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基本説明
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Full Description
This multi-authored effort, Mathematics of the nineteenth century (to be fol lowed by Mathematics of the twentieth century), is a sequel to the History of mathematics from antiquity to the early nineteenth century, published in three volumes from 1970 to 1972. 1 For reasons explained below, our discussion of twentieth-century mathematics ends with the 1930s. Our general objectives are identical with those stated in the preface to the three-volume edition, i. e. , we consider the development of mathematics not simply as the process of perfecting concepts and techniques for studying real-world spatial forms and quantitative relationships but as a social process as well. Mathematical structures, once established, are capable of a certain degree of autonomous development. In the final analysis, however, such immanent mathematical evolution is conditioned by practical activity and is either self-directed or, as is most often the case, is determined by the needs of society. Proceeding from this premise, we intend, first, to unravel the forces that shape mathe matical progress. We examine the interaction of mathematics with the social structure, technology, the natural sciences, and philosophy. Through an anal ysis of mathematical history proper, we hope to delineate the relationships among the various mathematical disciplines and to evaluate mathematical achievements in the light of the current state and future prospects of the science. The difficulties confronting us considerably exceeded those encountered in preparing the three-volume edition.
Contents
One Mathematical Logic.- The Prehistory of Mathematical Logic.- Leibniz's Symbolic Logic.- The Quantification of a Predicate.- The "Formal Logic" of A. De Morgan.- Boole's Algebra of Logic.- Jevons' Algebra of Logic.- Venn's Symbolic Logic.- Schröder's and Poretski-'s Logical Algebra.- Conclusion.- Two Algebra and Algebraic Number Theory.- 1 Survey of the Evolution of Algebra and of the Theory of Algebraic Numbers During the Period of 1800-1870.- 2 The Evolution of Algebra.- Algebraic Proofs of the Fundamental Theorem of Algebra in the 18th Century.- C.F. Gauss' First Proof.- C.F. Gauss' Second Proof.- The Kronecker Construction.- The Theory of Equations.- Carl Friedrich Gauss.- Solution of the Cyclotomic Equation.- Niels Henrik Abel.- Evariste Galois.- The Algebraic Work of Evariste Galois.- The First Steps in the Evolution of Group Theory.- The Evolution of Linear Algebra.- Hypercomplex Numbers.- William Rowan Hamilton.- Matrix Algebra.- The Algebras of Grassmann and Clifford.- Associative Algebras.- The Theory of Invariants.- 3 The Theory of Algebraic Numbers and the Beginnings of Commutative Algebra.- Disquisitiones Arithmeticaeof C.F. Gauss.- Investigation of the Number of Classes of Quadratic Forms.- Gaussian Integers and Their Arithmetic.- Fermat's Last Theorem. The Discovery of E. Kummer.- Kummer's Theory.- Difficulties. The Notion of an Integer.- The Zolotarev Theory. Integral and p-Integral Numbers.- Dedekind's Ideal Theory.- On Dedekind's Method. Ideals and Cuts.- Construction of Ideal Theory in Algebraic Function Fields.- L. Kronecker's Divisor Theory.- Conclusion.- Three Problems of Number Theory.- 1 The Arithmetic Theory of Quadratic Forms.- The General Theory of Forms; Ch. Hermite.- Korkin's and Zolotarev's Works on the Theory of Quadratic Forms.- The Investigations of A.A. Markov.- 2 Geometry of Numbers.- Origin of the Theory.- The Work of H.J.S. Smith.- Geometry of Numbers: Hermann Minkowski.- The Works of G.F. Vorono-.- 3 Analytic Methods in Number Theory.- Lejeune-Dirichlet and the Theorem on Arithmetic Progressions.- Asymptotic Laws of Number Theory.- Chebyshev and the Theory of Distribution of Primes.- The Ideas of Bernhard Riemann.- Proof of the Asymptotic Law of Distribution of Prime Numbers.- Some Applications of Analytic Number Theory.- Arithmetic Functions and Identities. The Works of N.V. Bugaev.- 4 Transcendental Numbers.- The Works of Joseph Liouville.- Charles Hermite and the Proof of the Transcendence of the Number e; The Theorem of Ferdinand Lindemann.- Conclusion.- Four The Theory of Probability.- Laplace's Theory of Probability.- Laplace's Theory of Errors.- Gauss' Contribution to the Theory of Probability.- The contributions of Poisson and Cauchy.- Social and Anthropometric Statistics.- The Russian School of the Theory of Probability. P.L. Chebyshev.- New Fields of Application of the Theory of Probability. The Rise of Mathematical Statistics.- Works of the Second Half of the 19th Century in Western Europe.- Conclusion.- Addendum.- 1. French and German Quotations.- 2. Notes.- 3. Additional Bibliography.- Bibliography (by F.A. Medvedev).- Abbreviations.- Index of Names.
