Mathematics and the Real World (74 page)
Read Mathematics and the Real World Online
Authors: Zvi Artstein
perfect solids (a.k.a. Platonic bodies),
74
,
103
,
169
,
360
photons,
188
Planck's constant,
161
Platonism,
75
Plimpton 322 (potsherd),
43
Poggendorff illusion,
65
Poincaré's conjecture,
351
,
353
,
357
polynomial rate,
295
positron,
166
principle of least action,
122
,
149
,
174
probabilistic algorithms,
299
probability function,
211
proton,
160
public-key cryptology,
303
Pythagorean triplets,
44
quantum computers,
311
quantum theory,
164
quarks,
170
rational expectations,
229
relativity
general,
155
special,
151
,
153
theory of,
142
Renaissance,
91
revealed preferences,
258
RGB (color system),
134
Rhind papyrus (a.k.a. Ahmes papyrus),
47
rigor,
39
RSA (encryption method),
304
Russell's paradox,
333
St. Petersburg paradox,
200
,
257
sample space,
211
Schrödinger's equation,
162
,
170
self-similarity,
176
slide rule,
282
social choice,
239
spin,
166
squaring the circle,
56
stable marriage (a.k.a. stable matching),
233
statistical mechanics,
134
strategies in equilibrium,
246
dominant,
246
mixed,
251
string theory,
171
SU(3) group,
168
sunspots,
231
syllogisms,
59
syllogistic fallacies,
61
tali,
185
tangent,
318
thinking,
343
by comparison,
344
creative,
344
mathematical,
383
trisecting an angle,
56
Turing machine,
291
Turing's test,
306
types, theory of,
334
uncertainty principle,
165
utility,
255
expected,
255
von Neumann–Morgenstern,
257
value of a game,
251
Watt regulator,
365
wave equation,
124
Weizac (computer),
287
Zermelo-Fraenkel axioms,
335
,
339
,
340
Photo by Raanan Michael
ZVI ARTSTEIN is the Hettie H. Heineman Professor of Mathematics at The Weizmann Institute of Science, where he has worked for over thirty-eight years as a scientist, a teacher, and an administrator. He is the author of more than 120 scientific articles published in peer-reviewed journals.
Table of Contents
Chapter I. Evolution, Mathematics, and the Evolution of Mathematics
1. Evolution
2. Mathematical Ability in the Animal World
3. Mathematical Ability in Humans
4. Mathematics that Yields Evolutionary Advantage
5. Mathematics with no Evolutionary Advantage
6. Mathematics in Early Civilizations
7. And then Came the Greeks
8. What Motivated the Greeks?
Chapter II. Mathematics and the Greeks’ View of the World
9. The Origin of Basic Science: Asking Questions
10. The First Mathematical Models
11. Platonism versus Formalism
12. Models of the Heavenly Bodies
13. On the Greek Perception of Science
14. Models of the Heavenly Bodies (Cont.)
Chapter III. Mathematics and the View of the World in Early Modern Times
15. The Sun Reverts to the Center
16. Giants’ Shoulders
17. Ellipses versus Circles
18. And then Came Newton
19. Everything you Wanted to know about Infinitesimal Calculus and Differential Equations
20. Newton's Laws
21. Purpose: The Principle of Least Action
22. The Wave Equation
23. On the Perception of Science in Modern Times
Chapter IV. Mathematics and the Modern View of the World
24. Electricity and Magnetism
25. And then Came Maxwell
26. Discrepancy between Maxwell's Theory and Newton's Theory
27. The Geometry of the World
28. And then Came Einstein
29. The Discovery of the Quantum State of Nature
30. The Wonder Equation
31. Groups of Particles