Beyond First Order Model Theory, Volume II
Title | Beyond First Order Model Theory, Volume II PDF eBook |
Author | Jose Iovino |
Publisher | CRC Press |
Pages | 596 |
Release | 2023-07-03 |
Genre | Mathematics |
ISBN | 042955866X |
Model theory is the meta-mathematical study of the concept of mathematical truth. After Afred Tarski coined the term Theory of Models in the early 1950’s, it rapidly became one of the central most active branches of mathematical logic. In the last few decades, ideas that originated within model theory have provided powerful tools to solve problems in a variety of areas of classical mathematics, including algebra, combinatorics, geometry, number theory, and Banach space theory and operator theory. The two volumes of Beyond First Order Model Theory present the reader with a fairly comprehensive vista, rich in width and depth, of some of the most active areas of contemporary research in model theory beyond the realm of the classical first-order viewpoint. Each chapter is intended to serve both as an introduction to a current direction in model theory and as a presentation of results that are not available elsewhere. All the articles are written so that they can be studied independently of one another. This second volume contains introductions to real-valued logic and applications, abstract elementary classes and applications, interconnections between model theory and function spaces, nonstucture theory, and model theory of second-order logic. Features A coherent introduction to current trends in model theory. Contains articles by some of the most influential logicians of the last hundred years. No other publication brings these distinguished authors together. Suitable as a reference for advanced undergraduate, postgraduates, and researchers. Material presented in the book (e.g, abstract elementary classes, first-order logics with dependent sorts, and applications of infinitary logics in set theory) is not easily accessible in the current literature. The various chapters in the book can be studied independently.
Introduction to Model Theory
Title | Introduction to Model Theory PDF eBook |
Author | Philipp Rothmaler |
Publisher | CRC Press |
Pages | 324 |
Release | 2018-12-07 |
Genre | Mathematics |
ISBN | 0429668503 |
Model theory investigates mathematical structures by means of formal languages. So-called first-order languages have proved particularly useful in this respect. This text introduces the model theory of first-order logic, avoiding syntactical issues not too relevant to model theory. In this spirit, the compactness theorem is proved via the algebraically useful ultrsproduct technique (rather than via the completeness theorem of first-order logic). This leads fairly quickly to algebraic applications, like Malcev's local theorems of group theory and, after a little more preparation, to Hilbert's Nullstellensatz of field theory. Steinitz dimension theory for field extensions is obtained as a special case of a much more general model-theoretic treatment of strongly minimal theories. There is a final chapter on the models of the first-order theory of the integers as an abelian group. Both these topics appear here for the first time in a textbook at the introductory level, and are used to give hints to further reading and to recent developments in the field, such as stability (or classification) theory.
A Shorter Model Theory
Title | A Shorter Model Theory PDF eBook |
Author | Wilfrid Hodges |
Publisher | Cambridge University Press |
Pages | 322 |
Release | 1997-04-10 |
Genre | Mathematics |
ISBN | 9780521587136 |
This is an up-to-date textbook of model theory taking the reader from first definitions to Morley's theorem and the elementary parts of stability theory. Besides standard results such as the compactness and omitting types theorems, it also describes various links with algebra, including the Skolem-Tarski method of quantifier elimination, model completeness, automorphism groups and omega-categoricity, ultraproducts, O-minimality and structures of finite Morley rank. The material on back-and-forth equivalences, interpretations and zero-one laws can serve as an introduction to applications of model theory in computer science. Each chapter finishes with a brief commentary on the literature and suggestions for further reading. This book will benefit graduate students with an interest in model theory.
A Course in Model Theory
Title | A Course in Model Theory PDF eBook |
Author | Bruno Poizat |
Publisher | Springer Science & Business Media |
Pages | 472 |
Release | 2012-12-06 |
Genre | Mathematics |
ISBN | 1441986227 |
Translated from the French, this book is an introduction to first-order model theory. Starting from scratch, it quickly reaches the essentials, namely, the back-and-forth method and compactness, which are illustrated with examples taken from algebra. It also introduces logic via the study of the models of arithmetic, and it gives complete but accessible exposition of stability theory.
Elements of Finite Model Theory
Title | Elements of Finite Model Theory PDF eBook |
Author | Leonid Libkin |
Publisher | Springer Science & Business Media |
Pages | 320 |
Release | 2013-03-09 |
Genre | Mathematics |
ISBN | 3662070030 |
Emphasizes the computer science aspects of the subject. Details applications in databases, complexity theory, and formal languages, as well as other branches of computer science.
Model Theory
Title | Model Theory PDF eBook |
Author | C.C. Chang |
Publisher | Courier Corporation |
Pages | 674 |
Release | 2013-10-03 |
Genre | Mathematics |
ISBN | 0486310957 |
This bestselling textbook for higher-level courses was extensively revised in 1990 to accommodate developments in model theoretic methods. Topics include models constructed from constants, ultraproducts, and saturated and special models. 1990 edition.
Model Theory for Beginners. 15 Lectures
Title | Model Theory for Beginners. 15 Lectures PDF eBook |
Author | Roman Kossak |
Publisher | |
Pages | 152 |
Release | 2021-02-10 |
Genre | |
ISBN | 9781848903616 |
This book presents an introduction to model theory in 15 lectures. It concentrates on several key concepts: first-order definability, classification of complete types, elementary extensions, categoricity, automorphisms, and saturation; all illustrated with examples that require neither advanced alegbra nor set theory. A full proof of the compactness theorem for countable languages and its applications are given, followed by a discussion of the Ehrefeucht-Mostowski technique for constructing models admitting automorphisms. Additional topics include recursive saturation, nonstandard models of arithmetic, Abraham Robinson's model-theoretic proof of Tarski's theorem on undefinability of truth, and the proof of the Infinite Ramsey Theorem using an elementary extension of the standard model of arithmetic.