Fundamentals of Mathematics: Geometry

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Fundamentals of Mathematics represents a new kind of mathematical publication. While excellent technical treatises have been written about specialized fields, they provide little help for the nonspecialist; and other books, some of them semipopular in nature, give an overview of mathematics while omitting some necessary details. Fundamentals of Mathematics strikes a unique balance, presenting an irreproachable treatment of specialized fields and at the same time providing a very clear view of their interrelations, a feature of great value to students, instructors, and those who use mathematics in applied and scientific endeavors. Moreover, as noted in a review of the German edition in Mathematical Reviews, the work is "designed to acquaint [the student] with modern viewpoints and developments. The articles are well illustrated and supplied with references to the literature, both current and 'classical.'" The outstanding pedagogical quality of this work was made possible only by the unique method by which it was written. There are, in general, two authors for each chapter: one a university researcher, the other a teacher of long experience in the German educational system. (In a few cases, more than two authors have collaborated.) And the whole book has been coordinated in repeated conferences, involving altogether about 150 authors and coordinators. Volume I opens with a section on mathematical foundations. It covers such topics as axiomatization, the concept of an algorithm, proofs, the theory of sets, the theory of relations, Boolean algebra, and antinomies. The closing section, on the real number system and algebra, takes up natural numbers, groups, linear algebra, polynomials, rings and ideals, the theory of numbers, algebraic extensions of a fields, complex numbers and quaternions, lattices, the theory of structure, and Zorn's lemma. Volume II begins with eight chapters on the foundations of geometry, followed by eight others on its analytic treatment. The latter include discussions of affine and Euclidean geometry, algebraic geometry, the Erlanger Program and higher geometry, group theory approaches, differential geometry, convex figures, and aspects of topology. Volume III, on analysis, covers convergence, functions, integral and measure, fundamental concepts of probability theory, alternating differential forms, complex numbers and variables, points at infinity, ordinary and partial differential equations, difference equations and definite integrals, functional analysis, real functions, and analytic number theory. An important concluding chapter examines "The Changing Structure of Modern Mathematics."

Author(s): H. Behnke, F. Bachmann, K. Fladt, W. Süss and H. Kunle
Edition: 1
Publisher: MIT Press
Year: 1984

Language: English
Pages: 699
City: Cambridge, Massachusetts
Tags: Geometry

Translator’s Foreword........................................................................................ vii

Preface....................................................................................................... ix



PART A. FOUNDATIONS OF GEOMETRY



CHAPTER 1. Geometry-A Phenomenological Discussion, H. Freudenthal and A. Bauer............................... 3

CHAPTER 2. Points, Vectors, and Reflections, F. Bachmann and J. Boczeck....................................... 29

CHAPTER 3. Affine and Projectire Planes, R. Lingenberg and A. Bauer........................................... 54

CHAPTER 4. Euclidean Planes, J. Diller and J. Boczeck........................................................ 112

CHAPTER 5. Absolute Geometry, F. Bachmann, W. Pejas, H. Wolff, and A. Bauer.................................. 129

CHAPTER 6. The Classical Euclidean and the Classical Hyperbolic Geometry, H. Karzel and E. Ellers............ 174

CHAPTER 7. Geometric Constructions, W. Breidenbach and W. Suss.............................................. 193

CHAPTER 8. Polygons and Polyhedra, J. Gerretsen and P. Verdenduin............................................ 238




PART B. ANALYTIC TREATMENT OF GEOMETRY



CHAPTER 9. Affine and Euclidean Geometry, F. Flohr and F. Raith............................................... 293

CHAPTER 10. From Projective to Euclidean Geometry, G. Pickert, R. Stendor, and M. Hellwich................... 385

CHAPTER 11. Algebraic Geometry, W. Enron and A. Bauer........................................................ 437

CHAPTER 12. Erlanger Program and Higher Geometry, H. Kunle and K. Fladt...................................... 460

CHAPTER 13. Group Theory and Geometry, H. Freudenthal and H.-G. Steiner...................................... 516

CHAPTER 14. Differential Geometry of Curves and Surfaces, W. Suss, H. Gerieke, and K. H. Berger.............. 534

CHAPTER 15. Convex Figures, W. Suss, U. Viet, and K. H. Berger............................................... 572

CHAPTER 16. Aspects of Topology, K. H. Weise and H. Noack.................................................... 593


INDEX........................................................................................................ 671