Axiom of Choice

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Springer Science & Business Media, 11 de maig 2006 - 194 pàgines
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AC, the axiom of choice, because of its non-constructive character, is the most controversial mathematical axiom, shunned by some, used indiscriminately by others. This treatise shows paradigmatically that:

- Disasters happen without AC: Many fundamental mathematical results fail (being equivalent in ZF to AC or to some weak form of AC).

- Disasters happen with AC: Many undesirable mathematical monsters are being created (e.g., non measurable sets and undeterminate games).

- Some beautiful mathematical theorems hold only if AC is replaced by some alternative axiom, contradicting AC (e.g., by AD, the axiom of determinateness).

Illuminating examples are drawn from diverse areas of mathematics, particularly from general topology, but also from algebra, order theory, elementary analysis, measure theory, game theory, and graph theory.

 

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Continguts

Origins
1
11 Hilberts First Problem
2
Choice Principles
9
22 Some Concepts Related to the Axiom of Choice
13
Elementary Observations
21
32 Unnecessary Choice
27
Compactness
32
Disasters without Choice
43
Function Spaces The Ascoli Theorem
95
The Baire Category Theorem
102
Coloring Problems
109
Disasters with Choice
117
Paradoxical Decompositions
126
Disasters either way
137
Beauty without Choice
143
72 Measurability The Axiom of Determinateness
150

42 Disasters in Cardinal Arithmetic
51
43 Disasters in Order Theory
56
Vector Spaces
66
Categories
71
The Reals and Continuity
72
Countable Sums
79
Products The Tychonoff and the ČechStone Theorem
85
Models
158
References
169
Selected Books and Longer Articles
181
List of Symbols
183
List of Axioms
185
Index
188
Copyright

Altres edicions - Mostra-ho tot

Axiom of Choice
Horst Herrlich
Previsualització limitada - 2006

Frases i termes més freqüents

AC(R accumulation point Alexandroff–Urysohn–compact algebra Ascoli Theorem Axiom of Choice Baire Category Theorem Banach–Tarski Paradox bijection Boolean Cantor cubes CC(R compact Hausdorff spaces compact spaces Consider converges Countable products Countable sums countable union D-finite sets D-infinite D–finite defined Definition dense different Disaster discrete space element Exercises to Section exists a sequence finite subset following conditions free ultrafilter function f graph G iff implies infinite injective lattice Lebesgue measure Let f linear linearly ordered map f Math maximal filter metric spaces n–colorable natural numbers non-empty sets open cover ordered set pairwise disjoint products of compact proof of Theorem Proposition pseudometric space real numbers resp satisfies second countable second player sequence xn sequentially compact Show the equivalence spaces are Baire spaces are compact topological space totally bounded Tychonoff Theorem Tychonoff–compact underlying set vector space well–orderable well–ordered winning strategy

Informació bibliogràfica

QR code for Axiom of Choice
TítolAxiom of Choice
Axiom of Choice, Horst Herrlich
Edició 1876 de Lecture Notes in Mathematics
Lecture notes in mathematics Berlin: Mathematical biosciences subseries
AutorHorst Herrlich
Edicióil·lustrada
EditorSpringer Science & Business Media, 2006
ISBN3540309896, 9783540309895
Nre. de pàgines194 pàgines
  
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