Mathematics Form and Function: With 116 Illustrations - Softcover

MacLane, Saunders

 
9781461293408: Mathematics Form and Function: With 116 Illustrations
Softcover
ISBN 10: 1461293405 ISBN 13: 9781461293408
Verlag: Springer, 2011

Inhaltsangabe

I Origins of Formal Structure.- 1. The Natural Numbers.- 2. Infinite Sets.- 3. Permutations.- 4. Time and Order.- 5. Space and Motion.- 6. Symmetry.- 7. Transformation Groups.- 8. Groups.- 9. Boolean Algebra.- 10. Calculus, Continuity, and Topology.- 11. Human Activity and Ideas.- 12. Mathematical Activities.- 13. Axiomatic Structure.- II From Whole Numbers to Rational Numbers.- 1. Properties of Natural Numbers.- 2. The Peano Postulates.- 3. Natural Numbers Described by Recursion.- 4. Number Theory.- 5. Integers.- 6. Rational Numbers.- 7. Congruence.- 8. Cardinal Numbers.- 9. Ordinal Numbers.- 10. What Are Numbers?.- III Geometry.- 1. Spatial Activities.- 2. Proofs without Figures.- 3. The Parallel Axiom.- 4. Hyperbolic Geometry.- 5. Elliptic Geometry.- 6. Geometric Magnitude.- 7. Geometry by Motion.- 8. Orientation.- 9. Groups in Geometry.- 10. Geometry by Groups.- 11. Solid Geometry.- 12. Is Geometry a Science?.- IV Real Numbers.- 1. Measures of Magnitude.- 2. Magnitude as a Geometric Measure.- 3. Manipulations of Magnitudes.- 4. Comparison of Magnitudes.- 5. Axioms for the Reals.- 6. Arithmetic Construction of the Reals.- 7. Vector Geometry.- 8. Analytic Geometry.- 9. Trigonometry.- 10. Complex Numbers.- 11. Stereographic Projection and Infinity.- 12. Are Imaginary Numbers Real?.- 13. Abstract Algebra Revealed.- 14. The Quaternions-and Beyond.- 15. Summary.- V Functions, Transformations, and Groups.- 1. Types of Functions.- 2. Maps.- 3. What Is a Function?.- 4. Functions as Sets of Pairs.- 5. Transformation Groups.- 6. Groups.- 7. Galois Theory.- 8. Constructions of Groups.- 9. Simple Groups.- 10. Summary: Ideas of Image and Composition.- VI Concepts of Calculus.- 1. Origins.- 2. Integration.- 3. Derivatives.- 4. The Fundamental Theorem of the Integral Calculus.- 5. Kepler's Laws and Newton's Laws.- 6. Differential Equations.- 7. Foundations of Calculus.- 8. Approximations and Taylor's Series.- 9. Partial Derivatives.- 10. Differential Forms.- 11. Calculus Becomes Analysis.- 12. Interconnections of the Concepts.- VII Linear Algebra.- 1. Sources of Linearity.- 2. Transformations versus Matrices.- 3. Eigenvalues.- 4. Dual Spaces.- 5. Inner Product Spaces.- 6. Orthogonal Matrices.- 7. Adjoints.- 8. The Principal Axis Theorem.- 9. Bilinearity and Tensor Products.- 10. Collapse by Quotients.- 11. Exterior Algebra and Differential Forms.- 12. Similarity and Sums.- 13. Summary.- VIII Forms of Space.- 1. Curvature.- 2. Gaussian Curvature for Surfaces.- 3. Arc Length and Intrinsic Geometry.- 4. Many-Valued Functions and Riemann Surfaces.- 5. Examples of Manifolds.- 6. Intrinsic Surfaces and Topological Spaces.- 7. Manifolds.- 8. Smooth Manifolds.- 9. Paths and Quantities.- 10. Riemann Metrics.- 11. Sheaves.- 12. What Is Geometry?.- IX Mechanics.- 1. Kepler's Laws.- 2. Momentum, Work, and Energy.- 3. Lagrange's Equations.- 4. Velocities and Tangent Bundles.- 5. Mechanics in Mathematics.- 6. Hamilton's Principle.- 7. Hamilton's Equations.- 8. Tricks versus Ideas.- 9. The Principal Function.- 10. The Hamilton-Jacobi Equation.- 11. The Spinning Top.- 12. The Form of Mechanics.- 13. Quantum Mechanics.- X Complex Analysis and Topology.- 1. Functions of a Complex Variable.- 2. Pathological Functions.- 3. Complex Derivatives.- 4. Complex Integration.- 5. Paths in the Plane.- 6. The Cauchy Theorem.- 7. Uniform Convergence.- 8. Power Series.- 9. The Cauchy Integral Formula.- 10. Singularities.- 11. Riemann Surfaces.- 12. Germs and Sheaves.- 13. Analysis, Geometry, and Topology.- XI Sets, Logic, and Categories.- 1. The Hierarchy of Sets.- 2. Axiomatic Set Theory.- 3. The Propositional Calculus.- 4. First Order Language.- 5. The Predicate Calculus.- 6. Precision and Understanding.- 7. Gödel Incompleteness Theorems.- 8. Independence Results.- 9. Categories and Functions.- 10. Natural Transformations.- 11. Universals.- 12. Axioms on Functions.- 13. Intuitionistic Logic.- 14. Independence by Means of Sheaves.- 15. Foundation or

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Über die Autorin bzw. den Autor

Biography of Saunders Mac Lane Saunders Mac Lane was born on August 4, 1909 in Connecticut. He studied at Yale University and then at the University of Chicago and at Göttingen, where he received the D.Phil. in 1934. He has tought at Harvard, Cornell and the University of Chicago. Mac Lane's initial research was in logic and in algebraic number theory (valuation theory). With Samuel Eilenberg he published fifteen papers on algebraic topology. A number of them involved the initial steps in the cohomology of groups and in other aspects of homological algebra - as well as the discovery of category theory. His famous and undergraduate textbook Survey of modern algebra, written jointly with G. Birkhoff, has remained in print for over 50 years. Mac Lane is also the author of several other highly successful books.

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Verlag
Springer
Erscheinungsdatum
2011
Sprache
Englisch
ISBN 10 
1461293405
ISBN 13 
9781461293408
Einband
Taschenbuch
Anzahl der Seiten
492
Kontakt zum Hersteller
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Poststr. 9
Darmstadt
64293
Deutschland

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