Cargando…
Mathematical thought from ancient to modern times. v. 3 /
| Clasificación: | Libro Electrónico |
|---|---|
| Autor principal: | |
| Formato: | Electrónico eBook |
| Idioma: | Inglés |
| Publicado: |
New York :
Oxford University Press,
1990, ©1972.
|
| Temas: | |
| Acceso en línea: | Texto completo |
Tabla de Contenidos:
- Mathematics in Mesopotamia : Where did mathematics begin? ; Political history in Mesopotamia ; The number symbols ; Arithmetic operations ; Babylonian algebra ; Babylonian geometry ; The uses of mathematics in Babylonia ; Evaluation of Babylonian mathematics
- Egyptian mathematics : Background ; The arithmetic ; Algebra and geometry ; Egyptian uses of mathematics ; Summary
- The creation of classical Greek mathematics : Background ; The general sources ; The major schools of the classical period ; The Ionian school ; The Pythagoreans ; The Eleatic school ; The Sophist school ; The Platonic school ; The school of Eudoxus ; Aristotle and his school
- Euclid and Apollonius : Introduction ; The background of Euclid's Elements ; The definitions and axioms of the Elements ; Books I to IV of the Elements ; Book V: the theory of proportion ; Book VI: similar figures ; Books VII, VIII, and IX: the theory of numbers ; Book X: the classification of incommensurables ; Books XI, XII, and XIII: solid geometry and the method of exhaustion ; The merits and defects of the Elements ; Other mathematical works by Euclid ; The mathematical work of Apollonius
- The Alexandrian Greek period: geometry and trigonometry : The founding of Alexandria ; The character of Alexandrian Greek mathematics ; Areas and volumes in the work of Archimedes ; Areas and volumes in the work of Heron ; Some exceptional curves ; The creation of trigonometry ; Late Alexandrian activity in geometry
- The Alexandrian period: the reemergence of arithmetic and algebra : The symbols and operations of Greek arithmetic ; Arithmetic and algebra as an independent development
- The Greek rationalization of nature : The inspiration for Greek mathematics ; The beginning of a rational view of nature ; The development of the belief in mathematical design ; Greek mathematical astronomy ; Geography ; Mechanics ; Optics ; Astrology
- The demise of the Greek world : A review of the Greek achievements ; The limitations of Greek mathematics ; The problems bequeathed by the Greeks ; The demise of the Greek civilization
- The mathematics of the Hindus and Arabs : Early Hindu mathematics ; Hindu arithmetic and algebra of the period A.D. 200-1200 ; Hindu geometry and trigonometry of the period A.D. 200-1200 ; The Arabs ; Arabic arithmetic and algebra ; Arabic geometry and trigonometry ; Mathematics circa 1300
- The medieval period in Europe : The beginnings of a European civilization ; The materials available for learning ; The role of mathematics in early medieval Europe ; The stagnation in mathematics ; The first revival of the Greek works ; The revival of rationalism and interest in nature ; Progress in mathematics proper ; Progress in physical science ; Summary
- The Renaissance : Revolutionary influences in Europe ; The new intellectual outlook ; The spread of learning ; Humanistic activity in mathematics ; The clamor for the reform of science ; The rise of Empiricism
- Mathematical contributions in the Renaissance : Perspective ; Geometry proper ; Algebra ; Trigonometry ; The major scientific progress in the Renaissance ; Remarks on the Renaissance
- Arithmetic and algebra in the sixteenth and seventeenth centuries : Introduction ; The status of the number system and arithmetic ; Symbolism ; The solution of third and fourth degree equations ; The theory of equations ; The binominal theorem and allied topics ; The theory of numbers ; The relationship of algebra to geometry
- The beginning of projective geometry : The rebirth of geometry ; The problems raised by the work on perspective ; The work of Desargues ; The work of Pascal and La Hire ; The emergence of new principles
- Coordinate geometry : The motivation for coordinate geometry ; The coordinate geometry of Fermat ; Rene Descartes ; Descartes's work in coordinate geometry ; Seventeenth-century extensions of coordinate geometry ; The importance of coordinate geometry
- The mathematization of science : Introduction ; Descartes's concept of science ; Galileo's approach to science ; The function concept
- The creation of the calculus : The motivation for the calculus ; Early seventeenth-century work on the calculus ; The work of Newton ; The work of Leibniz ; A comparison of the work of Newton and Leibniz ; The controversy over priority ; Some immediate additions to the calculus ; The soundness of the calculus
- Mathematics as of 1700 : The transformation of mathematics ; Mathematics and science ; Communication among mathematicians ; The prospects for the eighteenth century
- Calculus in the eighteenth century : Introduction ; The function concept ; The technique of integration and complex quantities ; Elliptic integrals ; Further special functions ; The calculus of functions of several variables ; The attempts to supply rigor in the calculus
- Infinite series : Introduction ; Initial work on infinite series ; The expansion of functions ; The manipulation of series ; Trigonometric series ; Continued fractions ; The problem of convergence and divergence
- Ordinary differential equations in the eighteenth century : Motivations ; First order ordinary differential equations ; Singular solutions ; Second order equations and the Riccati equations ; Higher order equations ; The method of series ; Systems of differential equations ; Summary
- Partial differential equations in the eighteenth century : Introduction ; The wave equation ; Extensions of the wave equation ; Potential theory ; First order partial differential equations ; Monge and the theory of characteristics ; Monge and nonlinear second order equations ; Systems of first order partial differential equations ; The rise of the mathematical subject
- Analytic and differential geometry in the eighteenth century : Introduction ; Basic analytical geometry ; Higher plane curves ; The beginnings of differential geometry ; Plane curves ; Space curves ; The theory of surfaces ; The mapping problem
- The calculus of variations in the eighteenth century : The initial problems ; The early work of Euler ; The principle of least action ; The methodology of Lagrange ; Lagrange and least action ; The second variation
- Algebra in the eighteenth century : Status of the number system ; The theory of equations ; Determinants and elimination theory ; The theory of numbers
- Mathematics as of 1800 : The rise of analysis ; The motivation for the eighteenth-century work ; The problem of proof ; The metaphysical basis ; The expansion of mathematical activity ; A glance ahead
- Functions of a complex variable : Introduction ; the beginnings of complex function theory ; The geometrical representation of complex numbers ; The foundation of complex function theory ; Weierstrass's approach to function theory ; Elliptic functions ; Hyperelliptic integrals and Abel's theorem ; Riemann and multiple-valued functions ; Abelian integrals and functions ; Conformal mapping ; The representation of functions and exceptional values
- Partial differential equations in the nineteenth century : Introduction ; The head equation and Fourier series ; Closed solutions; the Fourier integral ; The potential equation and Green's theorem ; Curvilinear coordinates ; The wave equation and the reduced wave equation ; Systems of partial differential equations ; Existence theorems
- Ordinary differential equations in the nineteenth century : Introduction ; Series solutions and special functions ; Sturm-Liouville theory ; Existence theorems ; The theory of singularities ; Automorphic functions ; Hill's work on periodic solutions of linear equations ; Nonlinear differential equations: the qualitative theory
- The calculus of variations in the nineteenth century : Introduction ; Mathematical physics and the calculus of variations ; Mathematical extensions of the calculus of variations proper ; Related problems in the calculus of variations
- Galois theory : Introduction ; Binominal equations ; Abel's work on the solution of equations by radicals ; Galois's theory of solvability ; The geometric construction problems ; The theory of substitution groups
- Quaternions, vectors, and linear associative algebras : The foundation of algebra on permanence of form ; The search for a three-dimensional "complex number" ; The nature of quaternions ; Grassman's calculus of extension ; From quaternions to vectors ; Linear associative algebras
- Determinants and matrices : Introduction ; Some new uses of determinants ;
- Determinants and quadratic forms ; Matrices
- The theory of numbers in the nineteenth century : Introduction ; The theory of congruences ; Algebraic numbers ; The ideals of Dedekind ; The theory of forms ; Analytic number theory
- The revival of projective geometry : The renewal of interest in geometry ; Synthetic Euclidean geometry ; The revival of synthetic projective geometry ; Algebraic projective geometry ; Higher plane curves and surfaces
- Non-Euclidean geometry : Introduction ; The status of Euclidean geometry about 1800 ; The research on the parallel axiom ; Foreshadowings of non-Euclidean geometry ; The creation of non-Euclidean geometry ; The technical content of non-Euclidean geometry ; The claims of Lobatchevsky and Bolyai to priority ; The implications of non-Euclidean geometry
- The differential geometry of Gauss and Riemann : Introduction ; Gauss's differential geometry ; Riemann's approach to geometry ; The successors of Riemann ; Invariants of differential forms
- Projective and metric geometry : Introduction ; Surfaces as models of non-Euclidean geometry ; Projective and metric geometry ; Models and the consistency problem ; Geometry from the transformation viewpoint ; The reality of non-Euclidean geometry
- Algebraic geometry : Background ; The theory of algebraic invariants ; The concept of birational transformations ; The function-theoretic approach to algebraic geometry ; The uniformization problem ; The algebraic-geometric approach ; The arithmetic appr