1. Lipschitz Rudolf Otto Sigismund Lipschitz. Rudolf Lipschitz's father was a landowner andRudolf was born his father's estate at Bönkein which was near Königsberg. http://www-gap.dcs.st-and.ac.uk/~history/Mathematicians/Lipschitz.html

Rudolf Otto Sigismund Lipschitz Born: Died: 7 Oct 1903 in Bonn, Germany Click the picture above to see two larger pictures Show birthplace location Previous (Chronologically) Next Biographies Index Previous (Alphabetically) Next Main index Rudolf Lipschitz During his two years in Breslau, Lipschitz wrote two not very important papers. Jointly with Heinrich Schroeter and M Frankenheim, he founded a seminar in mathematics and mathematical physics. The paper [5] looks at Lipschitz's career during these two years. He was nominated an ordinary professor by the University of Bonn and he left Breslau at Easter 1864. The University of Bonn was where Lipschitz spent the rest of his career. This was not because he did not have the opportunity to move. Quite the reverse, after Clebsch Klein received his doctorate from the University of Bonn in 1868. He was supervised by , and examined by Lipschitz. Perhaps if Klein Perhaps the most remarkable fact about Lipschitz's work was the widely different topics on which he contributed [1]:- He carried out many important and fruitful investigations in number theory , in the theory of Bessel functions and of Fourier series , in ordinary and partial differential equations , and in analytical mechanics and potential theory He worked on quadratic differential forms and mechanics. In the paper [4] the author shows convincingly how Lipschitz mechanical interpretation of

2. Lipschitz Translate this page lipschitz rudolf allemand, 1832-1903 Après des études à la célèbreuniversité de Königsberg, Rudolf Otto Sigismund Lipschitz http://www.sciences-en-ligne.com/momo/chronomath/chrono1/Lipschitz.html

LIPSCHITZ Rudolf allemand, 1832-1903 Dirichlet Cauchy Condition de Lipschitz : , d'ordre a, de rapport k, si pour tout (x,y) : a Brouwer : Carroll Peaucellier

3. Bedeutende Mathematiker Translate this page lipschitz rudolf (1832 - 1903, Bonn), Möbius August Ferdinand (1790 - 1868, Leipzig). PeanoGuiseppe (1858 - 1932, Turin), lipschitz rudolf (1832 - 1903, Bonn). http://www.mathematik.ch/mathematiker/

Home Geschichte Mathematiker Zitate ... Suche Bedeutende Mathematiker alphabetisch nach Geburtsdatum Abel Niels (1802 -1829, Froland, Norwegen) Thales von Milet (um 625 - 546 v. Chr.) Appolonios von Perge (262 - 190 v.Chr., Pergamon?) Pythagoras von Samos (um 580 - 496 v. Chr., Kroton) Archimedes (287 - 212 v. Chr., Syrakus) Zenon von Elea (um 490 - um 430 v.Chr.) Aristoteles (384 - 322 v. Chr., Chalkis) Aristoteles (384 - 322 v. Chr., Chalkis) Banach Stefan (1892 - 1945, Lwów) Euklid von Alexandria (um 360 - um 300 v. Chr. ?) Bernoulli Jakob (1654 - 1705, Basel) Archimedes (287 - 212 v. Chr., Syrakus) Bernoulli Johann (Bruder von Jakob) (1667 - 1748, Basel) Appolonios von Perge (262 - 190 v.Chr., Pergamon?) Bernoulli Daniel (Sohn von Johann) (1700 - 1782, Basel) Ries Adam (1492 - 1559, Annaberg) Bessel Friedrich Wilhelm (1784 - 1846, Königsberg) Cardano Geronimo (1501 - 1576, Rom) Cantor Georg (1845-1918, Halle) Viète (Vieta) François (1540 - 1603, Paris) Cauchy Augustin Louis (1789 - 1857, Paris) Neper (Napier) John (1550 - 1617, Edinburgh) Cardano Geronimo (1501 - 1576, Rom)

4. WIEM: Lipschitz Rudolf Otto Sigismund lipschitz rudolf Otto Sigismund (18321903), matematyk niemiecki, profesoruniwersytetów w Bonn i Berlinie, autor prac z dziedziny teorii liczb http://www.encyklopedia.pl/wiem/doc/a2f0e71be0b96f5a05256369007c3aa6

wiem.onet.pl napisz do nas losuj: has³a multimedia Matematyka, Niemcy Lipschitz Rudolf Otto Sigismund widok strony znajd¼ podobne poka¿ powi±zane Lipschitz Rudolf Otto Sigismund (1832-1903), matematyk niemiecki, profesor uniwersytetów w Bonn i Berlinie, autor prac z dziedziny teorii liczb i analizy matematycznej (teoria szeregów i równañ ró¿niczkowych). zobacz wszystkie serwisy do góry Encyklopedia zosta³a opracowana na podstawie Popularnej Encyklopedii Powszechnej Wydawnictwa Fogra

5. Mathematiker Mit Ll Translate this page Liouville Joseph (1809 - 1882, Saint-Omer). lipschitz rudolf (1832 - 1903,Bonn). Littlewood Dudley Ernest (1903 - 1979, London). Littlewood http://homepages.compuserve.de/thweidenfeller/mathematiker/l.html

L Lagrange Joseph Louis (1736 - 1813, Paris) Laplace Pierre Simon (1749 - 1827, Paris) Lebesgue Henri Léon (1875 -1941, Paris) Legendre Adrien Marie (1752 - 1833, Paris) ... zurück

6. Einige Der Bedeutenden Mathematiker Translate this page Lie Marius Sophus, 1842-1899. Liouville Joseph, 1809-1882. lipschitz rudolf Otto,1832-1903. Lissajous Jules Antoine, 1822-1880. Littlewood John Edensor, 1885-1977. http://www.zahlenjagd.at/mathematiker.html

Einige der bedeutenden Mathematiker Abel Niels Hendrik Appolonius von Perga ~230 v.Chr. Archimedes von Syrakus 287-212 v.Chr. Babbage Charles Banach Stefan Bayes Thomas Bernoulli Daniel Bernoulli Jakob Bernoulli Johann Bernoulli Nicolaus Bessel Friedrich Wilhelm Bieberbach Ludwig Birkhoff Georg David Bolyai János Bolzano Bernhard Boole George Borel Emile Briggs Henry Brouwer L.E.J. Cantor Georg Ferdinand Carroll Lewis Cassini Giovanni Domenico Cardano Girolamo Cauchy Augustin Louis Cayley Arthur Ceulen, Ludolph van Chomsky Noel Chwarismi Muhammed Ibn Musa Al Church Alonzo Cohen Paul Joseph Conway John Horton Courant Richard D'Alembert Jean Le Rond De Morgan Augustus Dedekind Julius Wilhelm Richard Descartes René Dieudonné Jean Diophantos von Alexandria ~250 v. Chr. Dirac Paul Adrien Maurice Dirichlet Peter Gustav Lejeune Eratosthenes von Kyrene 276-194 v.Chr. Euklid von Alexandria ~300 v.Chr. Euler Leonhard Fatou Pierre Fermat Pierre de Fischer Ronald A Sir Fourier Jean-Baptiste-Joseph Fraenkel Adolf Frege Gottlob Frobenius Ferdinand Georg Galois Evariste Galton Francis Sir Gauß Carl Friedrich Germain Marie-Sophie Gödel Kurt Goldbach Christian Hadamard Jacques Hamilton William Rowan Hausdorff Felix Hermite Charles Heawood Percy Heron von Alexandrien ~60 n.Chr.

7. Rudolf Lipschitz, Mathematician rudolf Otto Sigismund lipschitz, mathematician. lipschitz was a versatile mathematician who found a useful condition http://www.mth.kcl.ac.uk/~streater/lipschitz.html

Rudolf Otto Sigismund Lipschitz, mathematician Lipschitz was a versatile mathematician who found a useful condition that guarantees that a non-linear differential equation has a unique solution in some interval [0,T) of the independent variable, given the initial condition. Go to my HOME PAGE for more links.

8. Lipschitz Biography of rudolf lipschitz (18321903) rudolf lipschitz's father was a landowner and rudolf was born his father's estate at Bönkein which was near Königsberg. http://www-groups.dcs.st-and.ac.uk/~history/Mathematicians/Lipschitz.html

Rudolf Otto Sigismund Lipschitz Born: Died: 7 Oct 1903 in Bonn, Germany Click the picture above to see two larger pictures Show birthplace location Previous (Chronologically) Next Biographies Index Previous (Alphabetically) Next Main index Rudolf Lipschitz During his two years in Breslau, Lipschitz wrote two not very important papers. Jointly with Heinrich Schroeter and M Frankenheim, he founded a seminar in mathematics and mathematical physics. The paper [5] looks at Lipschitz's career during these two years. He was nominated an ordinary professor by the University of Bonn and he left Breslau at Easter 1864. The University of Bonn was where Lipschitz spent the rest of his career. This was not because he did not have the opportunity to move. Quite the reverse, after Clebsch Klein received his doctorate from the University of Bonn in 1868. He was supervised by , and examined by Lipschitz. Perhaps if Klein Perhaps the most remarkable fact about Lipschitz's work was the widely different topics on which he contributed [1]:- He carried out many important and fruitful investigations in number theory , in the theory of Bessel functions and of Fourier series , in ordinary and partial differential equations , and in analytical mechanics and potential theory He worked on quadratic differential forms and mechanics. In the paper [4] the author shows convincingly how Lipschitz mechanical interpretation of

9. References For Lipschitz References for rudolf lipschitz. Articles H Kortum, rudolf lipschitz, Jahresberichteder Deutschen Mathematiker vereinigung 15 (1906), 5659. http://www-gap.dcs.st-and.ac.uk/~history/References/Lipschitz.html

References for Rudolf Lipschitz Biography in Dictionary of Scientific Biography (New York 1970-1990). Articles: H Kortum, Rudolf Lipschitz, Jahresberichte der Deutschen Mathematiker vereinigung W Scharlau, The mathematical correspondence of Rudolf Lipschitz, Historia Math. R Tazzioli, Rudolf Lipschitz's work on differential geometry and mechanics, in The history of modern mathematics III (Boston, MA, 1994), 113-138. T Weber, Rudolf Lipschitz as professor at Breslau University in the years 1862-1864 (Polish), Wiadom. Mat. Rev. Histoire Sci. Appl. Main index Birthplace Maps Biographies Index History Topics ... Anniversaries for the year JOC/EFR May 2000 School of Mathematics and Statistics University of St Andrews, Scotland The URL of this page is: http://www-history.mcs.st-andrews.ac.uk/history/References/Lipschitz.html

10. LipschitzWarning Unable To Connect To PostgresSQL Server ConnectDB() Failed Is T References for the biography of rudolf lipschitz H Kortum, rudolf lipschitz, Jahresberichte der Deutschen Mathematiker vereinigung 15 (1906), 5659. http://hcoonce.math.mankato.msus.edu/html/id.phtml?id=19964

11. Lipschitz, Rudolf Otto Sigismund lipschitz, rudolf Otto Sigismund (18321903). German mathematician whodeveloped a hypercomplex system of number theory, which became http://www.cartage.org.lb/en/themes/Biographies/MainBiographies/L/Lipschitz/1.ht

Lipschitz, Rudolf Otto Sigismund German mathematician who developed a hypercomplex system of number theory, which became known as Lipschitz algebra. His work in basic analysis provided a condition for the continuity of a function, now known as the Lipschitz condition, subsequently of great importance in proofs of existence and uniqueness, as well as in approximation theory and constructive function theory. Lipschitz did extensive work in number theory, Fourier series, the theory of Bessel functions, differential equations, the calculus of variations, co-gradient differentiation, geometry, and mechanics. In investigating the sums of arbitrarily many squares, he derived computational rules for certain symbolic expressions from real transformations. The investigations he began in 1869 into forms of n differentials led to his most valuable contribution to mathematics: the Cauchy-Lipschitz method of approximation of differentials. Lipschitz's book Grundlagen der Analysis 1877-80 was a synthetic presentation of the foundations of mathematics and their applications. The work provided a comprehensive survey of what was then known of the theory of rational integers, differential equations, and function theory.

12. Mathematicians Translate this page Tullio Lie, Marius Sophus, Lightill, Micheal James Lindemann, Carl Louis FerdinandLiouville, Joseph lipschitz, rudolf Otto Sigismund Lobachevsky, Nikolai http://www.cartage.org.lb/en/themes/Biographies/Categories/Scientists/Mathematic

Lamb, Horace Lavrentiev, Mikhail Legendre, Adrien-Marie Levi-Civita, Tullio Lamb, Horace Lavrentiev, Mikhail Legendre, Adrien-Marie Levi-Civita, Tullio ... Lorenz, Ludwig Valentine

13. De R Banac Hsc He Fixpunk Tsat Z Banach, Stefan (30.03.1892 31.08.1945). 2. lipschitz, rudolf (14.05.1832 - 07.10.1903) http://www.studienkolleg-bochum.de/kubach/pdf/banach.pdf

14. Lipschitz Portraits Portraits of rudolf lipschitz rudolf lipschitz. JOC/EFR August 2001 http://www-history.mcs.st-and.ac.uk/history/PictDisplay/Lipschitz.html

Rudolf Lipschitz JOC/EFR August 2001 The URL of this page is: http://www-history.mcs.st-andrews.ac.uk/history/PictDisplay/Lipschitz.html

15. Links From The Web-site Of R. F. Streater Sophus Lie; J. Martin Lindsay; rudolf Otto Sigismund lipschitz; Hendrik AntoonLorentz; Lost causes in theoretical physics NEW ITEM ADDED, 7 Jan 2003. http://www.mth.kcl.ac.uk/~streater/links.html

Links from the web-site of R. F. Streater Luigi Accardi Stephen L. Adler Sergio Albeverio Shun-ichi Amari ... Lost causes in theoretical physics NEW ITEMS: The Feynman integral, Euclidean gravity, 25 Feb 2003. George W. Mackey W. Adam Majewski Stanley Mandelstam Andrei Andreyevich Markov ... Paul Zweifel Go to MY HOME PAGE

16. Browse The Cornell Library Historical Math Monographs Translate this page Lehrbuch der Algebra (Volume 3) by Weber, Heinrich. Lehrbuch der analysis (Volume1) by lipschitz, rudolf. Lehrbuch der analysis (Volume 2) by lipschitz, rudolf. http://historical.library.cornell.edu/math/title_L.html

About the Collection Browse Collection Home Search Collection ... Help A B C D E ... K L M N O P ... WXYZ Titles "L" Leçons d'algèbre et d'analyse, à l'usage des élèves des classes de mathématiques spéciales (Volume 1) by Tannery, Jules Leçons d'algèbre et d'analyse, à l'usage des élèves des classes de mathématiques spéciales (Volume 2) by Tannery, Jules Leçons de calcul différentiel et de calcul intégral, rédigées d'après les méthodes et les ouvrages publiés ou inédits de A. L. Cauchy by Moigno, abbé (Francois Napoléon Marie) Leçons de cinématique, professées à la Sorbonne; avec des notes par G. Darboux, et par É. Cosserat [et] F. Cosserat: cinématique théorique by Koenigs, Gabriel Xavier Paul Leçons de mécanique céleste professées à la Sorbonne (Volume 1) by Poincaré, Henri Leçons de mécanique céleste professées à la Sorbonne (Volume 2) by Poincaré, Henri Leçons de mécanique céleste professées à la Sorbonne (Volume 3) by Poincaré, Henri Leçons élémentaires sur le calcul des probabilités by Montessus de Ballore, R. de Leçons élémentaires sur la théorie des fonctions analytiques by Fouët, Edouard-A. (Édouard André) Leçons sur la résolution algébrique des équations by Vogt, Henri Gustav

17. Browse The Cornell Library Historical Math Monographs Translate this page Lindelöf, Ernst Leonard Le calcul des résidus et ses applications à lathéorie des fonctions. lipschitz, rudolf Lehrbuch der analysis (Volume 1). http://historical.library.cornell.edu/math/math_L.html

About the Collection Browse Collection Home Search Collection ... K L M N O PQ ... XYZ Authors "L" La Grange, Joseph Louis Lectures on Elementary Mathematics Lachlan, Robert An elementary treatise on modern pure geomoetry Lacroix, S. F. Traité élémentaire de calcul différentiel et de calcul intégral (Volume 1) Traité élémentaire de calcul différentiel et de calcul intégral (Volume 2) Laguerre, Edmond Nicolas Recherches sur la géométrie de direction; méthodes de transformation; anticaustiques Lame, G. Leçons sur les coordonnées curvilignes et leurs diverses applications Landfriedt, E Theorie der algebraischen funktionen und ihrer integrale Thetafunktionen und hyperelliptische funktionen Laurent, H L'élimination La géométrie analytique générale Sur les principes fondamentaux de la théorie des nombres et de la géométrie Traité d'analyse (Volume 1) ... Traité d'analyse (Volume 7) Leau, Leopold Étude sur les équations fonctionelles à une ou à plusieurs variables Lebon, Ernest Émile Picard; biographie, bibliographie analytique des écrits Legendre, A. M. Elements of geometry and trigonometry from the works of A.M. Legendre / adapted to the course of mathematical instruction in the United States by Charles Davies

18. Lipschitz-stetige Funktionen Translate this page für , . heißt eine lipschitz-Konstante von . lipschitz, rudolf Otto Sigismund,1832-1903. Beispiele 2.4.2 (lipschitz-stetige Funktionen). http://www.math.uni-sb.de/~ag-wittstock/lehre/WS00/analysis1/Vorlesung/node48.ht

Konvexe Funktionen Konvexe Funktionen Vorherige Seite: Konvexe Funktionen Inhalt Lipschitz-stetige Funktionen -Relation sehr gut im Griff hat: Definition 2.4.1 (Lipschitz-stetige Funktionen) Es sei ein Intervall. Eine Funktion Lipschitz-stetig , wenn es eine Konstante Lipschitz-Konstante von L IPSCHITZ , Rudolf Otto Sigismund, 1832-1903. Beispiele 2.4.2 (Lipschitz-stetige Funktionen) ist Lipschitz-stetig auf jedem Intervall mit ist Lipschitz-stetig auf jedem Intervall mit Die Funktion Bemerkung 2.4.3 Wenn Lipschitz-stetig ist, so bildet Cauchy-Folgen in Cauchy-Folgen ab. Beweis . Klar Bemerkung. Den Begriff Lipschitz-stetig Satz 2.4.4 (Fortsetzung Lipschitz-stetiger Funktn.) Es sei ein Intervall. Eine Lipschitz-stetige Funktion hat genau eine stetige Fortsetzung Diese ist ebenfalls Lipschitz-stetig mit der gleichen Lipschitz-Konstante. Bezeichnung. bezeichnet das entsprechende abgeschlossene Intervall. Beweis . Nach Bemerkung gibt es zu eine Folge in , die gegen konvergiert. Dann ist eine Cauchy-Folge und es existiert in Offensichtlich ist Wir definieren die Fortsetzung durch Zu in mit und . Dann folgt: Satz 2.4.5

19. Hollis: Differential Equations Wilhelm L'Hôpital, Guillaume de Lagrange, JosephLouis Laplace, Pierre-Simon Legendre,Adrien-Marie Liouville, Joseph lipschitz, rudolf Lissajous, Jules Lorenz http://www.math.armstrong.edu/faculty/hollis/dewbvp/

Differential Equations with Boundary Value Problems by Selwyn Hollis Contents and Preface Marketing Blurb Book Site @ Prentice Hall ... Solutions Manual Technology Mathematica Maple Java M ... ATLAB Sundry Items Problem graphics and extra graphical problems for Section 3.1. Please send bug reports here Professors: Please send me an email Some Biographical References The following are links to information on most of the mathematicians/scientists whose names appear in the book. Unless otherwise noted, each of these is a link to the MacTutor History of Mathematics Archive at the University of St Andrews, Scotland. Abel, Niels Henrik Airy, George Banach, Stefan Bendixson, Ivar ... Edelstein-Keshet, Leah (U. BC) Euler, Leonhard Fourier, Joseph Frobenius, Georg Gauss, Carl Friedrich ... Hertz, Heinrich Rudolf (Google search) Hodgkin, Alan Nature Hooke, Robert Huxley, Andrew (sfn.org) Jacobi, Carl Jordan, Camille Kirchhoff, Gustav Kutta, Martin Wilhelm ... Lorenz, Edward N. (xrefer.com) Lotka, Alfred (Google search) Lyapunov, Aleksandr Maclaurin, Colin Malthus, Thomas (Google search) Menten, Maud

20. Lipschitz Continuous - Wikipedia The name comes from the German mathematician rudolf lipschitz. Every lipschitzcontinuous map is uniformly continuous and hence continuous. http://www.wikipedia.org/wiki/Lipschitz_maps

Main Page Recent changes Edit this page Older versions Special pages Set my user preferences My watchlist Recently updated pages Upload image files Image list Registered users Site statistics Random article Orphaned articles Orphaned images Popular articles Most wanted articles Short articles Long articles Newly created articles Interlanguage links All pages by title Blocked IP addresses Maintenance page External book sources Printable version Talk Log in Help Lipschitz continuous (Redirected from Lipschitz maps In mathematics , a function f M N between metric spaces M and N is called Lipschitz continuous (or is said to satisfy a Lipschitz condition ) if there exists a constant K f x f y K d( x y ) for all x and y in M . In this case, K is called the Lipschitz constant of the map. The name comes from the German mathematician Rudolf Lipschitz Every Lipschitz continuous map is uniformly continuous and hence continuous Lipschitz continuous maps with Lipschitz contant K contractions ; they are the subject of the Banach fixed point theorem Lipschitz continuity is an important condition in the existence and uniqueness theorem for ordinary differential equations If U is a subset of the metric space M and f U R is a real-valued Lipschitz continuous map, then there always exist Lipschitz continuous maps

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 1     1-20 of 88    1  | 2  | 3  | 4  | 5  | Next 20