Leipzig, Berlin, Teubner, 1923. Orig. hcloth. IV,416 pp.
Lpz., 1933. (Reprint Ann Arbor 1944). Orig. cloth. 221 pp.
Leipzig, 1933 (Lithoprinted by Edwards Brothers, 1944). Orig. full cloth. VIII,221 pp.
P., Gauthier-Villars, 1922, un volume in 8 broché, couverture imprimée, 9pp., 229pp.
---- EDITION ORIGINALE -- BON EXEMPLAIRE**7489/N4
Plenum Press Malicorne sur Sarthe, 72, Pays de la Loire, France 1975 Book condition, Etat : Bon hardcover, no dust-jacket grand In-8 1 vol. - 145 pages
Contents, Chapitres : Contributors, Contents, Preface, Text, 145 pages - Gottfried Anger : Direct and inverse problems in potential theory - Viorel Barbu : Regularity results for some differential equations associated with maximal monotone operators in Hilbert spaces - Haim Brezis : Classes d'interpolation associées à un opérateur monotone et applications - Siegfried Dümmel : On inverse problems for k-dimensional potentials - Jozef Kacur : Application of Rothe's method to nonlinear parabolic boundary value problems - Josef Kral : Potentials and removability of singularities - Vladimir Lovicar : Theorem of Frechet and asymptotically almost periodic solutions of some nonlinear equations of hyperbolic type - Jaroslav Lukes : A new type of generalized solution of the Dirichlet problem for the heat equation - Jiri Vesely : Some remarks on Dirichlet problem - Ivo Vrkoc : Diffusion processes and their connection to partial differential equations of parabolic type no D.J., the clothes are lightly shrubbed, otherwise near fine copy
Birkhäuser 2002 Birkhäuser, Operator Theory Advances and Applications (Vol. 133), 2002, xiv-352 p., cartonnage éditeur, environ 24x17cm, bon état.
En anglais. Merci de nous contacter à l'avance si vous souhaitez consulter une référence au sein de notre librairie.
MIR - MOSCOU. 1977. In-8. Relié toilé. Etat d'usage, Couv. convenable, Dos satisfaisant, Intérieur frais. 208 pages illustrées de quelques figures dans le texte / Titres dorés - Jaquette frottée, coins et coiffes abimés.. Avec Jaquette. . . Classification Dewey : 510-Mathématiques
Traduit du russe. Classification Dewey : 510-Mathématiques
Paris, Gauthier-Villars et Cie, 1922-1947. 3 tomes en 1 vol. in-8, IX-229 pp. + IV-251 pp. + XI-134 pp., demi-toile à coins bleue, dos long, pièce de titre bleue, couvertures conservées.
Éditions originales de ces trois publications formant un traité de la Théorie des nombres, chère à Maurice Kraïtchik, à laquelle il a consacré de nombreux ouvrages et une bonne partie de sa carrière. Publiées sur près de 25 ans, elles présentent en premier les généralités de ce champ d'étude. Le deuxième tome traite de l'analyse indéterminée du second degré et sa factorisation, le troisième, l'analyse diophantine et ses applications aux cuboïdes rationnels. Bel exemplaire. Voir photographie(s) / See picture(s) * Membre du SLAM et de la LILA / ILAB Member. La librairie est ouverte du lundi au vendredi de 14h à 19h. Merci de nous prévenir avant de passer,certains de nos livres étant entreposés dans une réserve.
Kiøbenhavn, Schubothe, 1799. Samtidigt hldrbd,, rygforgyldning og forgyldt skindtitel. En papirsetiket påsat øverst på ryg. Stempler på titelbladet. 120 pp. samt 10 kobberstukne foldeplancher. Indvendig ren, trykt på skrivepapir.
Préface de P. Lelong, 1 vol. in-8 reliure pleine toile bleue souple éditeur, Dunod Université, Paris, 1969
Bon état (cartonnage lég. frotté, très bon état par ailleurs)
Kjøbenhavn, Th. E. Rangel, 1813. Samt. hldrbd. Rygforgyldning, rygtitel. papirsetiket øverst på ryg. Stempler på titelbladet. (8),91,(1) pp. samt 1 foldetabel.
Originalytrykket. Krejdal opbygger et helt filosofisk system, byggende på modsigelsens grundsætning, der efter hans mening medfører, at alt kan gøres til genstand for matematisk analyse !!! - Bibl. Danica II, 6.
Dey. non daté. In-4. Broché. Etat d'usage, Couv. partiel. décollorée, Dos frotté, Rousseurs. 185 pages.. . . . Classification Dewey : 372.7-Livre scolaire : mathématiques
Centre d'Econométrie de la Faculté de Droit et des Sciences Economiques de Paris. Classification Dewey : 372.7-Livre scolaire : mathématiques
Kbhvn., T.G. Ranget, 1814. Samt. hldrbd. med rygforgyldning. Øverste kapitæl repareret. (12),88 pp.
Bibl. Danica II:54. Bemærkelsesværdigt dansk filosofisk forsøg, hvor det matematisk-dynamiske ligevægtsbegreb opfattes som et cetralbegreb, der kan overføres på psykologien, samfundsvidenskaberne, videnskaberne i almindelighed etc., således at et filosofisk system kan tage form. Kreydal var elev af Treschow og nær ven med Rasmus Rask.
N.Y., London, John Wiley and Sons, (1062). Orig. full fabrikoid. XVII,856 pp.
Leipzig, Akademische Verlagsanstalt, 1957. Orig. full cloth. XI,421 pp.
First edition.
Hermann. 1972. In-8. Broché. Etat d'usage, Couv. convenable, Dos satisfaisant, Papier jauni. 250 pages - petite annotation sur la page de garde.. . . . Classification Dewey : 372.7-Livre scolaire : mathématiques
Collection méthodes. Classification Dewey : 372.7-Livre scolaire : mathématiques
DUNOD. 1972. In-8. Relié. Bon état, Couv. convenable, Coiffe en tête abîmée, Intérieur frais. 313 pages - nombreuses figures en noir et blanc dans le texte.. . . . Classification Dewey : 372.7-Livre scolaire : mathématiques
Classification Dewey : 372.7-Livre scolaire : mathématiques
DUNOD. 1972. In-8. Relié. Bon état, Couv. convenable, Dos satisfaisant, Intérieur frais. 313 Pages. Nombreuses figures en noir et blanc dans et hors texte. Salissure sur le 1er plat.. . . . Classification Dewey : 372.7-Livre scolaire : mathématiques
Classification Dewey : 372.7-Livre scolaire : mathématiques
Dunod. 1971. In-8. Relié. Etat d'usage, Coins frottés, Mors fendus, Intérieur acceptable. 316 pages augmentées de nombreux schémas en noir et blanc dans le texte.. . . . Classification Dewey : 372.7-Livre scolaire : mathématiques
Yvan Krief, Claude Nier, Jean Blion, Gilberte Pajetta, Lucien Pajetta, André Ponge. Classification Dewey : 372.7-Livre scolaire : mathématiques
(No place), The Association for Symbolic Logic, 1959. Lev8vo. Bound in red half cloth with gilt lettering to spine. In ""Journal of Symbolic Logic"", Volume 24. Barcode label pasted on to back board. Small library stamp to lower part of 6 pages. A very fine copy. Pp. (1) - 14. [Entire volume: VI, 374 pp.).
The seminal first printing of Kripke's debut article, which provided the basis for his logic and for the model theory for modal logic in general. The work constitutes the very beginning of Kripke Semantics (often called possible world semantics). Kripke's works in general are rare in fist editions. Many of them remain unpublished and are only known in privately circulated manuscripts.The American philosopher Saul A. Kripke (born 1940) is an exceedingly important logician and philosopher of language and one of the most powerful and influential thinkers of analytic and Anglo-American philosophy. He is considered the greatest living philosopher and perhaps the greatest since Wittgenstein. In 2001 he was awarded the Schock Prize in Logic and Philosophy, which is considered the philosopical equivalent of the Nobel Prize.Kripke, who grew up in Omaha in a religious Jewish family, was somewhat of a prodigy child. During grammar school he got intimately acquainted with and mastered to perfection algebra, geometry and calculus, and very early on he took up philosophy, which later became his career. Still a teenager, in high school, he wrote a work that was to change the face of philosophical logic forever, namely the groundbreaking paper ""A Completeness Theorem for Modal Logic"", which was printed a few years later, in 1959, in the Journal of Symbolic Logic, while he was in his first year at Harvard University. This seminal debut work proposed what later came to be known as Kripke models for modal logic. The story goes that the paper earned a letter from the department of mathematics urging Kripke to apply for a job there, to which he is said to have written an answer explaining ""My mother said that I should finish high school and go to college first.""In 1962 he graduated from Harvard University, where he remained until 1968, first as a member of the Harvard Society of Fellows and then as a lecturer. During these years he developed the logical theories founded in the ""Completeness Theorem"" further and made seminal contributions to the field of logic and semantics. Kripke Semantics is a formal semantics for non-classical logic systems that Kripke began developing in his teenage years, first published something on in 1959 (the present work) and further developed in the 60'ies and. The development of Kripke Semantics was no less than a breakthrough in the making of non-classical logics, of which no model theory existed before Kripke's. With this work, Kripke laid the foundation for proving completeness theorems for modal logic, and for identifying the weakest normal modal logic, which is now named K after him.
Berlin, Königl. Akad. der Wissenschaften, 1873. No wrappers. Offprint from ""Monatsberichte der Königl. Akademie der Wissenschaften zu Berlin"", Februar 1873. Titlepage. a. pp. (117-)154.
First printing in the offprint form.
Berlin, Königl. Akad. der Wissenschaften, 1874. No wrappers. Offprint from ""Monatsbericht der Königl. Akademie der Wissenschaften zu Berlin"", Januar, Februar und März 1874. Titlepage (1-2),3-55 pp.
First printing in the offprint-form of Kroneckers main paper in the quarrell with Camille Jordan over the theory of bilinear forms
Leipzig, Teubner, 1901, un volume in 8, broché, couverture imprimée (dos cassé), 16pp., 509pp., (1), figures dans le texte
---- EDITION ORIGINALE ---- "KRONECKER étudie les propriétés des nombres algébriques et son apport est fondamental pour la théorie des corps". (Larousse "Inventeurs et scientifiques) ---- "KRONECKER's greatest mathematical achievements lie in his efforts to unify arithmetic, algebra and analysis and most particularly in his work on elliptical functions. His boudary formulas are particularly noteworthy in this regard, since they laid bare the deepest relationships between arithemtic and elliptical functions and provided the basis for Erich HECKE's later analytic-arithmeitcal investigations. KRONECKER also introduced a number of formal refinements in algebra and in the theory of numbers and many new theorems and concepts. Among the latter, special mention should be made of his theorem in ergard to the cyclotomic theory, according to which all algebraic numbers with Abelian and Galois groups (over the rational number field) are rational combinations of roots of unity. Histheorem on the convergence of infinite series is also significant... ". (DSB VII p. 508) ---- Cf cajori "A history of mathematics"**8876/N7DE
Altona, 1802. 8vo. Indbundet i samtidigt hellæderbind med 4 ophøjede bind og messingspænde. False løse og revne i bogblok mellem p 336 og p 337. Ellers pænt eksemplar. 400 p.