81. Loodus- Ja Täppisteadlaste Eluaastaid K kaluza, theodor Franz Eduard (18851945) Kamerlingh-onnes, Heike (1853-1926) (HOLfüüsik) Kepler, Johannes (1571-1630) (GER astronoom ja matemaatik) Kerr http://www.physic.ut.ee/~janro/

A B C D ... Y A Abbe, Ernst Abbot, Charles Greeley Abel, Niels Henrik (1802-1829) (NOR matemaatik) Abelson, Philip Hauge Abraham, Max Abrikossov, Aleksei A. Adams, John Couch (1819-1892) (GBR astronoom) Aepinus, Franz Ulrich Theodor Agnesi, Maira Gaetana (1718-1799) (matemaatik) d'Alembert, Jean Baptiste Le Round (1717-1783) (FRA filosoof ja matemaatik) Amontons, Guillaume Ampére, André Marie Anaxagoras Anaximandros Anaximenes Apollonios, Pergest (~260-~170 e.m.a.) (kreeka matemaatik) Arago, Dominique Francois Aragon Armand Archimedes Aristarchos (320-250 e.m.a.) Aristoteles Arzela, Cesare (1847-1912) (matemaatik) Tagasi algusesse / Up B Babinet, Jacques Bacon, Roger (1214-1294) (inglise filosoof ja looduseuurija) Baire, Louis René (1874-1932) (matemaatik) Banach, Stefan (1892-1945) (POL matemaatik) Barrow, Isaac Bartels, Johann Martin Christian (1769-1836) (matemaatik) Bartholinus, Erasmus (1625-1698) (DEN loodusteadlane) Bateman, Harry (1882-1946) (matemaatik) Bayes, Thomas (1702-1761) (GBR matemaatik) Becquerel, Antoine Henri Bell, Alexander Graham

82. Encyclopedia4U - Theodor Kaluza - Encyclopedia Article PDF Extra Dimensions and Graviton Induced Processes http://www.encyclopedia4u.com/t/theodor-kaluza.html

ENCYCLOPEDIA U com Lists of articles by category ... Encyclopedia Home Page SEARCH : Theodor Kaluza Theodor Franz Eduard Kaluza November 9 January 19 ) was a German scientist known for the Kaluza-Klein theory involving field equations in five-dimensional space. This is a stub. Content on this web site is provided for informational purposes only. We accept no responsibility for any loss, injury or inconvenience sustained by any person resulting from information published on this site. We encourage you to verify any critical information with the relevant authorities. Privacy This article is licensed under the GNU Free Documentation License . It uses material from the Wikipedia article " Theodor Kaluza

83. Brian Greene: The Elegant Universe. Part 2. In 1919, theodor kaluza showed Einstein that general relativity could unite hisequation of gravity with Maxwell s electromagnetic equations, by assuming a http://www.voting.ukscientists.com/greene2.html

Brian Greene: The Elegant Universe. Part 2, hidden dimensions. Superstrings, Hidden Dimensions, and the Quest for the Ultimate Theory. To home page. Back to Super-strings: part one. Links to sections: Hidden dimensions Beyond strings: M-theory. Black holes as elementary particles; super-string cosmology. Postscript: Parallel universes. Hidden dimensions. In 1919, Theodor Kaluza showed Einstein that general relativity could unite his equation of gravity with Maxwell's electro-magnetic equations, by assuming a fourth dimension of space. ( With time, this made five dimensions in all. ) Oskar Klein suggested the fourth dimension could exist as a curled-up space too small to be observable, perhaps being only of Planck length. A simple analogy is that a garden hose looks like a single dimension from a distance. But close up, the line has thickness admitting of another circular dimension that can be traveled round by an insect. Kaluza's findings didnt fit the experimental data about the electron's mass and charge. Eventually, as more particles and the strong and weak forces became known, theorists wondered whether the fault with Kaluza-Klein theory had been too few dimensions rather than too many. This turned out to be the case for string theory. It had resolved the infinite probabilities, thrown up by elementary point particles, in an attempted quantum gravity theory. But negative probabilities also kept turning up. And these could only be removed by letting the strings vibrate in nine dimensions. ( A tenth spatial dimension was later infered, making eleven, including time. )

84. Names Jacobsthal James62J07 Jordan Kac Kahler kaluza Kan18A40 Karoubi19D25 Kasparov19K35 Hopf Hurwitz Jacobi Jacobson Jordan kaluza Klein Korteweg Kovalevskaya Kronecker Krull Kutta http://www.math.niu.edu/~rusin/known-math/98/MSC.names

85. ?-?(Kaluza-Klein Model) The summary for this Chinese (Simplified) page contains characters that cannot be correctly displayed in this language/character set. http://www.qiji.cn/baike/pages/8.html

86. Zeitlinien Friedrich Hornischer theodor KaluzaUni Königsberg unser U hat vielleicht mehr als 3 räumliche Dimensionen. http://www.zeitlinien-friedrich-hornischer.de/greene2.htm

Brian Greene: Das elegante Universum Teil 2 Superstrings, verborgene Dimensionen und die Suche nach der Weltformel. 2003 Berliner Taschenbuch Verlags GmbH Teil 1 Es wurde noch kein Superpartner- Teilchen entdeckt. Bosonen- Teilchen mit ganzzahligem Spin. Supersymmetrie- im Kontext mit der Superstringtheorie betrachtet. Man gliederte die Supersymmetrie in die auf Punktteilchen basierende Quantenfeldtheorie ein. 1985 gibt es 5 verschiedene Variationen der Stringtheorie - es sind verschiedene Arten, sie zu beschreiben. Einstein hat zu den 3 räumlichen Dimensionen die Zeit hinzugefügt: „Zukunft- Vergangenheit- Dimension" Gartenschlauch: Länge, „aufgewickelte Dimension" der Dicke. Dies vertrug sich nicht mit experimentellen Daten - Kaluza war seiner Zeit voraus. In den 70er Jahren sah man die Zusatzdimensionen als „höherdimensionale Supergravitation". Gibt es mehr Dimensionen, hat ein String mehr Richtungen, in die er schwingen kann. An jedem Punkt der 3 ausgedehnten Raumdimensionen befinden sich 6 unbeobachtbare Dimensionen. Höherdimensionale Calabi- Yau- Räume haben Löcher- „multidimensionale Löcher". Es hat bis jetzt noch niemand das Prinzip entdeckt, von dem bei der Auswahl von Calabi- Yao- Räumen auszugehen ist.

87. Piêkno Wszech¶wiata - Brian Greene - Biblioteka - Wirtualny Wszech¶wiat Niemniej w 1919 roku malo znany matematyk polskiego pochodzenia, theodor Kaluzaz Uniwersytetu w Królewcu, mial czelnosc podwazyc to, co oczywiste. http://www.wiw.pl/biblioteka/piekno_greene/01.asp

W iw.pl Na bie¿±co: I nformacje C o nowego Matematyka i przyroda: A stronomia B iologia ... odelowanie rzeczywisto¶ci Humanistyka: F ilozofia H istoria ... ztuka Czytaj: B iblioteka D elta ... ielcy i wiêksi Przydatne: S ³owniki C o i gdzie studiowaæ ... szech¶wiat w obrazkach Jeste¶ tutaj: Wirtualny Wszech¶wiat Biblioteka Fizyka Jeste¶ tutaj Piêkno Wszech¶wiata Brian Greene Rozdzia³ 8 - "UKRYTE WYMIARY" Tekst niniejszy jest rozdzia³em 8 ksi±¿ki Briana Greene'a "Piêkno Wszech¶wiata. Superstruny, ukryte wymiary i poszukiwania teorii ostatecznej" , która ukaza³a siê w marcu 2001 r. w serii "Na ¶cie¿kach nauki". Szukacz Przeszukaj Wirtualny Wszech¶wiat: Jak zadawaæ pytania? UKRYTE WYMIARY Dziêki szczególnej i ogólnej teorii wzglêdno¶ci Einsteinowi uda³o siê rozwik³aæ dwie zasadnicze sprzeczno¶ci naukowe ostatniego stulecia. Kiedy dostrzeg³ owe problemy, nie przypuszcza³, ¿e ich usuniêcie zrewolucjonizuje nasze pogl±dy na przestrzeñ i czas. Teoria strun rozwi±zuje trzeci± z wielkich zagadek ostatniego stulecia. Wymaga jednak, aby¶my poddali nasze wyobra¿enia o przestrzeni i czasie tak radykalnej zmianie, ¿e nawet Einsteinowi wyda³aby siê ona niezwyk³a. Teoria strun wstrz±sa podstawami wspó³czesnej fizyki. Zdecydowanie i przekonuj±co odrzuca nawet powszechnie przyjêt± liczbê wymiarów Wszech¶wiata - warto¶æ uznawan± dot±d za niepodwa¿aln±. Iluzja znajomo¶ci Do¶wiadczenie kszta³tuje intuicjê. Tworzy tak¿e uk³ad odniesienia dla analizowanych i interpretowanych zjawisk. Niew±tpliwie spodziewamy siê, ¿e na przyk³ad dziecko wychowane przez stado wilków bêdzie interpretowa³o ¶wiat zupe³nie inaczej ni¿ my. Nawet porównywanie ludzi wyros³ych w ró¿nych kulturach uwidacznia przemo¿ny wp³yw do¶wiadczeñ na nasz sposób my¶lenia.

88. Theodor Mommsen Definition Of Theodor Mommsen. What Is Theodor Mommsen? Meaning theodor Mommsen. Word Word. Noun, 1. theodor Mommsen German historian notedfor his history of Rome (1817-1903) http://www.thefreedictionary.com/Theodor Mommsen

Dictionaries: General Computing Medical Legal Encyclopedia Theodor Mommsen Word: Word Starts with Ends with Definition Noun Theodor Mommsen - German historian noted for his history of Rome (1817-1903) Mommsen historian historiographer - a person who is an authority on history and who studies it and writes about it Legend: Synonyms Related Words Antonyms Some words with "Theodor Mommsen" in the definition: cell doctrine cell theory Dr. Seuss E. T. A. Hoffmann ... Theodor Schwann Previous General Dictionary Browser Next Theobromic Theobromine Theochristic ... Theogonic Full Dictionary Browser Theodolite Theodolite (enc.) Theodolitic Theodoor Hendrik van de Velde (enc.) Theodor Adorno (enc.) Theodor Benfey (enc.) Theodor Bergk (enc.) Theodor Brorsen (enc.) Theodor Eicke (enc.) Theodor Escherich (enc.) Theodor Fontane (enc.) Theodor Geisel (enc.) Theodor Hendrik van de Velde (enc.) Theodor Herzel (enc.) Theodor Herzl (enc.) Theodor Heuss (enc.) Theodor Kaluza (enc.) Theodor Kocher (enc.) Theodor Liebknecht (enc.) Theodor Molien (enc.) Theodor Noldeke (enc.)

89. Ehrenfried Walther Von Tschirnhaus mit einer Unbekannten Diss. Königsberg 1907. Matthiessen http://www.tschirnhaus.de/literatur06.html

Mathematik Geschichte. Becker, Oskar / Hofmann, Joseph E. "Geschichte der Mathematik" Bonn 1951, S. 206 - 213, 222 - 229 Cantor, Moritz "Vorlesungen über Geschichte der Mathematik" Band III Leipzig 1900, Band 4 Leipzig 1908 Chasles, M. "Geschichte der Geometrie" deutsch von L. A. Sohnke, Halle 1839, S. 102 - 113 Hofmann, Jos. E. "Die Entwicklungsgeschichte der Leibnizschen Mathematik während seines Aufenthaltes in Paris (1672 - 1676)" München 1949 Loria, Gina "Storia delle Matematiche" Milano 1950 Infinitesimalmathematik: Hofmann, Jos. E. / Wieleitner, Heinrich "erste Versuche Leibnizens und Tschirnhausens, eine algebraische Funktion zu integrieren" in: Archiv f. Geschichte der Mathhematik, der Naturwiss. u. d. Technik, 13.Bd. (1931), S. 277 - 292 Hofmann, Jos. E. "Das Opus Geometricum des Gregorius a S. Vincentio und seine Einwirkung auf Leibniz" in: Abhdl. D. Preuß. Akad. d. Wiss. Jahrgang 1941, Nr. 13, Berlin 1942 Hofmann, Joseph E. "Leibniz´ mathematische Studien in Paris" in: "Leibniz zu seinem 300. Geburtstag" Lieferung 4, Berlin 1948 Hofmann, Jos. E. "Aus der Frühzeit der Infinitesimalmethoden: Auseinandersetzung um die algebraische Quadratur algebraischer Kurven in der zweiten Hälfte des 17. Jahrhunderts" Archive for history of exact sciences, Berlin ..., S. 270 - 343

90. Curled-Up Dimensions One of the first suggestions for closed cylindrical dimensions was made by TheodorKaluza in 1919, in a paper communicated to the Prussian Academy by Einstein http://www.meta-religion.com/Physics/Cosmological_physics/curled-up_dimensions.h

to promote a multidisciplinary view of the religious, spiritual and esoteric phenomena. About Us Links Search Contact ... Back to Physics Religion sections World Religions New R. Groups Ancient Religions Spirituality ... Extremism Science sections Archaeology Astronomy Linguistics Mathematics ... Contact The Web Metareligion More sections: Subscribe to the Metareligion Newsletter Submit your site Banners Index ... Polls Please, help us sustain this free site online. Make a donation using Paypal: Curled-Up Dimensions The simplest cylindrical space can be represented by the perimeter of a circle. This one-dimensional space with the coordinate X has the natural embedding in two-dimensional space with orthogonal coordinates (x ,x ) given by the circle formulas x /R = cos(X/R) x /R = sin(X/R) From the derivatives dx /dX = sin(X/R) and dx /dX = cos(X/R)we have the Pythagorean identity (dx + (dx = (dX) . The length of this cylindrical space is 2 p R.

91. ? The summary for this Russian page contains characters that cannot be correctly displayed in this language/character set. http://www.creme.mk.ua/m1fr8.htm

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