41. Spirale De Poinsot Translate this page SPIRALE DE poinsot poinsot's spiral, poinsotsche Spirale. louis poinsot(1777 - 1859) mathématicien français. Équation polaire avec , . http://perso.club-internet.fr/rferreol/encyclopedie/courbes2d/poinsot/poinsot.sh

42. The Kepler-Poinsot Polyhedra Two centuries later, in 1809, louis poinsot discovered two more nonconvexregular solids the great dodecahedron and the great icosahedron. http://home.teleport.com/~tpgettys/kepler.shtml

The Kepler-Poinsot Polyhedra A polyhedron is regular if the faces are a single kind of regular polygon and the vertices are all the same. The 5 Platonic Solids are the convex regular polyhedrons. If we remove the constraint of convexity it turns out that there are only four more solids that can be added to the list; these are known as the Kepler-Poinsot Polyhedra It was Johann Kepler who, in 1619, first realized that 12 pentagrams can be joined in pairs along their edges in two different ways that result in regular solids. If five pentagrams meet at each vertex, the resulting solid has come to be known as the small stellated dodecahedron Small Stellated Dodecahedron If three pentagrams meet at each vertex, the resulting solid is now named the great stellated dodecahedron (The perhaps surprising reason for these names will be made evident shortly). Great Stellated Dodecahedron Two centuries later, in 1809, Louis Poinsot discovered two more non-convex regular solids: the great dodecahedron and the great icosahedron . The twelve faces of the great dodecahedron are pentagons (as with the ordinary dodecahedron), but which intersect each other. Likewise, the faces of the great icosahedron are the 20 triangles of the ordinary icosahedron, but intersecting each other.

43. Diplomarbeit Translate this page Körpern, das Tetraeder, Hexaeder, Oktaeder, Dodekaeder und Ikosaeder, haben Kepler(Johannes Kepler, 1571-1630) und poinsot (louis poinsot, 1777-1859) vier http://www.stud.fernuni-hagen.de/q5171962/diplom.html

Einleitung meiner Diplomarbeit fünften Grades" in Mathematik In seinem Buch über das Ikosaeder und die Gleichung fünften Grades hat Felix Klein die Theorie der Gleichung fünften Grades mit der Geometrie des Ikosaeders verknüpft. Die Möglichkeit dieser Verbindung geht auf die Tatsache zurück, dass sich die Ikosaedergruppe, dass heißt die Gruppe aller Rotationen, die ein Ikosaeder in sich überführen, mit der Gruppe A der geraden Vertauschungen von fünf Objekten identifiziert. Geometrisch erkennt man das über die Operation der Ikosaedergruppe auf den fünf Oktaedern, die man dem Ikosaeder ein- oder umbeschreiben kann. Anstelle des Ikosaeders hätte Klein seinen Betrachtungen genauso gut das duale Dodekaeder zugrunde legen können. Neben die fünf regulären Platonischen Körpern, das Tetraeder, Hexaeder, Oktaeder, Dodekaeder und Ikosaeder, haben Kepler (Johannes Kepler, 1571-1630) und Poinsot (Louis Poinsot, 1777-1859) vier weitere regelmäßige Körper, die heute so genannten Kepler-Poinsotschen Sternkörper gesetzt. Diese vier Sternkörper sind nicht mehr konvex, sie besitzen jedoch alle die gleiche Symmetrie wie das Ikosaeder und das Dodekaeder, so dass sie mit diesen von Coxeter zu den sechs so genannten pentagonalen Polyedern zusammengefasst worden sind. Alle anderen Polyeder mit Ikosaedersymmetrie genügen nur noch abgeschwächten Regularitätsbedingungen. Dazu zählen auch Vertreter der Klasse der uniformen Polyeder, die deckungsgleiche Eckfiguren haben und durch reguläre Vielecke begrenzt werden.

44. Kepler-Poinsot Polyhedra In the great icosahedron and great dodecahedron (described by louis poinsot in 1809,although Jamnitzer made a picture of the great dodecahedron in 1568) the http://www.georgehart.com/virtual-polyhedra/kepler-poinsot-info.html

The Kepler-Poinsot Polyhedra If we do not require polyhedra to be convex , we can find four more regular solids. As in the Platonic solids , these solids have identical regular polygons for all their faces, and the same number of faces meet at each vertex. What is new is that we allow for a notion of "going around twice" which results in faces which intersect each other. In the great stellated dodecahedron and the small stellated dodecahedron , the faces are pentagrams . It is easier to see which parts of the exterior belong to which pentagram if you look at a six-colored model of the great stellated dodecahedron and a six-colored model of the small stellated dodecahedron . The center of each pentagram is hidden inside the polyhedron. These two polyhedra were described by Johannes Kepler in 1619, and he deserves credit for first understanding them mathematically, but a 16th century drawing by Jamnitzer is very similar to the former and a 15th century mosaic attributed to Uccello illustrates the latter. These two polyhedra have three and five pentagrams, respectively, meeting at each vertex. Because the faces intersect each other, parts of each face are hidden by other faces, and you need to

45. Liste Provisoire DicoMeca (N-Z) Translate this page PLATEAU, Joseph, 1801 - 1883, PP, 329. POINCARE, Henri, 1854 - 1912, BE, 330.poinsot, louis, 1777 - 1859, PP, 331. POISEUILLE, Jean-Léonard Marie, 1799 - 1869,PP, 332. http://www.afm.asso.fr/aum/PROJETS/DicoMeca/ListDM_NZ.html

(document de travail) Page 3 : N-Z NOM Dates Responsable a-e f-m N o p q r ... z NADAI A. [PP] NAVIER Claude-Louis-Marie [PP] NEUMANN Franz Ernst [PP] NEUMANN (von) John [AM] NEWCOMEN Thomas [PAB] NEWTON Isaac [BE] NOLLET CdE NOVOSILOV CdE NOWACKI W. CdE NUSSELT Wilhelm [PP] a-e f-m n O p q r s ... z OBERBECK [PAB] OCWIRK Fred William [JF] OLBERS Wilhelm Heinrich [BE] ONSAGER Lars [PAB] OSEEN C. W. [PAB] OSTROGRADSKY Mikhail V. [AM] OSTWALD Wilhelm CdE OSWATITSCH Klaus [AM] a-e f-m n ... o P q r s t ... z PADE Henri CdE PAINLEVE Paul [AM] PAPIN Denis [PP] PARENT Antoine [JF] PARKS [PP] PARSEVAL Marc-Antoine CdE PASCAL Blaise [PAB] PECLET Jean-Claude- [PP] PELTON Lester Allen [PAB] PERES Joseph [PAB] PERRONET Jean-Rodolphe [PP] PETROV Nicolae Pavlovitch [JF] PHILON de BYZANCE ca. 260 AC - ca. 190 AC [PAB] PIAZZI Guiseppe [BE] PIOLA Gabrio [PP] PITOT Henri [PAB] PLANCK Max CdE PLATEAU Joseph [PP] POINCARE Henri [BE] POINSOT Louis [PP] POISEUILLE Marie [PP] POISSON [PP] [PO] POLHAUSEN [JC] PONCELET Jean-Victor [PP] PONTRYAGIN Lev [AM] PRAGER William [PP] PRANDTL Ludwig [PP] PRONY (Riche de) CdE PTOLEMEE Claude ca. 87 - ca. 165 [BE] a-e f-m n ... p q R s t u v ... z RAMELLI [JF] RANKINE William [PAB] RAVIGNEAU [JF] RAYLEIGH STRUTT (Lord) John William [JF] RAZAZ L. Cezeri

46. Suche Nach Personen Translate this page Pohlhausen, Siemens-Schuckert Pöhlmann, Industrie? Poincaré, Henri (1854-1912)Poincaré, Raymond (1860-1934) poinsot, louis (1777-1859) Poisson, Siméon http://www.lrz-muenchen.de/~Sommerfeld/PersDat/P.html

Suche nach Personen A B C D ... Z P Pahlen, Emanuel von der (1882-1952) Paladini, Ettore Palmaer, Wilhelm Paneth, Friedrich Adolf (1887-1958) ... Institutionen Ausgelesen am 29. Dezember 2002.

47. © 1998-2001 Sommerfeld-Projekt. Ausgelesen Am 24. Januar 2001 poinsot, louis (1777-1859) WissenschaftAnalogie; Eisen; Erde, Form; Experimente; Kreisel; Magnetismus; Pendel http://www.lrz-muenchen.de/~Sommerfeld/BriefDat/00521.html

Henri du Bois an Arnold Sommerfeld, 12. Dezember 1902 Archiv: (Archiv HS 1977-28/A,29) Brief (8 Seiten) aus Utrecht; Sprache: deutsch, Schrift: lateinisch. Stichworte Personen: Klein, Felix (1849-1925); Poinsot, Louis (1777-1859) Wissenschaft: Reihen: Vorlesung Institution: Westinghouse Start Biographie Projekt Online-Suche

48. The Four Regular Non-convex Polyhedra The other two were described by louis poinsot in 1809 but at leastone of them appears on a drawing by the same Jamnitzer. In 1810 http://cage.rug.ac.be/~hs/polyhedra/keplerpoinsot.html

The four regular non-convex polyhedra Small Stellated Dodecahedron Great Stellated Dodecahedron Great Dodecahedron Great Icosahedron click on an image to enlarge... It is known that the five Platonic polyhedra are the only regular convex polyhedra. A polyhedron, considered as a solid is convex if and only if the line segment between any two points of the polyhedron belongs entirely to the solid. However, if we admit a polyhedron to be non-convex, there exist four more types of regular polyhedra! The four regular non-convex polyhedra are known as the Kepler-Poinsot Polyhedra . Two of them were described by Johannes Kepler in 1619 as being regular, although the objects themselves certainly were known earlier. One of them appears on a 16th century drawing by Jamnitzer and the other on a 15th century mosaic on the floor of the San Marco in Venice. The other two were described by Louis Poinsot in 1809 but at least one of them appears on a drawing by the same Jamnitzer. In 1810 the French mathematician Augustin-Louis Cauchy proved that the five Platonic and the four Kepler-Poinsot polyhedra are the only possible regular polyhedra. All four Kepler-Poinsot polyhedra can be constructed starting from a regular dodecahedron or icosahedron. It' my purpose to demonstrate a possible construction for each of them.

49. Spirale De Poinsot Translate this page SPIRALE DE poinsot poinsot's spiral, poinsotsche Spirale. louis poinsot(1777 - 1859) mathématicien français. Équation polaire avec . http://www.mathcurve.com/courbes2d/poinsot/poinsot.shtml

courbe suivante courbes 2D courbes 3D surfaces ... fractals SPIRALE DE POINSOT Poinsot's spiral, Poinsotsche Spirale avec Lorsque on obtient une spirale logarithmique O qui vaut ici ,avec courbe suivante courbes 2D courbes 3D surfaces ... Jacques MANDONNET

50. ACPA Home Page Norman J. Wells, John poinsot on Created Eternal Truths vs. Vasquez, Suárez, andDescartes. louis Dupré, Phenomenology of Religion Limits and Possibilities. http://www.acpa-main.org/specials.html

A merican C atholic P hilosophical Q uarterly Special Issues Thomas Reid , John Haldane, Guest Editor VOL LXXIV, Summer 2000 John Haldane Thomas Reid: Life and Work Ralph McInerny Thomas Reid and Common Sense Bradley Warner Reid, God and Epistemology Philip de Bary Thomas Reid's Metaprinciple Alexander Broadie The Scotist Thomas Reid Roger D. Gallie Reid, Kant and the Doctrine of the Two Standpoints John Haldane Thomas Reid and the History of Ideas Ronald E. Beanblossom James and Reid: Meliorism vs. Metaphysics Nicholas Wolterstorff Reid on Common Sense, with Wittgenstein's Assistance C. A. J. Coady Contract, Justice and Self Interest St. Augustine , Roland J. Teske, S.J., Guest Editor VOL LXXIV, Winter 2000 Roland J. Teske, S.J. Introduction Mary T. Clark, R.S.C.J. Augustine on Immutability and Mutability Roland J. Teske, S.J. The Heaven of Heaven and the Unity of St. Augustine's Confessions David Vincent Meconi, S.J. Gender and Imagio Dei in Augustine's De Trinitate XII Donald X. Burt, O.S.A. Friendly Persuasion: Augustine on Religious Toleration Douglas Kries Augustine's Response to the the Political Critics of Christianity in the De Civitate Dei John Rist What Will I Be Like Tomorrow? Augustine vs. Hume

51. OPE-MAT - Historique Translate this page Pacioli, Luca Poincaré, Henri Reichenbach, Hans Padé, Henri poinsot, louis Reidemeister,Kurt Padoa, Alessandro Poisson, Siméon Rényi, Alfréd Painlevé http://www.gci.ulaval.ca/PIIP/math-app/Historique/mat.htm

A Abel , Niels Akhiezer , Naum Anthemius of Tralles Abraham bar Hiyya al'Battani , Abu Allah Antiphon the Sophist Abraham, Max al'Biruni , Abu Arrayhan Apollonius of Perga Abu Kamil Shuja al'Haitam , Abu Ali Appell , Paul Abu'l-Wafa al'Buzjani al'Kashi , Ghiyath Arago , Francois Ackermann , Wilhelm al'Khwarizmi , Abu Arbogast , Louis Adams , John Couch Albert of Saxony Arbuthnot , John Adelard of Bath Albert , Abraham Archimedes of Syracuse Adler , August Alberti , Leone Battista Archytas of Tarentum Adrain , Robert Albertus Magnus, Saint Argand , Jean Aepinus , Franz Alcuin of York Aristaeus the Elder Agnesi , Maria Alekandrov , Pavel Aristarchus of Samos Ahmed ibn Yusuf Alexander , James Aristotle Ahmes Arnauld , Antoine Aida Yasuaki Amsler , Jacob Aronhold , Siegfried Aiken , Howard Anaxagoras of Clazomenae Artin , Emil Airy , George Anderson , Oskar Aryabhata the Elder Aitken , Alexander Angeli , Stefano degli Atwood , George Ajima , Chokuyen Anstice , Robert Richard Avicenna , Abu Ali B Babbage , Charles Betti , Enrico Bossut , Charles Bachet Beurling , Arne Bouguer , Pierre Bachmann , Paul Boulliau , Ismael Bacon , Roger Bhaskara Bouquet , Jean Backus , John Bianchi , Luigi Bour , Edmond Baer , Reinhold Bieberbach , Ludwig Bourgainville , Louis Baire Billy , Jacques de Boutroux , Pierre Baker , Henry Binet , Jacques Bowditch , Nathaniel Ball , W W Rouse Biot , Jean-Baptiste Bowen , Rufus Balmer , Johann Birkhoff , George Boyle , Robert Banach , Stefan Bjerknes, Carl

52. La Folie Des Grandeurs Translate this page fire Deux siècles après Kepler , louis poinsot découvre de nouveaux solidesréguliers ! Le Grand dodécaèdre, et le grand icosaèdre http://perso.wanadoo.fr/trioker/feux/feu21.html

D Kepler Poinsot et l' de Platon. nolido-juxtaposition ... Pour petits malins ! Solution

53. Fiche#7 Translate this page - BOUDARD, Jean BOUDARD, louis - poinsot, Claudine . http://perso.wanadoo.fr/philippe.baschiera/fichesindex/Fiches/D1/P7.htm

BOUDARD, Antoine Sexe : Masculin Baptême : 27.12.1692, Poiseul, Haute-Marne (52), France Père : BOUDARD, Jean Mère : POINSOT, Claudine BOUDARD, Jean POINSOT, Claudine BOUDARD, Catherine (Sosa 699) Sexe : Féminin Baptême : 10.8.1697, Poiseul, Haute-Marne (52), France Naissance : 10.8.1697, Poiseul, Haute-Marne (52), France Décès : 11.12.1755, Poiseul, Haute-Marne (52), France Père : BOUDARD, Jean Mère : POINSOT, Claudine Famille 1 : JACQUIN, Pierre Mariage : mar 17 avril 1725 - Poiseul JACQUIN, Pierre JACQUIN, Françoise JACQUIN, Jean JACQUIN, Jean ... POINSOT, Claudine BOUDARD, Claude Sexe : Masculin Naissance : 19.10.1693, Poiseul, Haute-Marne (52), France Baptême : 22.10.1693, Poiseul, Haute-Marne (52), France Père : BOUDARD, Jean Mère : POINSOT, Claudine BOUDARD, Jean POINSOT, Claudine BOUDARD, Claudine Sexe : Féminin Baptême : 25.9.1703, Poiseul, Haute-Marne (52), France Naissance : 25.9.1703, Poiseul, Haute-Marne (52), France Décès : 22.3.1707, Poiseul, Haute-Marne (52), France Père : BOUDARD, Jean

54. Verzeichnis | Mitglieder | Vorgängerakademien Translate this page POINCARÉ, Jules-Henri, * 29.04.1854, † 17.07.1912, poinsot, louis,* 03.01.1777, † 05.12.1859, POISSON, Denis, * 21.06.1781, † 25.04.1840, http://www.bbaw.de/archivbbaw/akademiemitglieder/vorgaengermitglieder_p.html

Archiv der Berlin- Brandenburgischen Akademie der Wissenschaften BBAW Akademie Archiv Leiter/Abteilungsleiter ... Abt. Sammlungen Mitgliederverzeichnisse Mitglieder der BBAW Homepage der BBAW Verzeichnis P Portraitansichten A B C D ... Z Name, Vorname Lebenszeit PAHL, Gerhard PALACKY, Frantisek PALGRAVE, Sir (1832) Francis * Juli 1788 PALLAS, Simon PANKRATOVA, Anna Michailowna PANOFKA, Theodor PAPAPETROU, Achilles ... POTT, Johann Heinrich gt. 06.10.1692 POTTIER, Edmond POULIK, Jozef siehe: PRADES, Jean Martin de * um 1720 PRAETORIUS, Franz PRANDTL, Ludwig PRANTL, Carl von (1872) PRELLER, Ludwig ... PUTLITZ, Gisbert Freiherr zu

55. Augustin Louis Cauchy Augustin louis Cauchy's father was active in his education. He did not succeed,being beat by the likes of Legendre, poinsot, Ampère, and Binet. http://www.stetson.edu/~efriedma/periodictable/html/Cu.html

Augustin Louis Cauchy Augustin Louis Cauchy's father was active in his education. Laplace and Lagrange were visitors at the Cauchy family home, and Lagrange in particular seems to have taken an interest in young Cauchy's mathematical education. Lagrange advised Cauchy's father that his son should obtain a good grounding in languages before starting a serious study of mathematics, so he spent two years studying classical languages. In 1810 Cauchy took up his first job in Cherbourg to work on port facilities for Napoleon's English invasion fleet. In addition to his heavy workload Cauchy undertook mathematical researches, and he proved in 1811 that the angles of a convex polyhedron are determined by its faces. He submitted his first paper on this topic then, encouraged by Legendre and Malus, he submitted a further paper on polygons and polyhedra in 1812. Cauchy felt that he had to return to Paris if he was to make an impression with mathematical research. In 1815, he was appointed assistant professor of analysis at the Ecole Polytechnique. In 1816 he won the Grand Prix of the French Academy of Science for a work on waves. He achieved real fame however when he submitted a paper to the Institute solving one of Fermat's claims on polygonal numbers made to Mersenne. Politics now helped Cauchy into the Academy of Sciences when Carnot and Monge fell from political favour and were dismissed and Cauchy filled one of the two places. By 1830, the political events in Paris and the years of hard work had taken their toll and Cauchy decided to take a break. He spent a short time in Switzerland. Political events in France meant that Cauchy was now required to swear an oath of allegiance to the new regime, and when he failed to return to Paris to do so he lost all his positions there. He taught in Turin in 1832, and in Prague the following year.

56. Augustin Louis Cauchy Translate this page Em 1802 Augustin-louis entrou na École Centrale du Panthéon, onde passou dois inscreverpara a seção de geometria do Institute, indo a vaga para poinsot. http://www.ime.unicamp.br/~calculo/history/cauchy/cauchy.html

Galeria da Fama Augustin Louis Cauchy 460-370 AC Eudoxo 408-355 AC Arquimedes 287-212 AC Al-Haitham 965-1040 DC Oresme 1323-1382 DC Fermat 1601-1665 DC Newton 1643-1727 DC Leibniz 1646-1716 DC Cauchy 1789-1857 DC Quando Augustin-Louis Cauchy , de Laplace e de Thèorie des Fonctions Journal of the École Polytechnique Fermat Cours d'analyse enquanto que em 1829 em Exercises d'analyse et de physique mathematique publicado entre 1840 e 1847 mostrou-se extremamente importante. Oeuvres complètes d'Augustin Cauchy (1882-1970), foi publicada em 27 volumes. The MacTutor History of Mathematics archive

57. G. D'Heylli : Le Véritable Auteur Du Théâtre Des Boulevards (1881) Translate this page HEYLLI, Edmond poinsot pseud. Sous louis XIII, un médecin célèbre, louis Guyon,qui fut aussi un écrivain distingué, avait fulminé contre le genre des http://www.bmlisieux.com/curiosa/gdheylli.htm

HEYLLI , Edmond Poinsot pseud. Georges d' (1833-....) : Le véritable auteur du théâtre des boulevards Saisie du texte : S. Pestel pour la collection électronique de la Bibliothèque Municipale de Lisieux (29.XI.2001) Texte relu par : A. Guézou http://www.bmlisieux.com/ Diffusion libre et gratuite (freeware) Texte établi sur un exemplaire (BmLx : ns 919) du volume 1 du Théâtre des boulevards réimprimé pour la première fois et précédé d'une notice par Georges d'Heylli LE VÉRITABLE AUTEUR DU THÉATRE DES BOULEVARDS par Georges d' Heylli Nous sommes ici en pleine farce, cette farce grasse et salée qui plaisait tant à nos pères, cette farce de la rue qui émerveillait le bas peuple, à qui on la servait gratis et qui constituait ce genre spécial qu'on a appelé les parades. C'est sur les tréteaux de la baraque même, à l'intérieur de laquelle devait être donné le spectacle plus sérieux, et pour y attirer le public, que se débitaient ces plaisanteries au gros sel, populacières, grossières, ordurières souvent, plus souvent encore graveleuses, et dont les deux présents volumes reproduisent les plus amusantes et les plus célèbres. L'origine de la farce remonte, d'ailleurs, à l'origine même du théâtre ; car de tout temps il a été nécessaire de signaler une exploitation théâtrale quelconque par cette réclame publique et bruyante, à laquelle on a donné de nos jours le nom vulgaire de « boniment ». Bien qu'elles fussent très vite entrées dans les moeurs publiques, adoptées par la foule, suivies par elle avec persistance et qu'elles se soient naturellement perfectionnées de siècle en siècle, les parades n'étaient pas sans affliger les esprits graves et moroses aux yeux desquels elles ne paraissaient être qu'une contrefaçon malsaine de la véritable comédie. Sous Louis XIII, un médecin célèbre, Louis Guyon, qui fut aussi un écrivain distingué, avait fulminé contre le genre des spectacles, auquel le nom de farce est absolument réservé, et qui date plus particulièrement des XVe et XVIe siècles, comptant dans ses annales, et en tête de la liste de ses plus célèbres pièces les deux éternelles farces de

58. Biography-center - Letter P BruceMedalists/Poincare/index.html; poinsot, louis wwwhistory.mcs.st-and.ac.uk/~history/Mathematicians/poinsot.html;Poirier, Anne Claire http://www.biography-center.com/p.html

Visit a random biography ! Any language Arabic Bulgarian Catalan Chinese (Simplified) Chinese (Traditional) Croatian Czech Danish Dutch English Estonian Finnish French German Greek Hebrew Hungarian Icelandic Indonesian Italian Japanese Korean Latvian Lithuanian Norwegian Polish Portuguese Romanian Russian Serbian Slovak Slovenian Spanish Swedish Turkish P 510 biographies www-history.mcs.st-and.ac.uk/~history/Mathematicians/Peres.html www-history.mcs.st-and.ac.uk/~history/Mathematicians/Peter.html www-history.mcs.st-and.ac.uk/~history/Mathematicians/Polya.html Paar, Jack www.pbs.org/wnet/americanmasters/database/paar_j.html Paavolainen, Olavi www.kirjasto.sci.fi/opaavola.htm Pacchia, Girolamo del www.getty.edu/art/collections/bio/a844-1.html Pacchioni, Antonio www.whonamedit.com/doctor.cfm/391.html Pace, Carlos www.grandprix.com/gpe/drv-paccar.html Pacher, Michael www.kfki.hu/~arthp/bio/p/pacher/biograph.html Pacioli, Luca www-history.mcs.st-and.ac.uk/~history/Mathematicians/Pacioli.html Packer, Kerry www.abc.net.au/btn/australians/packer.htm Paczynski, Bohdan www.phys-astro.sonoma.edu/BruceMedalists/Paczynski/index.html www-history.mcs.st-and.ac.uk/~history/Mathematicians/Pade.html

59. Site Map Christoph Lauterbach Society Pages Christina Singer - Society Pages Johann ChristophOley - Society Pages louis poinsot - Society Pages Johann Christoph Pez http://www.xoi.info/society/site_map/index10.shtml

X O I .info HOME Business City Directory Real Estate ... Contact Site Map Search Results Louis Kossuth - Society Pages Louis Krasner - Society Pages Louis Krebs Graham - Society Pages Deborah Adair - Society Pages ... Contact X O I .info

60. Patrice Bailhache, Travaux Et Publications Translate this page 2) Histoire de la mécanique. - La théorie générale de l'équilibre et dumouvement des systèmes de louis poinsot, éditions critique et commentaires http://bailhache.humana.univ-nantes.fr/bailpub.html

PRINCIPAUX TRAVAUX ET PUBLICATIONS rouge 1) Logique Repris sous le titre : Les normes dans le temps et sur l'action Logique et analyse , 79, Nauwelaerts, Louvain, 1977, pp. 286-316. , LXV/2, Franz Steiner, Wiesbaden, 1979, pp. 269-274. - "Several possible systems of deontic weak and strong norms", Notre Dame Journal of Formal Logic , 21, University of Notre Dame, Indiana, 1980, pp. 89-100. - "Analytical Deontic Logic : Authorities and Addressees", Logique et analyse , 93, Nauwelaerts, Louvain, 1981, pp. 65-80. Logique et analyse , 108, Nauwelaerts, Louvain, 1984, pp. 393-405. - "NF and DN, Two Logic Teaching Programs for Normal Forms and Natural Deduction", Computerised Logic Teaching Bulletin (University of St Andrews), vol 3, no 1, June 1990, p. 2-15. FN et DN formes normales et l'apprentissage de la Acta Universitatis Lodziensis, Folia philosophica 7, 1990, p. 5-18 (colloque "La formation des notions de base en logique classique et non classique", Lodz, Pologne, 18-20 octobre 1988). - "Authorities and Addressees in Deontic Logic : Indexed Operators and Action", Proceedings of the first International Workshop on Deontic Logic in Computer Science (Amsterdam, The Netherlands, December 11-13 1991), p. 72-88.

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