Mathematical Logic: Part 2 - René Cori, Daniel Lascar

Mathematical Logic: Part 2

Recursion Theory, Godel's Theorems, Set Theory, Model Theory
Buch | Softcover
352 Seiten
2001
Oxford University Press (Verlag)
978-0-19-850050-6 (ISBN)
119,95 inkl. MwSt
The requirement to reason logically forms the basis of all mathematics, and hence mathematical logic is one of the most fundamental topics that students will study. Assuming no prior knowledge of the topic, this book provides an accessible introduction for advanced undergraduate students.
Logic forms the basis of mathematics, and is hence a fundamental part of any mathematics course. It is a major element in theoretical computer science and has undergone a huge revival with the every- growing importance of computer science. This text is based on a course to undergraduates and provides a clear and accessible introduction to mathematical logic. The concept of model provides the underlying theme, giving the text a theoretical coherence whilst still covering a wide area of logic. The foundations having been laid in Part I, this book starts with recursion theory, a topic essential for the complete scientist. Then follows Godel's incompleteness theorems and axiomatic set theory. Chapter 8 provides an introduction to model theory. There are examples throughout each section, and varied selection of exercises at the end. Answers to the exercises are given in the appendix.

Contents of Part I ; Notes from the translator ; Notes to the reader ; Introduction ; 5. Recursion theory ; 5.1 Primitive recursive functions and sets ; 5.2 Recursive functions ; 5.3 Turing machines ; 5.4 Recursively enumerable sets ; 5.5 Exercises for Chapter 5 ; 6. Formalization of arithmetic, Godel's theorems ; 6.1 Peano's axioms ; 6.2 Representable functions ; 6.3 Arithmetization of syntax ; 6.4 Incompleteness and undecidability theorem ; 7. Set theory ; 7.1 The theories Z and ZF ; 7.2 Ordinal numbers and integers ; 7.3 Inductive proofs and definitions ; 7.4 Cardinality ; 7.5 The axiom of foundation and the reflections schemes ; 7.6 Exercises for Chapter 7 ; 8. Some model theory ; 8.1 Elementary substructures and extensions ; 8.2 Construction of elementary extensions ; 8.3 The interpolation and definability theorems ; 8.4 Reduced products and ultraproducts ; 8.5 Preservations theorems ; 8.6 -categorical theories ; 8.7 Exercises for Chapter 8 ; Solutions to the exercises of Part II ; Chapter 5 ; Chapter 6 ; Chapter 7 ; Chapter 8 ; Bibliography ; Index

Erscheint lt. Verlag 12.4.2001
Reihe/Serie Mathematical Logic
Übersetzer Donald Pelletier
Verlagsort Oxford
Sprache englisch
Maße 156 x 234 mm
Gewicht 501 g
Themenwelt Mathematik / Informatik Mathematik Logik / Mengenlehre
ISBN-10 0-19-850050-5 / 0198500505
ISBN-13 978-0-19-850050-6 / 9780198500506
Zustand Neuware
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