Notes on Set Theory [recurso electrónico] /
by Yiannis Moschovakis.
- Second Edition.
- XII, 284 p. 48 illus. online resource.
- Undergraduate Texts in Mathematics, 0172-6056 .
- Undergraduate Texts in Mathematics, .
Equinumerosity -- Paradoxes and Axioms -- Are Sets All There is? -- The Natural Numbers -- Fixed Points -- Well Ordered Sets -- Choices -- Choice's Consequences -- Baire Space -- Replacement and Other Axioms -- Ordinal Numbers.
The axiomatic theory of sets is a vibrant part of pure mathematics, with its own basic notions, fundamental results, and deep open problems. At the same time, it is often viewed as a foundation of mathematics so that in the most prevalent, current mathematical practice "to make a notion precise" simply means "to define it in set theory." This book tries to do justice to both aspects of the subject: it gives a solid introduction to "pure set theory" through transfinite recursion and the construction of the cumulative hierarchy of sets, but it also attempts to explain precisely how mathematical objects can be faithfully modeled within the universe of sets. In this new edition the author added solutions to the exercises, and rearranged and reworked the text in several places to improve the presentation. The book is aimed at advanced undergraduate or beginning graduate mathematics students and at mathematically minded graduate students of computer science and philosophy.
9780387316093 99780387316093
10.1007/0-387-31609-4 doi
MATHEMATICS. COMPUTER SCIENCE. LOGIC, SYMBOLIC AND MATHEMATICAL. MATHEMATICS. MATHEMATICAL LOGIC AND FOUNDATIONS. MATHEMATICAL LOGIC AND FORMAL LANGUAGES.