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Publicado por Editions Jacques Gabay, 1989
Librería: Librairie Philoscience, Malicorne sur Sarthe, Francia
1 portrait de Galois en frontispice et 16 planches hors-texte d'illustrations en noir et blanc en fin d'ouvrage, principalement des fac-similés (complet) Reprint en fac-similé Gabay de 1989 d'un texte paru dans la Journal de Liouville, Tome XI, année 1846, pages 381-444, l'étude de Sophue Lie est parue dans l'ouvrage Le Centenaire de l'Ecole Normale 1795-1885, Hachette, 1895 Book condition, Etat : Bon broché, sous couverture imprimée éditeur blanche, titre en rouge, illustrée d'une vignette au bas du plat supérieur grand In-8 1 vol. - 74 pages Contents, Chapitres : Oeuvres mathématiques de Galois, pages 381 à 444 (64 pages) - Etude de Sophus Lie, 10 pages - Évariste Galois, né le 25 octobre 1811 à Bourg-la-Reine, mort le 31 mai 1832 à Paris, est un mathématicien français, qui a donné son nom à une branche des mathématiques, la théorie de Galois. Mort à la suite d'un duel à l'âge de vingt ans, il laisse un manuscrit élaboré trois ans plus tôt, dans lequel il établit qu'une équation algébrique est résoluble par radicaux si et seulement si le groupe de permutations de ses racines a une certaine structure, qu'on appellera plus tard résoluble. Son Mémoire sur les conditions de résolubilité des équations par radicaux, publié par Joseph Liouville quatorze ans après sa mort, a été considéré par ses successeurs, en particulier Sophus Lie, comme le déclencheur du point de vue structural et méthodologique des mathématiques modernes. (source : Wikipedia) couverture à peine jaunie, avec une infime trace de pliure au coin inférieur droit du plat supérieur, sinon bon état, intérieur frais et propre 200.
Publicado por Hachette Livre Bnf, 2020
ISBN 10: 2329445423ISBN 13: 9782329445427
Librería: Lucky's Textbooks, Dallas, TX, Estados Unidos de America
Libro
Condición: New.
Publicado por Literary Licensing, LLC, 2014
ISBN 10: 1498178197ISBN 13: 9781498178198
Librería: Lucky's Textbooks, Dallas, TX, Estados Unidos de America
Libro
Condición: New.
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Nuevo desde EUR 21,38
Año de publicación: 2022
Librería: S N Books World, Delhi, India
Libro Impresión bajo demanda
Leatherbound. Condición: NEW. Leatherbound edition. Condition: New. Leather Binding on Spine and Corners with Golden leaf printing on spine. Bound in genuine leather with Satin ribbon page markers and Spine with raised gilt bands. A perfect gift for your loved ones. Reprinted from 1846 edition. NO changes have been made to the original text. This is NOT a retyped or an ocr'd reprint. Illustrations, Index, if any, are included in black and white. Each page is checked manually before printing. As this print on demand book is reprinted from a very old book, there could be some missing or flawed pages, but we always try to make the book as complete as possible. Fold-outs, if any, are not part of the book. If the original book was published in multiple volumes then this reprint is of only one volume, not the whole set. IF YOU WISH TO ORDER PARTICULAR VOLUME OR ALL THE VOLUMES YOU CAN CONTACT US. Resized as per current standards. Sewing binding for longer life, where the book block is actually sewn (smythe sewn/section sewn) with thread before binding which results in a more durable type of binding. Pages: 72 Language: French Pages: 72.
Publicado por Gabay, Sceaux, 1989
Librería: Librairie Montréal, Saint-Césaire, QC, Canada
Libro
Couverture souple. Condición: Très bon. Sceaux (France), Éditions Jacques Gabay, 1989, couverture souple, environ 24 X 16 cm, impression en fac-simile, 64 (4) et 9 pages. Le livre est très proche du neuf avec seulement de l'usure insignifiante à certains coins de la couverture et quelques très fines rides visible à la lumière rasante au dernier plat de couverture. L'intérieur est sans reproche sauf pour le nom d'un ancien détenteur inscrit sur la page de faux-titre. (AVERTISSEMENT ; Les frais d?envoi internationaux donnés par Abebooks sont souvent erronés veuillez obligatoirement m?écrire pour connaître les frais d?envoi réels pour l?extérieur du Canada AVANT de passer votre commande sinon vous pourriez avoir de mauvaises surprises. Paiement de préférence par Paypal).
Publicado por JACQUES GABAY, 2000
ISBN 10: 2876470527ISBN 13: 9782876470521
Librería: Gallix, Gif sur Yvette, Francia
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Condición: Neuf.
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Usado desde EUR 35,00
Encuentre también Tapa blanda
Publicado por Culturea 2022-12, 2022
Librería: Chiron Media, Wallingford, Reino Unido
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PF. Condición: New.
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Nuevo desde EUR 20,01
Publicado por JACQUES GABAY, 2001
ISBN 10: 287647137XISBN 13: 9782876471375
Librería: Gallix, Gif sur Yvette, Francia
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Condición: Neuf.
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Nuevo desde EUR 31,00
Publicado por Gauthiers-Villars et Fils, 1951
Librería: Zubal-Books, Since 1961, Cleveland, OH, Estados Unidos de America
Condición: Very Good. *Price HAS BEEN REDUCED by 10% until Monday April 29 (sale item)* 2nd edition; 56 pp., original printed paper wrappers, very good. - If you are reading this, this item is actually (physically) in our stock and ready for shipment once ordered. We are not bookjackers. Buyer is responsible for any additional duties, taxes, or fees required by recipient's country.
Publicado por Gauthiers-Villars, 1951
Librería: Expatriate Bookshop of Denmark, Svendborg, Dinamarca
Soft cover. Condición: Good. 25x16cm, x,56 pages., Deuxime édition revue et corrigée. Cover toned. Some wear. Page browning. Good. Full title reads: "Oeuvres mathématiques d'Evariste Galois publiées en 1897. Suivies d'une notice sur Evariste Galois et la théorie des équations algébriques par G. Verriest".
Publicado por Alpha Edition, 2023
ISBN 10: 9357947787ISBN 13: 9789357947787
Librería: AHA-BUCH GmbH, Einbeck, Alemania
Libro Impresión bajo demanda
Taschenbuch. Condición: Neu. nach der Bestellung gedruckt Neuware - Printed after ordering - Oeuvres mathématiques d'Évariste Galois, est un livre classique et rare, qui a été considéré comme important tout au long de l'histoire de l'humanité, et pour que cet ouvrage ne soit jamais oublié, chez Alpha Editions, nous avons fait des efforts pour sa préservation en rééditant ce livre dans un format moderne pour les générations présentes et futures. . Tout ce livre a été reformaté, retapé et repensé. Ces livres ne sont pas constitués de copies numérisées de leur ¿uvre originale et leur texte est donc clair et lisible. Ce volume remarquable s'inscrit dans les genres de Science Mathematics.
Publicado por Gauthier-Villars, Paris, 1951
Librería: Eric Zink Livres anciens, PARIS, Francia
Miembro de asociación: ILAB
Couverture souple. Condición: Très bon. Broché sous couverture éditeur. Un volume in-8 (255x166 mm), x-61-(3)-56-(1) pages et frontispice. Deuxième édition revue et corrigée. Mors à vingt ans lors d'un duel, Evariste Galois fondent avec ses travaux les mathématiques modernes. Les travaux de Galois sont ici complétés par une notice de G. Verriest. ___________________________________________________________________________________ ______________________________ENGLISH_DESCRIPTION : Original printed wrappers. 8vo (255x166 mm), x-61-(3)-56-(1) pages and frontispiece. Second edition. 215g.
Publicado por Gauthiers-Villars et Fils, Paris, France, 1951
Librería: Black Cat Hill Books, Oregon City, OR, Estados Unidos de America
Paperback. Deuxieme Edition, revue et corrigee. Very Good in Wraps: shows indications of careful use: very faint dampstain at the upper front corner tip; very light wear to the extremities; faint soiling to the lower front corner of the wrapper covers; former owner name at the top of the front endpaper; the pages have tanned somewhat, due to aging; the binding remains square and secure; the text is clean. Shows mild wear and a few flaws, but remains structurally sound and tightly bound: sturdy, and presentable. NOT a Remainder, Book-Club, or Ex-Library. Large 8vo. x, 117pp. Introduction par M. Emile Picard. Frontispiece Portrait of Galois. Academic Press Paperback.
Publicado por , Gauthier-Villars, 1951
Librería: librisaggi, SAN VITO ROMANO, Italia
Condición: Mediocre (Poor). Piatti e dorso segnati dal tempo con lievi usure, bruniti e con fioriture. Tagli bruniti ed irregolari. Interno ingiallito, con qualche fioritura ma perfettamente leggibile. 56 Mediocre (Poor) .
Publicado por Paris : Gauthier-Villars et Fils, 1897
Librería: PRISCA, Paris, Francia
Original o primera edición
Couverture rigide. Condición: Très bon. Edition originale. In-8° cartonné, 61 pages "La théorie des équations a fait au XIXe siècle des progrès décisifs. Mais la découverte la plus profonde, celle qui a fait pénétrer au coeur de la question est celle de Galois. Le premier, Galois met en évidence l'importance du groupe de l'équation. Une autre notion très importante est celle des sous-groupes dits invariants, contenus dans le groupe primitif. Galois tire de ces principes des résultats très remarquables qui sont actuellement la base de la théorie des équations.". (Rouse Ball II pp. 176/178) ---- "Galois proved the important theorem that every invariant subgroup gives rise to a quotient group which exhibits many fundamental properties of the group. He showed that to each algebraic equation corresponds a group of substitions which reflects the essential character of the equation. (Cajori pp. 351/352) ---- DSB V pp. 259/264*.
Publicado por Bachelier, Paris, 1846
Librería: Eric Zink Livres anciens, PARIS, Francia
Miembro de asociación: ILAB
Original o primera edición
Couverture rigide. Condición: Très bon. Edition originale. Demi basane de l'époque. Dos lisse abîmé. Un volume in quarto (261x205 mm), (8)-488 pages. Des rousseurs. Manques en marge aux coins supérieurs des pages 437-440. Cachets répétés de l'Ecole d'artillerie de Vincennes. Un seul sur les ?uvres de Galois (p.409), deux au faux titre général du volume et plusieurs sur les autres articles contenus dans ce volume. Première édition des oeuvres complètes de Galois rassemblées par Liouville (p.381-444) dans ce volume du Journal de Mathématiques pures et appliquées. Mathématicien génial, incompris à son époque et au destin tragique (il mourut à 20 ans dans un duel galant), Galois à créé la notion de groupe et ses travaux ont inspiré des générations de mathématiciens. Étudiant brillant, il fut incompris de ses contemporains. Poisson rejeta les travaux qu'il voulait présenter à l'Académie des sciences de Paris. En 1832, la veille du duel fatal, Galois rédigea son testament mathématique qu'il confia à un ami. Ce n'est qu'en 1846 que Liouville les publiera dans ce volume du Journal des mathématiques et qu'en 1870 que Jordan en reconnaîtra l'importance. "Lorsque, cédant au v?u des amis d'Evariste, je me suis livré, pour ainsi dire sous les yeux de son frère, à l'étude attentive de toutes les pièces imprimées ou manuscrites qu'il a laissées, j'ai donc cru devoir me proposer comme but unique de rechercher, de démêler, pour le faire ensuite ressortir de mon mieux, ce qu'il y a de neuf dans ces productions. Mon zèle a bientôt été récompensé, et j'ai joui d'un vif plaisir au moment où, après avoir comblé de légères lacunes, j'ai reconnu l'exactitude entière de la méthode par laquelle Galois prouve, en particulier, ce beau théorème : 'Pour qu'une équation irréductible de degré premier soit soluble par radicaux, il faut et il suffit que toutes les racines soient des fonctions rationnelles de deux quelconques d'entre elles'. Cette méthode, vraiment digne de l'attention des géomètres, suffirait seule pour assurer à notre compatriote un rang dans le petit nombre des savants qui ont mérité le titre d'inventeur." (Liouville p.382). _______________________________________________________________________ ____________ ______________________________ENGLISH_DESCRIPTION : Contemporary quarter sheep. 4to (261x205 mm), (8)-488 pages. Spine Chipped. Some foxing. Many library stamps, of wich one (p. 409) is touching the Galois' works. First edition of collected mathematical works of Evariste Galois given by Liouville in this volume of the Journal de Mathématiques pures et appliquées . A brilliant mathematician, misunderstood in his day and with a tragic fate (he died at the age of 20 in a gallant duel), Galois created the notion of group, and his work has inspired generations of mathematicians. A brilliant student, he was misunderstood by his contemporaries. Poisson rejected the work he wanted to present to the Paris Academy of Sciences. In 1832, on the eve of his fatal duel, Galois wrote his mathematical will, which he entrusted to a friend. It was not until 1846 that Liouville published them in this volume of the Journal des mathématiques, and not until 1870 that Jordan recognized their importance. "When, yielding to the wish of Evariste's friends, I gave myself up, as it were under the eyes of his brother, to the attentive study of all the printed or manuscript pieces he left behind, I therefore thought I had to propose as my sole aim to seek out, to unravel, to then bring out as best I could, what was new in these productions. My zeal was soon rewarded, and I was delighted when, after filling in a few small gaps, I recognized the complete accuracy of the method by which Galois proves, in particular, this beautiful theorem: For an irreducible equation of prime degree to be solvable by radicals, it is necessary and sufficient that all the roots be rational functions of any two of them'. This method, truly worthy of the attention of geometers, would alone suffice to secure our compatriot a place among the small number of scientists who have earned the title of inventor." (Liouville p.382). 1390g.
Publicado por Bachelier, Paris, 1846
Librería: SOPHIA RARE BOOKS, Koebenhavn V, Dinamarca
Miembro de asociación: ILAB
Original o primera edición
First edition. THE FIRST PUBLICATION OF GALOIS' MOST IMPORTANT WORKS. First edition of Galois' collected mathematical works, for the most part previously unpublished. Their posthumous publication was due to Joseph Liouville, editor of the leading French journal on pure and applied mathematics. "There have been few mathematicians with personalities as engaging as that of Galois, who died at the age of twenty years and seven months from wounds received in a mysterious duel. He left a body of work - for the most part published posthumously - of less than 100 pages, the astonishing richness of which was revealed in the second half of the nineteenth century. Far from being a cloistered scholar, this extraordinarily precocious and exceptionally profound genius had an extremely tormented life. A militant republican, driven to revolt by the adversity that overwhelmed him and by the incomprehension and disdain with which the scientific world received his works, to most of his contemporaries he was only a political agitator. Yet in fact, continuing the work of Abel, he produced with the aid of group theory a definitive answer to the problem of the solvability of algebraic equations, a problem that had absorbed the attention of mathematicians since the eighteenth century; he thereby laid one of the foundations of modern algebra. The few sketches remaining of other works that he devoted to the theory of elliptic functions and that of Abelian integrals and his reflections on the philosophy and methodology of mathematics display an uncanny foreknowledge of modern mathematics" (DSB). "Évariste Galois created mathematics which changed the direction of algebra. His revolutionary ideas date from around May 1829 to June 1830, the twelve to thirteen months surrounding his eighteenth birthday. An article published in June 1830 created the theory of Galois imaginaries, a fore-runner of what are now known as finite fields; his so-called Premier Mémoire created group theory and Galois Theory-the modern version of the theory of equations. The Lettre testamentaire, the letter that he wrote to his friend Auguste Chevalier on 29 May 1832, the eve of the duel, is an extraordinary summary of what he had achieved and what he might have achieved had he lived to develop and expound more of his mathematical ideas" (Neumann, p. vii). The Oeuvres were considered definitive until 1906; in addition to the memoirs published in Galois's lifetime (except for the last) and the letter to Auguste Chevalier, this edition contains the following previously unpublished memoirs: 'Mémoire sur les conditions de résolubilité des équations par radicaux,' pp. 417-433; and 'Des équations primitives qui sont solubles par radicaux,' pp. 434-444. "Galois's terse style, combined with the great originality of his thought and the modernity of his conceptions, contributed as muchas the delay in publication to the length of time that passed before Galois's work was understood, recognized at its true worth, and fully developed . It was only with the publication in 1866 of the third edition of Alfred Serret's Cours d'algébre supérieure and, in 1870, of Camille Jordan's Traité des substitutions that group theory and the whole of Galois's oeuvre were truly integrated into the body of mathematics" (DSB). "In 1828 [Galois] began to study certain recent works on the theory of equations, number theory, and the theory of elliptic functions. This was the period of his first memorandum, published in March 1829 in Gergonne's Annales de mathématiques pures et appliquées; making more explicit and demonstrating a result of Lagrange's concerning continuous fractions, it reveals a certain ingenuity but does not herald an exceptional talent. "By his own account, in the course of 1828 Galois wrongly believed-as Abel had eight years earlier-that he had solved the general fifth-degree equation. Rapidly undeceived, he resumed on a new basis the study of the theory of equations, which he pursued until he achieved the elucidation of the general problem with the help of group theory. The results he obtained in May 1829 were communicated to the Académie des Sciences by a particularly competent judge, Cauchy. But events were to frustrate these brilliant beginnings and to leave a deep mark on the personality of the young mathematician. First, at the beginning of July came the suicide of his father, who had been persecuted for his liberal opinions. Second, a month later he failed the entrance examination for the École Polytechnique, owing to his refusal to follow the method of exposition suggested by the examiner. Seeing his hopes vanish for entering the school which attracted him because of its scientific prestige and liberal tradition, he took the entrance examination for the École Normale Supérieure (then called the École Préparatoire), which trained future secondary school teachers. Admitted as the result of an excellent grade in mathematics, he entered this institution in November 1829; it was then housed in an annex of the Collège Louis-le-Grand, where he had spent the previous six years. At this time, through reading Férussac's Bulletin des sciences mathématiques, he learned of Abel's recent death and, at the same time, that Abel's last published memoir contained a good number of the results he himself had presented as original in his memoir to the Academy. "Cauchy, assigned to report on Galois's work, had to counsel him to revise his memoir, taking into account Abel's researches and the new results he had obtained. (It was for this reason that Cauchy did not present a report on his memoir.) Galois actually composed a new text that he submitted to the Academy at the end of February 1830, hoping to win the grand prix in mathematics. Unfortunately this memoir was lost upon the death of Fourier, who had been appointed to examine it. Brusquely eliminated from the competition, Galois believed himself to be the object of a new persecution by the representatives of official science and of soc.
Publicado por Bachelier, Paris, 1846
Librería: SOPHIA RARE BOOKS, Koebenhavn V, Dinamarca
Miembro de asociación: ILAB
Original o primera edición
First edition. THE FIRST PUBLICATION OF GALOIS' MOST IMPORTANT WORKS. First edition, a remarkable copy uncut in the original printed wrappers and very rare thus, of Galois' collected mathematical works, for the most part previously unpublished. Their posthumous publication was due to Joseph Liouville, editor of the leading French journal on pure and applied mathematics. "There have been few mathematicians with personalities as engaging as that of Galois, who died at the age of twenty years and seven months from wounds received in a mysterious duel. He left a body of work - for the most part published posthumously - of less than 100 pages, the astonishing richness of which was revealed in the second half of the nineteenth century. Far from being a cloistered scholar, this extraordinarily precocious and exceptionally profound genius had an extremely tormented life. A militant republican, driven to revolt by the adversity that overwhelmed him and by the incomprehension and disdain with which the scientific world received his works, to most of his contemporaries he was only a political agitator. Yet in fact, continuing the work of Abel, he produced with the aid of group theory a definitive answer to the problem of the solvability of algebraic equations, a problem that had absorbed the attention of mathematicians since the eighteenth century; he thereby laid one of the foundations of modern algebra. The few sketches remaining of other works that he devoted to the theory of elliptic functions and that of Abelian integrals and his reflections on the philosophy and methodology of mathematics display an uncanny foreknowledge of modern mathematics" (DSB). "Évariste Galois created mathematics which changed the direction of algebra. His revolutionary ideas date from around May 1829 to June 1830, the twelve to thirteen months surrounding his eighteenth birthday. An article published in June 1830 created the theory of Galois imaginaries, a fore-runner of what are now known as finite fields; his so-called Premier Mémoire created group theory and Galois Theory-the modern version of the theory of equations. The Lettre testamentaire, the letter that he wrote to his friend Auguste Chevalier on 29 May 1832, the eve of the duel, is an extraordinary summary of what he had achieved and what he might have achieved had he lived to develop and expound more of his mathematical ideas" (Neumann, p. vii). The Oeuvres were considered definitive until 1906; in addition to the memoirs published in Galois's lifetime (except for the last) and the letter to Auguste Chevalier, this edition contains the following previously unpublished memoirs: 'Mémoire sur les conditions de résolubilité des équations par radicaux,' pp. 417-433; and 'Des équations primitives qui sont solubles par radicaux,' pp. 434-444. "Galois's terse style, combined with the great originality of his thought and the modernity of his conceptions, contributed as muchas the delay in publication to the length of time that passed before Galois's work was understood, recognized at its true worth, and fully developed . It was only with the publication in 1866 of the third edition of Alfred Serret's Cours d'algébre supérieure and, in 1870, of Camille Jordan's Traité des substitutions that group theory and the whole of Galois's oeuvre were truly integrated into the body of mathematics" (DSB). "In 1828 [Galois] began to study certain recent works on the theory of equations, number theory, and the theory of elliptic functions. This was the period of his first memorandum, published in March 1829 in Gergonne's Annales de mathématiques pures et appliquées; making more explicit and demonstrating a result of Lagrange's concerning continuous fractions, it reveals a certain ingenuity but does not herald an exceptional talent. "By his own account, in the course of 1828 Galois wrongly believed-as Abel had eight years earlier-that he had solved the general fifth-degree equation. Rapidly undeceived, he resumed on a new basis the study of the theory of equations, which he pursued until he achieved the elucidation of the general problem with the help of group theory. The results he obtained in May 1829 were communicated to the Académie des Sciences by a particularly competent judge, Cauchy. But events were to frustrate these brilliant beginnings and to leave a deep mark on the personality of the young mathematician. First, at the beginning of July came the suicide of his father, who had been persecuted for his liberal opinions. Second, a month later he failed the entrance examination for the École Polytechnique, owing to his refusal to follow the method of exposition suggested by the examiner. Seeing his hopes vanish for entering the school which attracted him because of its scientific prestige and liberal tradition, he took the entrance examination for the École Normale Supérieure (then called the École Préparatoire), which trained future secondary school teachers. Admitted as the result of an excellent grade in mathematics, he entered this institution in November 1829; it was then housed in an annex of the Collège Louis-le-Grand, where he had spent the previous six years. At this time, through reading Férussac's Bulletin des sciences mathématiques, he learned of Abel's recent death and, at the same time, that Abel's last published memoir contained a good number of the results he himself had presented as original in his memoir to the Academy. "Cauchy, assigned to report on Galois's work, had to counsel him to revise his memoir, taking into account Abel's researches and the new results he had obtained. (It was for this reason that Cauchy did not present a report on his memoir.) Galois actually composed a new text that he submitted to the Academy at the end of February 1830, hoping to win the grand prix in mathematics. Unfortunately this memoir was lost upon the death of Fourier, who had been appointed to examine it. Brusquely eliminated from the competition, Galois believed himself to be the obj.