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Year: 1978 Publisher: Cambridge: Cambridge university press,
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ISBN: 0840503954 Year: 1978 Publisher: Montréal Presses de l'Université de Montréal
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ISBN: 0517523833 Year: 1978 Publisher: New York (N.Y.): Potter
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ISBN: 3519023458 Year: 1978 Publisher: Stuttgart Teubner
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ISBN: 0819101176 Year: 1978 Publisher: Washington (D.C.): University press of America
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Year: 1978 Publisher: Frankfurt a. M.: Suhrkamp,
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Langage --- Philosophie --- Logic, symbolic and mathematical --- Language and languages
Book
ISBN: 2082111164 9782082111164 Year: 1978 Publisher: Paris: Flammarion,
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Semantics (Philosophy) --- Logic, symbolic and mathematical --- Language and languages --- Philosophy --- Philosophy of language --- Logic, Symbolic and mathematical --- Sémantique (Philosophie) --- Logique symbolique et mathématique --- Langage et langues --- Philosophie --- Language and languages - Philosophy
Book
ISBN: 2859262687 Year: 1978 Publisher: Paris : Secrétariat mathématique,
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ISBN: 0824767721 9780824767723 Year: 1978 Volume: 39 Publisher: New York : Marcel Dekker,
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Mathematical logic --- Logic, symbolic and mathematical --- Congresses --- 510.6 --- Logic, Symbolic and mathematical --- -Algebra of logic --- Logic, Universal --- Symbolic and mathematical logic --- Symbolic logic --- Mathematics --- Algebra, Abstract --- Metamathematics --- Set theory --- Syllogism --- Congresses. --- -Mathematical logic --- 510.6 Mathematical logic --- -510.6 Mathematical logic --- Algebra of logic --- Logique mathématique --- Logic, Symbolic and mathematical - Congresses
Book
ISBN: 069108212X 1322886717 0691610223 1400871344 0691638373 9780691082127 Year: 1978 Volume: 13 3 Publisher: [Tokyo] : [Princeton, N.J.] : Iwanami Shoten ; Princeton University Press,
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Using set theory in the first part of his book, and proof theory in the second, Gaisi Takeuti gives us two examples of how mathematical logic can be used to obtain results previously derived in less elegant fashion by other mathematical techniques, especially analysis. In Part One, he applies Scott- Solovay's Boolean-valued models of set theory to analysis by means of complete Boolean algebras of projections. In Part Two, he develops classical analysis including complex analysis in Peano's arithmetic, showing that any arithmetical theorem proved in analytic number theory is a theorem in Peano's arithmetic. In doing so, the author applies Gentzen's cut elimination theorem. Although the results of Part One may be regarded as straightforward consequences of the spectral theorem in function analysis, the use of Boolean- valued models makes explicit and precise analogies used by analysts to lift results from ordinary analysis to operators on a Hilbert space. Essentially expository in nature, Part Two yields a general method for showing that analytic proofs of theorems in number theory can be replaced by elementary proofs.Originally published in 1978.The Princeton Legacy Library uses the latest print-on-demand technology to again make available previously out-of-print books from the distinguished backlist of Princeton University Press. These editions preserve the original texts of these important books while presenting them in durable paperback and hardcover editions. The goal of the Princeton Legacy Library is to vastly increase access to the rich scholarly heritage found in the thousands of books published by Princeton University Press since its founding in 1905.
Algebra, Boolean. --- Logic, Symbolic and mathematical. --- Algebra, Boolean --- Logic, Symbolic and mathematical --- 510.6 --- Algebra of logic --- Logic, Universal --- Mathematical logic --- Symbolic and mathematical logic --- Symbolic logic --- Mathematics --- Algebra, Abstract --- Metamathematics --- Set theory --- Syllogism --- 510.6 Mathematical logic --- Boolean algebra --- Boole's algebra --- Algebraic logic --- Logic, symbolic and mathematical --- Logique mathématique
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