Mathematical logic grew out of philosophical questions regarding the foundations of mathematics, but logic has now outgrown its philosophical roots, and has become an integral part of mathematics in general. This book is designed for students who plan to specialize in logic, as well as for those who are interested in the applications of logic to other areas of mathematics. Used as a text, it could form the basis of a beginning graduate-level course. There are three main chapters: Set Theory, Model Theory, and Recursion Theory. The Set Theory chapter describes the set-theoretic foundations of all of mathematics, based on the ZFC axioms. It also covers technical results about the Axiom of Choice, well-orderings, and the theory of uncountable cardinals. The Model Theory chapter discusses predicate logic and formal proofs, and covers the Completeness, Compactness, and L?wenheim-Skolem Theorems, elementary submodels, model completeness, and applications to algebra. This chapter also continues the foundational issues begun in the set theory chapter. Mathematics can now be viewed as formal proofs from ZFC. Also, model theory leads to models of set theory. This includes a discussion of absoluteness, and an analysis of models such as H(?) and R(?). The Recursion Theory chapter develops some basic facts about computable functions, and uses them to prove a number of results of foundational importance; in particular, Church's theorem on the undecidability of logical consequence, the incompleteness theorems of G?del, and Tarski's theorem on the non-definability of truth.
Author(s): Kenneth Kunen
Series: Studies in Logic: Mathematical Logic and Foundations 19
Publisher: College Publications
Year: 2009
Language: English
Pages: 262
Cover......Page cover_1.djvu
Front Matter......Page _005.djvu
Contents......Page _006.djvu
Preface......Page _008.djvu
0 Introduction ......Page 001.djvu
1 Set Theory ......Page 009.djvu
2 Model Theory and Proof Theory ......Page 086.djvu
3 The Philosophy of Mathematics......Page 186.djvu
4 Recursion Theory......Page 195.djvu
Bibliography......Page 245.djvu
Back Cover......Page cover_2.djvu