éléments de mathématique by N. Bourbaki Bull. Amer. Math. Soc. 37 (2000), pp. 112-113. S. Mac Lane; Book Review Homological algebra by Henri Cartan and Samuel Eilenberg Bull. Amer. Math. Soc. 37 (2000), pp. 113-114. E. H. Spanier; Book Review Foundations of algebraic topology by S. Eilenberg and N. Steenrod Bull. Amer. Math. Soc. 37 (2000), pp. 114-115. S. Lang; Book Review Éléments de géométrie algébrique by A. Grothendieck Bull. Amer. Math. Soc. 37 (2000), pp. 115-116. David A. Buchsbaum; Book Review Homology by Saunders Mac Lane Bull. Amer. Math. Soc. 37 (2000), p. 117. Gian-Carlo Rota; Book Review Linear operators. Part II. Spectral theory by Nelson Dunford and Jacob T. Schwartz, with the assistance of William G.Bade and Robert G. Bartle Bull. Amer. Math. Soc. 37 (2000), p. 118.

48. Teoria Wêz³ów, Splotów I Warkoczy W roku 1926 Niemiecki matematyk kurt reidemeister (18931971) wykazal iz majacdwie rózne projekcje tego samego wezla, mozemy przej?c od jednej http://www.math.put.poznan.pl/~kargajda/knots/wezly.html

Teoria wêz³ów, splotów i warkoczy Karol Gajda Wêz³y Sk³adanie wêz³ów Ruchy Reidemeister'a ... Bibliografia Wêz³y Wêz³em nazywamy podzbiór przestrzeni R homeomorficzny z okrêgiem. Jako fizyczn± prezentacjê wêz³a traktowaæ mo¿emy dowolnie zapêtlony sznur, którego koñce zosta³y ze sob± po³±czone. Mówimy, ¿e dwa wêz³y K i K s± równowa¿ne , gdy istnieje homeomorfizm przestrzeni R na siebie, który przeprowadza K na K Relacja równowa¿noœci wêz³ów jest równowa¿noœci± . Jej klasy abstrakcji nazywamy typami wêz³ów . Okr±g niezawêŸlony (tzw. wêze³ trywialny, nie-wêze³) R : x +y ma typ trywialny. Wêz³y dzielimy tak¿e na ³agodne , gdy s± równowa¿ne wêz³owi bêd±cemu sum± skoñczenie wielu odcinków (zwanych krawêdziami, zakoñczonych wierzcho³kami). Wêze³, który nie jest ³agodny, nazywamy dzikim . Wêze³ taki przedstawiono na poni¿szym rysunku. Analizuj±c wêze³ pos³ugujemy siê zwykle jego rzutem równoleg³ym na p³aszczyznê - projekcj± r : R Punkt p obrazu r(K) nazywaæ bêdziemy punktem wielokrotnym , gdy jego przeciwobraz r (p) zawiera wiêcej ni¿ jeden punkt wêz³a K . Zazwyczaj bêdziemy d±¿yæ do przedstawienia wêz³a w mo¿liwie prostej postaci - np. w po³o¿eniu regularnym , tzn. takim, ¿e:

49. USP/SIBi - DEDALUS Translate this page 1913- Completo, 17, 0318046, reidemeister, kurt, 1893-, Knotentheorie. 1948c1932 Completo, 18, 0342026, Rey Pastor, J, Geometria integral /, 1951. http://dedalus.usp.br:4500/ALEPH/POR/USP/USP/TES/SHORT/393417/11/

Formato resumido de registros - DEDALUS Para visualizar o formato completo de um registro, "clicar" sobre o item.

50. TecaLibri: Indice Degli Autori Di: Matematica Julia Robinson. A Life in Mathematics; reidemeister , kurt, , Knottentheorie;Reiff , R., , Geschichte der Unendlichen Reiben; Resher http://web.infinito.it/utenti/t/tecalibri/Classi/M/Matematica_B_0001.htm

Classi Autori TecaLibri autori titoli copertine matematica: autori (+rif) Aarts , E.H.L., , Local Search in Combinatorial Optimisation Abel , Niels Henrik, 1802-1829, Oeuvres complètes de N.H. Abel, mathématicien Adams , C., , The Knot Book Agnesi , Maria Gaetana, 1718-1799, Instituzioni analitiche ad uso della gioventù italiana [2 voll.] Albers , Donald J., , Mathematical People Aleksandrov , A.D., , Mathematics: its Content, Methods and Meaning Amaldi , Edoardo, 1908-1989, La vita e l'opera di Ettore Majorana (1906-1938) Anzoletti , L., , Maria Gaetana Agnesi Archimede , , -287212, Sulle spirali Arnol'd , Vladimir, , Mathematics Tomorrow Atiyah , Michael, , Fields Medallists' Lectures Bachet , , , Problèmes plaisant et delectables qui se font par le nombres Bak , Per, , How Nature Works. The Science of Self-Organized Complexity Baltzer , R., , Die Elemente der Mathematik Barr , Stephen, , Experiments in Topology Barrow , John D., 1952, [copertine] Bartley , William Warren III, , Lewis Carroll's Symbotic Logic

51. VI.1. INTRODUCCIÓN Translate this page Aunque posteriormente se agregaron al Círculo de Viena otros miembros, como el abogadoFélix Kaufmann, los matemáticos Karl Menger y kurt reidemeister, y el http://lectura.ilce.edu.mx:3000/sites/ciencia/volumen3/ciencia3/161/htm/sec_38.h

52. Coxeter Library Monograph Holdings Earl D. Differential and Integral Calculus Ratinet, A. Logarithmes Redheffer, RMMathematics of Physics and Modern Engineering reidemeister, kurt Raum und Zahl http://www.math.yorku.ca/Library/Collect.html

Coxeter Library: Monograph and other holdings Collections Coxeter Collection (49 Titles) Pounder Collection (203 Titles) Shimrat Collection (173 Titles) Sieburth Collection (32 Titles) Wittenberg Collection (477 Titles) Miscellaneous other titles (Under construction) Coxeter collection of geometry reprints (4 filing cabinets) Coxeter Collection Pounder Collection M. Shimrat Collection This portion of this site is still under construction. G. Sieburth Collection Wittenberg Collection Miscellaneous other titles This collection is only partially catalogued. ICM: Actes du congres international des mathematiciens, Nice 1970, 3 volumes. Donated by M. Muldoon Proceedings of the International Congress of Mathematicians, Vancouver 1974, 2 volumes. Donated by M. Muldoon Equadiff: Equadiff 3 - Proceedings of the Czechoslovak conference on differential equations and their applications, Brno 1972 Donated by M. Muldoon Equadiff 6 - Proceedings of the international conference on differential equations and their applications, Brno 1985 Donated by M. Muldoon Main Menu

53. BULL - Volume 37, Number 1 der Topologie by Paul Alexandroff and with an introduction by David Hilbert Einführungin die kombinatorische Topologie by kurt reidemeister Knotentheorie (vol http://www.num.math.uni-goettingen.de/trapp/bull-index.html

ISSN 1088-9485 (e) ISSN 0273-0979 (p) Journals home Search journals For Authors Subscribe ... All issues Contents of Volume 37, Number 1 Introductory comments Donald G. Saari Bull. Amer. Math. Soc. Abstract, references and article information Retrieve article in: PDF DVI TeX PostScript Mathematical progress in America President Thomas S. Fiske Bull. Amer. Math. Soc. Abstract, references and article information Retrieve article in: PDF DVI TeX PostScript The history of mathematics in the nineteenth century Professor James Pierpont Bull. Amer. Math. Soc. Abstract, references and article information Retrieve article in: PDF DVI TeX PostScript The present and the future of mathematical physics Bull. Amer. Math. Soc. Abstract, references and article information Retrieve article in: PDF DVI TeX PostScript Elementary derivation of the equivalence of mass and energy Albert Einstein Bull. Amer. Math. Soc. Abstract, references and article information Retrieve article in: PDF DVI TeX PostScript Current tendencies of mathematical research Edward B. Van Vleck

54. Full Alphabetical Index Translate this page 876*) Rayleigh, Lord John (190*) Razmadze, Andrei (64) Recorde, Robert (282*) Regiomontanus(341*) Reichenbach, Hans (125) reidemeister, kurt (472*) Reiner http://www.geocities.com/Heartland/Plains/4142/matematici.html

Completo Indice Alfabetico Cliccare su una lettera sottostante per andare a quel file. A B C D ... XYZ Cliccare sotto per andare agli indici alfabetici separati A B C D ... XYZ Il numero di parole nella biografia e' dato in parentesi. Un * indica che c'e' un ritratto. A Abbe , Ernst (602*) Abel , Niels Henrik (286*) Abraham bar Hiyya (240) Abraham, Max Abu Kamil Shuja (59) Abu'l-Wafa al'Buzjani (243) Ackermann , Wilhelm (196) Adams, John Couch Adams, Frank Adelard of Bath (89) Adler , August (114) Adrain , Robert (79) Aepinus , Franz (124) Agnesi , Maria (196*) Ahlfors , Lars (725*) Ahmed ibn Yusuf (60) Ahmes Aida Yasuaki (114) Aiken , Howard (94) Airy , George (313*) Aitken , Alexander (825*) Ajima , Chokuyen (144) Akhiezer , Naum Il'ich (248*) al'Battani , Abu Allah (194) al'Biruni , Abu Arrayhan (306*) al'Haitam , Abu Ali (269*) al'Kashi , Ghiyath (73) al'Khwarizmi , Abu (123*) Albanese , Giacomo (282) Albert of Saxony Albert, Abraham Adrian (121*) (158*) Alberti , Leone (181*) Alberto Magno, San (109*) Alcuin di York (237*) Aleksandrov , Pave (160*) Alembert , Jean d' (291*) Alexander , James (163) Amringe , Howard van (354*) Amsler , Jacob (82) Anassagora di Clazomenae (169) Anderson , Oskar (67) Andreev , Konstantin (117) Angeli , Stefano degli (234) Anstice , Robert (209) Antemio of Tralles (55) Antifone il Sofista (125) Apollonio di Perga (276) Appell , Paul (1377) Arago , Dominique (345*) Arbogasto , Louis (87) Arbuthnot , John (251*) Archimede di Siracusa (467*) Archita of Tarentum (103) Argand , Jean (81) Aristeo il Vecchio (44) Aristarco di Samo (183) Aristotele Arnauld , Antoine (179)

55. Equivalence Moves (These moves are also called reidemeister, named after kurt reidemeisterwho stated and proved this theorem). Click below to see these moves. http://www.geocities.com/aneziris/l3.htm

Equivalence Moves If two links possess identical regular presentations, it is obvious that they are equivalent (ambient isotopic). This is also true if their presentations are topologically equivalent (i.e. there exists a continuous deformation that maps the one presentation to the other), even if the presentations are not identical. The converse of these statements is not true. Two presentations may be "quite different" from each other, and still yield equivalent links. They may even be topologically distinct, in the sense that no continuous deformation can map one presentation to the other, and still correspond to ambient isotopic links. This may happen because as one link is deformed and/or rotated, one may pass through a projection that is not a normal presentation, and end up in an inequivalent presentation. The following theorem is valid. Two link presentations correspond to ambient isotopic links if and only if the presentations can be connected through a series of "equivalence" moves. (These moves are also called Reidemeister , named after Kurt Reidemeister who stated and proved this theorem). Click below to see these moves.

56. Neue Galerie Graz - Jenseits Von Kunst / 4 Mathematik Und Physik Translate this page und im letzten Jahrhundert einige Revolutionen durchgemacht, an denen zB Farkasund János Bolyai in Ungarn und Karl Menger und kurt reidemeister in Wien http://www.stmk.gv.at/verwaltung/lmj-ng/97/jvk/04.html

jenseits von kunst Ausstellungen Kataloge Homepage ... Mail Mathematik und Physik Entropie Zahlentheorie Funktionalanalysis statistischen Physik ... Atombombe Entropie Einer ihrer Wolfgang Schmidt Wilhelm Frank schildert Funktionalanalysis Johann Radon, Georg Kreisel, Alfred Tauber, Richard von Mises, John G. Kemeny, Paul R. Halmos u.a.). Christa Binder zeigt an Olga Todd-Taussky exemplarisch den Lebensweg einer Mathematikerin in diesem Jahrhundert. Leopold Vietoris G. Helmberg und K. Sigmund Raoul Bott gelten ebenfalls der algebraischen Geometrie (M. Neuwirther). Geometrie kann sehr abstrakt sein, manchmal aber auch sehr anschaulich oder gar spielerisch. An Gruppentheorie , der Disziplin, die mathematisch dem Symmetriebegriff zugrunde liegt. Die Geometrie hat in diesem und im letzten Jahrhundert einige Revolutionen durchgemacht, an denen z.B. in Ungarn und Karl Menger und Kurt Reidemeister in Wien beteiligt waren. , oft auch der "Satz des Jahrhunderts" genannt (P.Weibel und E. Köhler), schlägt eine unerwartete Brücke zu Problemen der (mathematischen) Physik (M. Stöltzner). Ein wichtiger Entropie Ludwig Boltzmann hat damit das ganze Gebiet der statistischen Physik Richard von Mises hat die mathematischen Grundlagen der Wahrscheinlichkeitstheorie Auszugsweise wird der Orginalaufsatz von Leo Szilard Informationstheorie Szilards Autobiographie weist auf seine und seiner Freunde ( ) Beteiligung an der Entwicklung der Atombombe interne Prinzipien (Proportion, Reihe, Serie etc.)

57. Jonathan Grobe Books: Mathematics Add to Shopping Cart. reidemeister, kurt Vorlesungen Uber Grundlagen Der GeometrieGood Exlibrary, usual markings. Cover soiling Some cover wear. http://www.grobebooks.com/mathematics.html

Mathematics Catalog Jonathan Grobe Books PO Box 188 Deep River, IA 52222 Email : grobe@netins.net Goto homepage to browse our other catalogues: http://www.grobebooks.com ... Review Shopping Cart or Checkout Terms Email order or inquiry to me or use Shopping Cart. All books are subject to prior sale. Include Book Record # in all correspondence. Payment methods: Check/Money Order. VISA/Mastercard/Discover/Amex. Shipping: [Oversize packages are more] Media Mail: $3.50 Priority flat rate envelope: $5.50 Global priority envelope: $10 (Canada and Mexico: $8) No Dealer Discount. All books may be returned within 2 weeks of receipt for any reason. Abian, Alexander Boolean Rings Very Good Paperback Branden Press 394 pages. 1976 Record # 9143 Add to Shopping Cart Albers, Donald J. Mathematical People: Profiles And Interviews Very Good in Very Good dust jacket Hardcover Birkhauser 372 pages. 1985 Record # 18058 Add to Shopping Cart Asimov, Isaac Quick And Easy Math Very Good in Very Good dust jacket Exlibrary, usual markings. Hardcover Houghton Mifflin 180 pages. 1964 Record # 15920 Add to Shopping Cart Association Of Teachers Of Mathematics Mathematical Reflections Very Good 0521095824 Paperback Cambridge 241 pages. 1970 Record # 2162

58. Department Of Mathematics @ University Of Vienna Translate this page Hans Hahn mit den Studenten und Dozenten kurt Gödel, Eduard Helly, Witold Hurewicz,Walther Mayer, Karl Menger, Johann Radon, kurt reidemeister, Otto Schreier http://www.mat.univie.ac.at/institute/history.php?language=de

59. Department Of Mathematics @ University Of Vienna worked with the students and Dozenten kurt Gödel, Eduard Helly, Witold Hurewicz,Walther Mayer, Karl Menger, Johann Radon, kurt reidemeister, Otto Schreier http://www.mat.univie.ac.at/institute/history.php

Department of Mathematics Faculty of Natural Sciences and Mathematics University of Vienna Local time Sun March 30 2003 09:25 am Deutsch English History of the Mathematics Institute Home Mathnet Homepage Vacant Position News ... Links The history of mathematics at the University of Vienna traces back to the year of foundation of the University of Vienna, 1365. As a part of the education in the Artistic Faculty , mathematics was, right from the beginning, an integral part of university life in Vienna. As outstanding figure of this early time we must mention , who became later known, and famous, under the name of his origin, Regiomontanus . He was perhaps the leading mathematician of his time. For example, his trigonometric tables went with Christoph Columbus on his trip to the "new world". While there was originally one professor in mathematics, over the centuries the number of professors in mathematics at the University of Vienna grew gradually up to finally three at the end of the 19th century. In this time, precisely in the year 1876, the "Mathematisches Seminar" was founded, not least at the instigation of

60. Graph Theory Fig. 2, reidemeister Moves. In 1926, kurt reidemeister proved that the followingthree operations describe all the operations that preserve ambient isotopy. http://www.cs.mcgill.ca/~mhyndm/cs507/gbody.html

Regular Projection A projection of a graph is a mapping from 3D to 2D. A projection of graph G is considered a regular projection if no three points map to the same point and no vertex maps to any other point on the projected graph. Regular projections are important because they give relatively clear depictions of all the edges and vertices in the graph If graph doesn't have a regular projection , then there exists a graph in its isomorphic class that does. . Isomorphism Two graphs, A and B, are isomorphic if the following properties hold. For every vertex 'a' in graph A, there is a corresponding vertex 'b' in graph B. This is called a one-to-one correspondance between the vertices in A and B. If the vertices 'a1' and 'a2' are connected by an edge in A, their corresponding vertices 'b1' and 'b2' must be connected by an edge in B. Following from the definition above it is clear that isomorphic graphs have the same number of edges and vertices. If the number of vertices in A was greater than the number of vertices in B, there would not be a corresponding vertex in B for every vertex in A. It is easy to confuse the concept of isomorphism with that of ambient isotopy. Isomorphism does not necessarily preserve links or knots.

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