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Editore: Harvard University Press, 1982
ISBN 10: 0674554515ISBN 13: 9780674554511
Da: Blue Vase Books, Interlochen, MI, U.S.A.
Libro
Condizione: Good. The item shows wear from consistent use, but it remains in good condition and works perfectly. All pages and cover are intact (including the dust cover, if applicable). Spine may show signs of wear. Pages may include limited notes and highlighting. May NOT include discs, access code or other supplemental materials.
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Nuovo - A partire da EUR 24,42
Usato - A partire da EUR 6,58
Editore: Harvard University Press, 1947
Da: BookDepart, Shepherdstown, WV, U.S.A.
Hardcover. Condizione: UsedGood. ASIN: B0007ITRX6 Hardcover; fading and edge wear to exterior; type faded at spine; binding reinforced; fading to pages; otherwise in good condition with clean text.
Editore: Harper & Row, New York, 1962
Da: Dan's Books, Arlington, MA, U.S.A.
Libro
Trade Paperback. Condizione: Good +. First Harper Torchbook Edition. 346pp. Edgewear and light soil.
Editore: Harvard University Press, 1951
ISBN 10: 0674554507ISBN 13: 9780674554504
Da: ThriftBooks-Atlanta, AUSTELL, GA, U.S.A.
Libro
Hardcover. Condizione: Good. No Jacket. Missing dust jacket; Pages can have notes/highlighting. Spine may show signs of wear. ~ ThriftBooks: Read More, Spend Less 1.15.
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Usato - A partire da EUR 13,44
Hard cover. Very good. No dust jacket. Minim.
Soft cover. Condizione: Very Good. pp.xii,346, paperback, a very good copy of a book in the series ?Harper Torchbooks: The Science Library?, being a reprint of the 1951 revised edition.
Editore: Harper & Row, Publishers, 1962
Da: Tacoma Book Center, Tacoma, WA, U.S.A.
Paperback. Condizione: Very Good. Later Edition. ISBN Trade Paperback. Later Printing. Very Good Condition. Tight sound unmarked copy except for previous owner's name written on inside front cover, with minor rubs to edges and corners of covers, slight dustsoiling and browning to edges of interior pages.
Paperback. Condizione: Very Good. Condizione sovraccoperta: No Dustjacket. Later Edition. ISBN . Trade Paperback. Later Printing. Good to Very Good Condition, with minor rubs to edges and corners of covers, some creasing and fading to cover spine, some browning and dustsoiling to edges of interior pages. Tight, sound, unmarked copy except for previous owner's name written on half-title page. No Signature.
Editore: NY/Evanston: Harper & Row 1962., 1962
Da: de Wit Books, HUTCHINSON, KS, U.S.A.
G-VG, unmarked, 5" x 8" Paperback. xii + 346 pp.
Editore: Harvard Univ Press, 1947
Da: J. HOOD, BOOKSELLERS, ABAA/ILAB, Baldwin City, KS, U.S.A.
Hardcover. 340pp. Cover has soiling else very good, clean and sound condition without a dust jacket.
Editore: Harper Torchbook, 1962
Da: Callaghan Books South, New Port Richey, FL, U.S.A.
Libro Prima edizione
Soft cover. Condizione: Very Good. First Thus. Originally published, 1940. Larger softcover, colorfully designed in black, red, green and white, red lightly faded at spine bottom, 346 lightly browned pages and catalog. Very Good.
Editore: Harper Torchbooks, New York, 1962
Da: Ken Saunders, Stirling, ON, Canada
Condizione: good to very good, soft cover.
Editore: W. W. Norton, 1940
ISBN 10: 0387910883ISBN 13: 9780387910888
Da: Zubal-Books, Since 1961, Cleveland, OH, U.S.A.
Libro
Condizione: Very Good. first edition, first printing, issued by W. W. Norton in 1940; xiii, 348 pp., original green cloth (hardcover), lacks the jacket, spine and corners rubbed, else 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.
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Nuovo - A partire da EUR 370,10
Usato - A partire da EUR 21,87
Scopri anche Rilegato Prima edizione
Editore: Harvard University Press, Cambridge MA, 1951
Da: Row By Row Bookshop, Sugar Grove, NC, U.S.A.
Prima edizione
Hardcover. Condizione: Very Good. Condizione sovraccoperta: Good. Revised Edition. A Very Good copy in black cloth of the first printing of the 1951 revised edition, in a price-clipped and soiled Good dust jacket. (Not ex-library.). Book.
Editore: Literary Licensing, LLC, 2011
Da: Books From California, Simi Valley, CA, U.S.A.
hardcover. Condizione: Good.
pb. revised ed.
Editore: Literary Licensing, LLC 10/15/2011, 2011
ISBN 10: 1258187809ISBN 13: 9781258187804
Da: BargainBookStores, Grand Rapids, MI, U.S.A.
Libro
Paperback or Softback. Condizione: New. Mathematical Logic 1.07. Book.
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Nuovo - A partire da EUR 37,56
Usato - A partire da EUR 43,54
Scopri anche Brossura
Editore: Harvard University Press, Cambridge, MA, 1961
Da: Xochi's Bookstore & Gallery, Truth or consequences, NM, U.S.A.
Libro
Hardcover. Condizione: Very Good+. Condizione sovraccoperta: Very Good. 4th Print.of Revised Ed. 346pp.incl.index; HB blk.w/gilt; slight rub w/clean,tight pgs. DJ tan w/dk.green; rubbed w/spine darkened; 1x1"chip,bttm.spine. " .will be welcomed by all students and teachers in mathematics and philosophy who are seriously concerned with modern logic.".
Editore: Literary Licensing, LLC 8/5/2011, 2011
ISBN 10: 1258082241ISBN 13: 9781258082246
Da: BargainBookStores, Grand Rapids, MI, U.S.A.
Libro
Hardback or Cased Book. Condizione: New. Mathematical Logic 1.54. Book.
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Nuovo - A partire da EUR 49,70
Copertina flessibile. Condizione: Mediocre (Poor). Copertina flessibile 356 Mediocre (Poor) .
Editore: Harper & Row Publishers, 1962
Da: Robinson Street Books, IOBA, Binghamton, NY, U.S.A.
Membro dell'associazione: IOBA
Libro
paperback. Condizione: Used: Good. Prompt shipment, with tracking. we ship in CLEAN SECURE BOXES NEW BOXES Good 8vo paperback, minor nicks and creases present, owner stamp on front free end page, spine glue visible at inside of front cover, else clean pages, prompt shipping and tracking.
Editore: Harper and Row, Publishers, 1962
Da: Imaginal Books, Sardent, Francia
Libro
Soft cover. Condizione: Good. No Jacket.
Editore: Harper Torchbooks, USA, 1962
Da: SAVERY BOOKS, Brighton, East Sussex, Regno Unito
Libro
Paperback. Condizione: Good. Revised Edition. PAPERBACK 1962. Revised Edition. Clean & tight. INSCRIPTION ON THE FRONT END PAPER. Dispatched ROYAL MAIL FIRST CLASS with TRACKING next working day or sooner securely boxed in cardboard. ref HV5.
Da: Lynge & Søn ILAB-ABF, Copenhagen, Danimarca
Membro dell'associazione: ILAB
Cambridge, Harvard University Press, 1951. Orig. full cloth. XII,346 pp.
Editore: Harvard University Press, Cambridge, 1951
Da: Medium Rare Books, Mountainside, NJ, U.S.A.
Membro dell'associazione: IOBA
Libro Prima edizione
Hardcover. Condizione: Very Good. Condizione sovraccoperta: Very Good. 1st Edition. Harvard University Press, Cambridge, MA. 1951. 346 pages. First revised edition, first printing. From the library of Hale F. Trotter, noted Canadian-American mathematician, known for the Lie?Trotter product formula, the Steinhaus?Johnson?Trotter algorithm, and the Lang?Trotter conjecture. Signed on front free endpaper by Trotter as H.F. Trotter. Book is tight. Binding and hinges are strong and sound. Book is clean inside and out. Minimal shelf-rubbing along edges. Original DJ with price-clipped flap. SJ shows a couple of chips along edges. Minor light soiling to DJ. A solid VG+/VG copy of the first revised edition, first printing of Quine's classic; from the library of noted mathematician Hale F. Trotter.
Editore: W.W. Norton & Co. Inc, New York, 1940
Da: Burnside Rare Books, ABAA, Portland, OR, U.S.A.
Prima edizione
Hardcover. Condizione: Very Good. First Edition. First edition. (As stated on copyright page.) 348 pp. Original blue cloth with gilt spine lettering. Near Fine in Good+ dust jacket with price intact ($4.00), chipped head, a bit of wrinkling darkening to spine panel, creased snag to to top of back panel. Clean pages, toned with age, spine slightly toned. Quine's second book, rare in original jacket.
Editore: New York: W. W. Norton & Company, Inc., 1940, 1940
Da: Peter Harrington. ABA/ ILAB., London, Regno Unito
Prima edizione Copia autografata
First edition, first printing, presentation copy from the author to the American mathematician Edward Vermilye Huntington (1874-1952), inscribed on the front free endpaper "To Edward V. Huntington with kindest regards - Van Quine". Mathematical Logic was derived from the course of lectures in the subject which Quine delivered at Harvard University, in part aimed as a clear exposition of the subject for students, but also outlines the new research in the field which he had conducted since the publication of his System of Logistic in 1934. Quine was "familiar with the work of E. V. Huntington, who taught in the Harvard mathematics department for decades up to and including the 1930s, when Quine wrote 'Truth by Convention'. Huntington was one of the most influential proponents of what Michael Scanlan calls American postulate theory. In 'Truth by Convention', Quine criticizes some of Huntington's work, but refers to the 'postulate method' with approval" (Gary Ebbs, Carnap, Quine, and Putnam on Methods of Inquiry, 2017, p. 84). Octavo. Original green cloth, spine lettered in gilt. Fragments of original jacket loosely inserted at rear. Extremities lightly sunned and bumped, contents gently toned. A very good copy.
Editore: New York: W. W. Norton & Company, Inc., 1940, 1940
Da: Peter Harrington. ABA/ ILAB., London, Regno Unito
Prima edizione Copia autografata
First edition, first printing, family presentation copy from the author, inscribed on the front free endpaper to his elder brother Robert Cloyd Quine: "Equinoctial greetings to R. Quine from W. V. do., together with a bit of escape reading". Mathematical Logic was derived from the course of lectures in the subject which Quine delivered at Harvard University, in part aimed as a clear exposition of the subject for students, but also outlines the new research in the field which he had conducted since the publication of his System of Logistic in 1934. Octavo. Original green cloth, spine lettered in gilt. Spine and extremities lightly sunned with slight rubbing, contents unmarked; a very good copy.
Editore: Mathematical Association of America], [Washington, 1937
Prima edizione
Hardcover. First edition. QUINE'S 'NEW FOUNDATIONS'. First edition, the rare offprint issue, of the paper in which Quine first presented his axiom system for set theory (now usually known as 'NF'). "Although [Quine] is best known to a wider public for his philosophical writings, his most enduring and most concrete legacy for the next 50 years may well turn out to be his most mathematical: he gave us NF" (Forster, p. 838). NF was intended to address the 'crisis of foundations' that mathematicians have attempted to resolve since the early 20th century. "This 'crisis' had many causes and - despite the disappearance of the expression from contemporary speech - has never really been resolved. One of its many causes was the increasing formalisation of mathematics, which brought with it the realisation that the paradox of the liar could infect even mathematics itself. This appears most simply in the form of 'Russell's paradox', appropriately in the heart of set theory. At first blush one might think that where sets are concerned any intension has an extension: this is the axiom of naïve set existence. For any property of sets there exists a set containing precisely the sets with that property, all of those and no others. This leads rapidly to Russell's paradox, the paradox of the class of all sets that are not members of themselves. This is the Russell class. Is it a member of itself? Well, if it is, it isn't, and if it isn't, it is. This is Russell's paradox. The aperçu that leapt to mind was that the problem has something to do with the possibility of sets being members of themselves, or to do with defining sets in terms of membership of themselves. Although these two might sound like formulations of the same insight, they nevertheless lead to radically different resolutions, and to two traditions in set theory represented by Zermelo-Fraenkel set theory (often just called 'set theory' by its votaries, and in any case universally abbreviated to 'ZF') and Quine's NF" (ibid., pp. 838-9). No copies of this offprint listed on ABPC/RBH. The first attempt to resolve Russell's and other similar paradoxes was made by Russell himself (1908) in his theory of types. In this theory, every set is assigned a type (a positive whole number); the bottom type is a type of atoms and sets of type n+1 are sets of things of type n. Every variable of the theory is constrained to range over one level only. This means that Russell's paradox cannot even be formulated within type theory. However, the theory was found to have many drawbacks, as it prevented not only the formulation of the troublesome paradoxes, but also other apparently sensible statements. In addition, it necessarily introduces infinite multiplicities: for example, there has to be one empty set of each possible type, as well as a set of natural numbers of each type, etc. NF is similar to Russell's theory in that it involves types, but rather than assign a type to each set once and for all, it assigns a type to each variable in a given formula. If a variable x in a given formula is assigned type n, and if 'x ε y' appears in the formula, then y must be assigned type n+1. In addition, if 'x = y' appears in the formula, then x and y must have the same type. A formula is 'stratified' if there is an assignment of types to variables in the formula that meets these constraints. The axioms of NF are now simply stated: extensionality, together with a scheme that says that the extension of a stratified formula is a stratified formula. NF avoids the paradoxes of naive set theory because the formulas necessary to formulate the paradoxes are not stratified (for example, a set cannot be a member of itself because x ε x is obviously not a stratified formula). But it also avoids the multiplicities and other difficulties inherent in Russell's type theory. The approach taken in ZF is to restrict what objects can be called sets, rather than to impose restrictions on how sets are defined, as is done in NF. In ZF the empty set is a set, and any collection of sets is a set (and there are no other sets). ZF appears to resolve Russell's paradox because the 'set' of all sets that are not members of themselves is not in fact a set. Although ZF appears to be able to accommodate the whole of mathematics, many mathematicians believe ZF fails to capture the informal concept of a set: in ZF there is no universal set ('the set of all sets'), and the universe of sets is not closed under the elementary operations of the algebra of sets. NF is less restrictive: for example, in NF there is a universal set ('the set of all sets'). On the other hand, it was proved by Specker that the Axiom of Choice is false in NF, which some mathematicians believe restricts its usefulness for mathematics. The debate NF vs. ZF is ongoing. T. Forster, 'Quine's NF - 60 years on,' The American Mathematical Monthly 104 (1997), pp. 838-845. 8vo (255 x 182 mm, pp. 70-80. Original grey printed wrappers. A fine copy.