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Book Cover
E-book
Author Krantz, Steven G. (Steven George), 1951- author.

Title A mathematical odyssey : journey from the real to the complex / Steven G. Krantz, Harold R. Parks
Published New York : Springer, [2014]
©2014

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Description 1 online resource (xvi, 382 pages) : illustrations (some color)
Contents Preface; Contents; 1 The Four-Color Problem; 1.1 Humble Beginnings; 1.2 Kempe, Heawood, and the Chromatic Number; 1.3 Heawood's Estimate Confirmed; 1.4 Appel, Haken, and a Computer-Aided Proof; A Look Back; References and Further Reading; 2 The Mathematics of Finance; 2.1 Ancient Mathematics of Finance; 2.2 Loans and Charging Interest; 2.3 Compound Interest; 2.4 Continuously Compounded Interest; 2.5 Raising Capital: Stocks and Bonds; 2.6 The Standard Model for Stock Prices; 2.7 Parameters in the Standard Model; 2.8 Derivatives; 2.9 Pricing a Forward; 2.10 Arbitrage; 2.11 Call Options
2.12 Value of a Call Option at Expiry2.13 Pricing a Call Option Using a Replicating Portfolio: A Single Time Step; 2.14 Pricing a Call Option Using a Replicating Portfolio: Multiple Time Steps; 2.15 Black-Scholes Option Pricing; A Look Back; References and Further Reading; 3 Ramsey Theory; 3.1 Introduction; 3.2 The Pigeonhole Principle; 3.3 The Happy End Problem; 3.4 Relationship Tables and Ramsey's Theorem for Pairs; 3.5 Ramsey's Theorem in General; A Look Back; References and Further Reading; 4 Dynamical Systems; 4.1 Introduction; 4.2 Creation of the Mandelbrot Set
4.2.1 Pseudo-Code to Generate the Mandelbrot Set4.3 Staircase Representation of a One-Dimensional DynamicalSystem; 4.3.1 The Use of the Pocket Calculator; 4.4 A Little Physics; 4.4.1 Poincaré and the Three-Body Problem; 4.4.2 Lorenz and Chaos; 4.5 The Cantor Set as a Fractal; Self-Similarity; 4.6 Higher-Dimensional Versions of the Cantor Set; 4.6.1 The Sierpiński Triangle; A Look Back; References and Further Reading; 5 The Plateau Problem; 5.1 Paths That Minimize Length; 5.2 Surfaces That Minimize Area; 5.3 Curvature of a Plane Curve; 5.4 Curvature of a Surface
5.5 Curvature of Minimal Surfaces5.6 Plateau's Observations; 5.7 Types of Spanning Surfaces; 5.8 The Enneper-Weierstrass Formula; 5.8.1 Costa's Surface; 5.9 Solutions by Douglas and Radó; 5.10 Surfaces Beyond Disc Type; 5.11 Currents; 5.12 Regularity Theory; 5.13 Plateau's Rules; A Look Back; References and Further Reading; 6 Euclidean and Non-Euclidean Geometries; 6.1 The Concept of Euclidean Geometry; 6.2 A Review of the Geometry of Triangles; 6.3 Some Essential Properties of Euclidean Geometry; 6.4 What is Non-Euclidean Geometry?; 6.5 Spherical Geometry; 6.6 Neutral Geometry
6.7 Hyperbolic Geometry6.7.1 The Question of Consistency; 6.7.2 Models of Hyperbolic Geometry; A Look Back; References and Further Reading; 7 Special Relativity; 7.1 Introduction; 7.2 Principles Underlying Special Relativity; 7.3 Some Consequences of Special Relativity; 7.4 Momentum and Energy; 7.4.1 Vector Quantities; 7.4.2 Vectors in Relativity; 7.4.3 Relativistic Momentum; 7.4.4 Rest Mass; A Look Back; References and Further Reading; 8 Wavelets in Our World; 8.1 Introductory Ideas; 8.2 Fourier's Ideas; 8.3 Enter Wavelets; 8.4 What Are Wavelets Good for?; 8.5 Key Players in the Wavelet Saga
Summary Mathematics is a poem. It is a lucid, sensual, precise exposition of beautiful ideas directed to specific goals. It is worthwhile to have as broad a cross-section of mankind as possible be conversant with what goes on in mathematics. Just as everyone knows that the Internet is a powerful and important tool for communication, so everyone should know that the Poincaré conjecture gives us important information about the shape of our universe. Just as every responsible citizen realizes that the mass-production automobile was pioneered by Henry Ford, just so everyone should know that the P/NP problem has implications for security and data manipulation that will affect everyone. This book endeavors to tell the story of the modern impact of mathematics, of its trials and triumphs and insights, in language that can be appreciated by a broad audience. It endeavors to show what mathematics means for our lives, how it impacts all of us, and what new thoughts it should cause us to entertain. It introduces new vistas of mathematical ideas and shares the excitement of new ideas freshly minted. It discusses the significance and impact of these ideas, and gives them meaning that will travel well and cause people to reconsider their place in the universe. Mathematics is one of mankind's oldest disciplines. Along with philosophy, it has shaped the very modus of human thought. And it continues to do so. To be unaware of modern mathematics is to be miss out on a large slice of life. It is to be left out of essential modern developments. We want to address this point, and do something about it. This is a book to make mathematics exciting for people of all interests and all walks of life. Mathematics is exhilarating, it is ennobling, it is uplifting, and it is fascinating. We want to show people this part of our world, and to get them to travel new paths
Analysis wiskunde
mathematics
geschiedenis
history
wetenschap
science
toegepaste wiskunde
applied mathematics
Mathematics (General)
Wiskunde (algemeen)
Bibliography Includes bibliographical references and index
Notes English
Online resource; title from PDF title page (SpringerLink, viewed May 14, 2014)
Subject Mathematics -- Popular works
Mathematics -- History
MATHEMATICS -- Essays.
MATHEMATICS -- Pre-Calculus.
MATHEMATICS -- Reference.
Mathematics.
Genre/Form History.
Popular works.
Form Electronic book
Author Parks, Harold R., 1949- author.
ISBN 9781461489399
1461489393
1461489385
9781461489382