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Best set theory pinter
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Best set theory pinter reviews
1. A Book of Set Theory (Dover Books on Mathematics)
Description
Suitable for upper-level undergraduates, this accessible approach to set theory poses rigorous but simple arguments. Each definition is accompanied by commentary that motivates and explains new concepts. Starting with a repetition of the familiar arguments of elementary set theory, the level of abstract thinking gradually rises for a progressive increase in complexity.A historical introduction presents a brief account of the growth of set theory, with special emphasis on problems that led to the development of the various systems of axiomatic set theory. Subsequent chapters explore classes and sets, functions, relations, partially ordered classes, and the axiom of choice. Other subjects include natural and cardinal numbers, finite and infinite sets, the arithmetic of ordinal numbers, transfinite recursion, and selected topics in the theory of ordinals and cardinals. This updated edition features new material by author Charles C. Pinter.
2. Axiomatic Set Theory (Dover Books on Mathematics)
Description
One of the most pressingproblems of mathematics over the last hundred years has been the question: What is a number? One of the most impressive answers has been the axiomatic development of set theory. The question raised is: "Exactly what assumptions, beyond those of elementary logic, are required as a basis for modern mathematics?" Answering this question by means of the Zermelo-Fraenkel system, Professor Suppes' coverage is the best treatment of axiomatic set theory for the mathematics student on the upper undergraduate or graduate level.
The opening chapter covers the basic paradoxes and the history of set theory and provides a motivation for the study. The second and third chapters cover the basic definitions and axioms and the theory of relations and functions. Beginning with the fourth chapter, equipollence, finite sets and cardinal numbers are dealt with. Chapter five continues the development with finite ordinals and denumerable sets. Chapter six, on rational numbers and real numbers, has been arranged so that it can be omitted without loss of continuity. In chapter seven, transfinite induction and ordinal arithmetic are introduced and the system of axioms is revised. The final chapter deals with the axiom of choice. Throughout, emphasis is on axioms and theorems; proofs are informal. Exercises supplement the text. Much coverage is given to intuitive ideas as well as to comparative development of other systems of set theory. Although a degree of mathematical sophistication is necessary, especially for the final two chapters, no previous work in mathematical logic or set theory is required.
For the student of mathematics, set theory is necessary for the proper understanding of the foundations of mathematics. Professor Suppes in Axiomatic Set Theory provides a very clear and well-developed approach. For those with more than a classroom interest in set theory, the historical references and the coverage of the rationale behind the axioms will provide a strong background to the major developments in the field. 1960 edition.
3. General Topology (Dover Books on Mathematics)
Description
4. A Friendly Introduction to Group Theory: 2nd Edition
Description
This book is a friendlier, more colloquial textbook for a one-semester course in Abstract Algebra in a liberal arts setting. It would also provide a nice supplement for a more advanced course or an excellent resource for an independent learner hoping to become familiar with group theory. The textbook covers introductory group theory with an overarching goal of classifying small finite groups. It starts with a chapter of preliminary background material (set theory, basic number theory, induction, etc.) before introducing groups. The rest of the second edition builds up the basic notions and creates a bank of nice examples before proceeding on to more advanced topics. Those topics include: subgroups, quotient groups, decompositions of groups, group homomorphisms, isomorphisms, automorphism groups, p-groups, the Fundamental Theorem of Finite Abelian Groups, group actions, conjugation, Sylow subgroups and the Sylow theorems. The second edition adds over 75 pages of new material with an entirely new chapter, several new sections, and additional examples and exposition throughout. There are also almost 200 new exercises and an index to help you find what you are looking for. For sample pages, and additional information, please see: https://web.lemoyne.edu/nashd/textbook.html5. A Book of Abstract Algebra: Second Edition (Dover Books on Mathematics)
Feature
Dover PublicationsDescription
An introductory chapter traces concepts of abstract algebra from their historical roots. Succeeding chapters avoid the conventional format of definition-theorem-proof-corollary-example; instead, they take the form of a discussion with students, focusing on explanations and offering motivation. Each chapter rests upon a central theme, usually a specific application or use. The author provides elementary background as needed and discusses standard topics in their usual order. He introduces many advanced and peripheral subjects in the plentiful exercises, which are accompanied by ample instruction and commentary and offer a wide range of experiences to students at different levels of ability.
6. Set theory (Korean Edition)
Description
Set theoryThis book has been written for junior and senior students for mathematics; It is intended as a basic text for one-semester courses in set theory or the foundations of mathematics. My chief concern has been that the work has been made to relatively unsophisticated students.
7. Literature for Children: A Short Introduction (5th Edition)
