140 résultats
1959LFA-126750247Un ouvrage de 228 pages, format 155 x 240 mm, illustré, broché, publié en 1959, Dunod, collection "Bibliothèque de l'Enseignement Technique", bon état
In-4°, (XVIII), pp. 667, legatura in mezza pelle, titolo al dorso Pubblicato nel 1870 è un capolavoro dell’architettura matematica. La bellezza dell’edificio eretto da Jordan è ammirevole (Van de Waerden, Storia dell’algebra, p.117).Nel 1870 Jordan raccolse tutti i suoi risultati sui gruppi di permutazione dei precedenti dieci anni in un grande volume, Traité des substitutions, che per trenta anni rimase la Bibbia di tutti gli specialisti della teoria dei gruppi. La sua fama si espanse oltre la Francia e gli studenti stranieri erano desiderosi di frequentare le sue lezioni. In particolare Felix Klein e Sophus Lie vennero a Parigi nel 1870 per studiare con Jordan, che a quel tempo stava sviluppando le sue ricerche in una direzione completamente diversa: la determinazione di tutti i gruppi di movimento nello spazio tridimensionale. (DSB VII 167/169) Published in 1870, it is a “masterpiece of mathematical architecture. The beauty organized by Jordan is admirable” (Van de Waerden, History of algebra, p.117). In 1870 Jordan collected all his results on the permutation groups of the previous ten years in a large volume, Traité des replacements, which for thirty years, was the Bible for all specialists in group theory. His fame expanded beyond France and foreign students were eager to attend his lessons. In particular Felix Klein and Sophus Lie came to Paris in 1870 to study with Jordan, which at that time was developing his research in a completely different direction: the determination of all movement groups in three-dimensional space. (DSB VII 167/169)
19968455Oxford, Clarendon Press (International Series of Monographs on Physics, 87), 1996. X, 377 S. (23,5 cm) Broschur / Fadenheftung
200560317Berlin, Springer (Universitext / UTX), 2005. XV, 371 S. (23,5 cm) Broschierte Ausgabe
198961059Boston, Academic Press (Pure & Applied Mathematics Vol. 136), 1989. XI, 402 S. (23,5 cm) Leinen / gebundene Ausgabe
200662021Berlin ; New York: Springer (Universitext), 2006. XIII, 278 S. (23,5 cm) Broschierte Ausgabe
176946556Berlin Haude et Spener 1769. 4to. Without wrappers as issued in "Mémoires de l'Academie Royale des Sciences et Belles-Lettres" Année 1767 Tome XXXIII pp. 311-352. <br/><br/><em>First edition of a monumental paper in the theory of equations by "one of the greatest mathematicians of all times" Cajori. In this memoir which deals with the solutiuon of numerical equations Lagrange examines the roots of algebraic equations and provides methods of separating the real and imaginary roots and of approximating the real roots with continued fractions.Parkinson "Breakthroughs" 1767 P. </em> unknown
199573219New York / Berlin, Springer (Graduate Texts in Mathematics / GTM 160), 1995. XIII, 364 S. (24 cm) Pappband / gebundene Ausgabe
19831146551983 Editions Hermann, Editeurs des sciences et des arts - 1983 - In-8, broché, couverture illustrée - 158 p.
1889PHO-9051889, à Paris chez Georges Carré , in-8 (250x170) , VII-1-251pp , nombreuse illustrations et tableaux in-texte , relié demi cuir époque cachet , bon exemplaire
Cover a little faded and worn, page block browned, but all contents in good condition. Research Notes in Mathematics; 35. Used
19731125811973 Editions de Moscou, Mir - 1973 - In-12, cartonné - 245 p. - Graphiques et schémas et N&B in-texte
1873PHO-805Paris, Gauthier-Villars ,1873. In-4 (267 x 210 mm) de VIII, 294 pp.; demi-chagrin, dos lisse avec titre et auteur (reliure de l'époque), charnière frottée , coiffes arasées .
1951014377S.l. S.n. 1951 In-4 En feuilles
1864PHO-964Torino, S. Franco, 1864. In-12; pp. 142, relié demi cuir , dos lisse avec auteur et titre , charnières faibles , accident à la coiffe, cachet , inscription dorée sur le plat
1923PHO-826Paris, Armand Colin. 1923. In-12 , relié demi cuir époque , dos lisse avec titre et auteur, 204 pages. 21 figues en noir et blanc, dans le texte, catalogue en fin d’ouvrage,bon état.P2-5C
1903PHO-806Washington ,Government Printing Office, 1903. Grand in-4° , 270pp , illustré de nombreuses illustrations et photos , relié pleine percale éditeur , titre en or sur le plat dos lisse avec «bulletin L». receuil d’informations sur le climat en Californie au début du 20éme siècle ,très bon état .
177644968Paris Imprimerie Royale 1776. 4to. Extracts from "Mémoires de Mathematique et de Physique Présentés à l'Academie des Sciences par divers Savans" Année 1773. Pp. 305-327. Clean and fine. <br/><br/><em>First printing of Monge's second paper on the theory of partial differential equations.In this memoir Monge continued his investigations in "a field of study that was to hold his interest for many years: the theory of partial differential equations. In particular he undertook the parallel examination of certain equations of this type and of the families of corresponding surfaces. The geometric construction of a particular solution of the equations under consideration allowed him to determine the general nature of the arbitrary function involved in the solutions of a partial differential equation. Moreover this finding enabled him to take a position on a question then being disputed by d Alembert Euler and Daniel Bernoulli."DSB. </em> unknown
1885PHO-9021885, Paris, Gauthier-Villars. Fort in-8 - (15x 21cm.) ,568pp , figures dans le texte ,relié en demi-basane, dos lisse avec auteur , titre et date , dos frotté , cachet dépôt de la marine, bel exemplaire.
19811258841981 Dover Publications, Inc - 1981 - In-8 broché, couverture illustrée - 200 pages
182149138Paris Crochard 1821. No wrappers. In 'Annales de Chimie et de Physique' Volume 19 Cahier 3. Pp. 225-236 Entire issue offered with halftitle to vol. 19. Navier's paper: pp. 244-260. A few scattered brownspots. Some browning to halftitlepage. <br/><br/><em>First appearance of Navier's famous paper in which he describes the relations between fluid flow and friction giving the FUNDAMENTAL EQUATIONS OF THE MATHEMATICAL THEORY OF ELASTICITY. The full paper was not published until 1828. Stokes's analysis of the internal friction of fluids was published in 1845 and as he was not familiar with the French litterature of mathematical physics he derived independently his own equations which accounts for the double-name of the equations. "The Navier-Stokes equation is now regarded as the universal basis of fluid mechanics no matter how complex and unpredictable the behavior of its solutions may be. It is also known to be the only hydrodynamic equation that is compatible with the isotropy and linearity of the stress-strain relation." Olivier Darrigol."Navier studied the motion of solid and liquid bodies deriving the partial differential equations to which he applied Fourier's methods to find particular solutions. This theoretical research led him to formulate the well-known equation identified with his name and that of Stokes. Navier viewed bodies as made up of particles which are close to each other and which act on each other by means of two opposing forces - one of attraction and one of repulsion - which when in a state of equilibrium cancel each otherout. The repelling force resulted from the caloric that a body possessed. When equilibrium is disturbed in a solid a restoring force acts which is proportional to the change in distance between the particles."DSB X p. 4."The equations are useful because they describe the physics of many things of academic and economic interest. They may be used to model the weather ocean currents water flow in a pipe and air flow around a wing. The Navier-Stokes equations in their full and simplified forms help with the design of aircraft and cars the study of blood flow the design of power stations the analysis of pollution and many other things. Coupled with Maxwell's equations they can be used to model and study magnetohydrodynamics. "Wikipedia. </em> unknown
182147074Paris Crochard 1821. Contemp. hcalf. Spine gilt with tome-and titlelabels with gilt lettering. Wear to top of spine. A crack along first hinge but cover not loose. In 'Annales de Chimie et de Physique' Volume 19. Entire volume offered. 448 pp. a. 2 plates. Navier's paper: pp. 244-260. A faint dampstain to margins of the first 20 leaves and a bit seen on the following pages decreasing. <br/><br/><em>First appearance of Navier's famous paper in which he describes the relations between fluid flow and friction giving the FUNDAMENTAL EQUATIONS OF THE MATHEMATICAL THEORY OF ELASTICITY. The full paper was not published until 1828. Stokes's analysis of the internal friction of fluids was published in 1845 and as he was not familiar with the French litterature of mathematical physics he derived independently his own equations which accounts for the double-name of the equations. "The Navier-Stokes equation is now regarded as the universal basis of fluid mechanics no matter how complex and unpredictable the behavior of its solutions may be. It is also known to be the only hydrodynamic equation that is compatible with the isotropy and linearity of the stress-strain relation." Olivier Darrigol."Navier studied the motion of solid and liquid bodies deriving the partial differential equations to which he applied Fourier's methods to find particular solutions. This theoretical research led him to formulate the well-known equation identified with his name and that of Stokes. Navier viewed bodies as made up of particles which are close to each other and which act on each other by means of two opposing forces - one of attraction and one of repulsion - which when in a state of equilibrium cancel each otherout. The repelling force resulted from the caloric that a body possessed. When equilibrium is disturbed in a solid a restoring force acts which is proportional to the change in distance between the particles."DSB X p. 4."The equations are useful because they describe the physics of many things of academic and economic interest. They may be used to model the weather ocean currents water flow in a pipe and air flow around a wing. The Navier-Stokes equations in their full and simplified forms help with the design of aircraft and cars the study of blood flow the design of power stations the analysis of pollution and many other things. Coupled with Maxwell's equations they can be used to model and study magnetohydrodynamics. "Wikipedia. </em> unknown
182143864Paris Crochard 1821. Without wrappers. In 'Annales de Chimie et de Physique' Volume 19 Cahier 3. Titlepage to vol. 19. Pp. 225-335. Navier's paper: pp. 244-260. Verso of titlepage with small stamps. Clean and fine. <br/><br/><em>First appearance of Navier's famous paper in which he describes the relations between fluid flow and friction giving the FUNDAMENTAL EQUATIONS OF THE MATHEMATICAL THEORY OF ELASTICITY. The full paper was not published until 1828. Stokes's analysis of the internal friction of fluids was published in 1845 and as he was not familiar with the French litterature of mathematical physics he derived independently his own equations which accounts for the double-name ofthe equations. "The Navier-Stokes equation is now regarded as the universal basis of fluid mechanics no matter how complex and unpredictable the behavior of its solutions may be. It is also known to be the only hydrodynamic equation that is compatible with the isotropy and linearity of the stress-strain relation." Olivier Darrigol."Navier studied the motion of solid and liquid bodies deriving the partial differential equations to which he applied Fourier's methods to find particular solutions. This theoretical research led him to formulate the well-known equation identified with his name and that of Stokes. Navier viewed bodies as made up of particles which are close to each other and which act on each other by means of two opposing forces - one of attraction and one of repulsion - which when in a state of equilibrium cancel each otherout. The repelling force resulted from the caloric that a body possessed. When equilibrium is disturbed in a solid a restoring force acts which is proportional to the change in distance between the particles."DSB X p. 4."The equations are useful because they describe the physics of many things of academic and economic interest. They may be used to model the weather ocean currents water flow in a pipe and air flow around a wing. The Navier-Stokes equations in their full and simplified forms help with the design of aircraft and cars the study of blood flow the design of power stations the analysis of pollution and many other things. Coupled with Maxwell's equations they can be used to model and study magnetohydrodynamics. "Wikipedia. </em> unknown
1921AUB-5820Ed. Gauthier-Villars et Cie 1921 (2e éd. avec de nombreux compléments). Bel exemplaire relié, gd in-8, XXIV + 484 pages.
19659444-nnew. unknown