Mathematical Logic: On Numbers, Sets, Structures, and Symmetry: Springer Graduate Texts in Philosophy, cartea 4
Autor Roman Kossaken Limba Engleză Hardback – 19 apr 2024
Part I, Logic Sets, and Numbers, shows how mathematical logic is used to develop the number structures of classical mathematics. All necessary concepts are introduced exactly as they would be in a course in mathematical logic; but are accompanied by more extensive introductory remarks and examples to motivate formal developments. The second part, Relations, Structures, Geometry, introduces several basic concepts of model theory, such as first-order definability, types, symmetries, and elementary extensions, and shows how they are usedto study and classify mathematical structures. The added Part III to the book is closer to what one finds in standard introductory mathematical textbooks. Definitions, theorems, and proofs that are introduced are still preceded by remarks that motivate the material, but the exposition is more formal, and includes more advanced topics. The focus is on the notion of countable categoricity, which analyzed in detail using examples from the first two parts of the book. This textbook is suitable for graduate students in mathematical logic and set theory and will also be of interest to mathematicians who know the technical aspects of the subject, but are not familiar with its history and philosophical background.
| Toate formatele și edițiile | Preț | Express |
|---|---|---|
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| Springer International Publishing – 19 ian 2019 | 449.15 lei 6-8 săpt. | |
| Hardback (2) | 425.94 lei 38-44 zile | |
| Springer International Publishing – 18 oct 2018 | 425.94 lei 38-44 zile | |
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Specificații
ISBN-13: 9783031562143
ISBN-10: 3031562143
Ilustrații: XVI, 257 p. 29 illus.
Dimensiuni: 155 x 235 mm
Greutate: 0.56 kg
Ediția:2nd ed. 2024
Editura: Springer International Publishing
Colecția Springer
Seria Springer Graduate Texts in Philosophy
Locul publicării:Cham, Switzerland
ISBN-10: 3031562143
Ilustrații: XVI, 257 p. 29 illus.
Dimensiuni: 155 x 235 mm
Greutate: 0.56 kg
Ediția:2nd ed. 2024
Editura: Springer International Publishing
Colecția Springer
Seria Springer Graduate Texts in Philosophy
Locul publicării:Cham, Switzerland
Cuprins
Part I: Logic, Sets, and Numbers.- Chapter 1. First-order Logic.- Chapter 2. Logical seeing.- Chapter 3. What is a Number?.- Chapter 4. Seeing the Number Structures.- Chapter 5. Points, Lines, and the Structure of R.- Chapter 6. Set Theory.- Part II: Relations, Structures, Geometry.- Chapter 7. Relations.- Chapter 8. Definable Elements and Constants.- Chapter 9. Minimal and Order-Minimal Structures.- Chapter 10. Geometry of Definable Sets.- Chapter 11. Where Do Structures Come From?.- Chapter 12. Elementary Extensions and Symmetries.- Chapter 13. Tame vs. Wild.- Chapter 14. First-Order Properties.- Chapter 15. Symmetries and Logical Visibility One More Time.- Part III: Inference, Models, Categoricity and Diversity.- Chapter 16. Logical Inference.- Chapter 17. Categoricity.- Chapter 18. Counting Countable Models.- Chapter 19. Infinitary Logics.- Chapter 20. Symmetry and Definability.- Appendices.- Bibliography.- Index.
Notă biografică
Roman Kossak is a Professor of Mathematics at the City University of New York. He does research in model theory of formal arithmetic. He has published 38 research papers and co-authored a monograph on the subject for the Oxford Logic Guides series. His other interests include philosophy of mathematics, phenomenology of perception, and interactions between mathematics philosophy and the arts.
Textul de pe ultima copertă
This textbook is a second edition of the successful, Mathematical Logic: On Numbers, Sets, Structures, and Symmetry. It retains the original two parts found in the first edition, while presenting new material in the form of an added third part to the textbook. The textbook offers a slow introduction to mathematical logic, and several basic concepts of model theory, such as first-order definability, types, symmetries, and elementary extensions.
Part I, Logic Sets, and Numbers, shows how mathematical logic is used to develop the number structures of classical mathematics. All necessary concepts are introduced exactly as they would be in a course in mathematical logic; but are accompanied by more extensive introductory remarks and examples to motivate formal developments. The second part, Relations, Structures, Geometry, introduces several basic concepts of model theory, such as first-order definability, types, symmetries, and elementary extensions, and shows how they are used to study and classify mathematical structures. The added Part III to the book is closer to what one finds in standard introductory mathematical textbooks. Definitions, theorems, and proofs that are introduced are still preceded by remarks that motivate the material, but the exposition is more formal, and includes more advanced topics. The focus is on the notion of countable categoricity, which analyzed in detail using examples from the first two parts of the book. This textbook is suitable for graduate students in mathematical logic and set theory and will also be of interest to mathematicians who know the technical aspects of the subject, but are not familiar with its history and philosophical background.
Part I, Logic Sets, and Numbers, shows how mathematical logic is used to develop the number structures of classical mathematics. All necessary concepts are introduced exactly as they would be in a course in mathematical logic; but are accompanied by more extensive introductory remarks and examples to motivate formal developments. The second part, Relations, Structures, Geometry, introduces several basic concepts of model theory, such as first-order definability, types, symmetries, and elementary extensions, and shows how they are used to study and classify mathematical structures. The added Part III to the book is closer to what one finds in standard introductory mathematical textbooks. Definitions, theorems, and proofs that are introduced are still preceded by remarks that motivate the material, but the exposition is more formal, and includes more advanced topics. The focus is on the notion of countable categoricity, which analyzed in detail using examples from the first two parts of the book. This textbook is suitable for graduate students in mathematical logic and set theory and will also be of interest to mathematicians who know the technical aspects of the subject, but are not familiar with its history and philosophical background.
Caracteristici
New edition includes countable categoricity, analyzed using examples from the first two parts of the book Presents an introduction to formal mathematical logic and set theory Presents simple yet nontrivial results in modern model theory
Recenzii
“Remembering how impenetrable textbooks on mathematical logic were when he was a freshman, the author has written an introductory textbook on mathematical logic, whose main strength is the emphasis on motivating every step with detailed explanations. … The author has clearly succeeded in writing a textbook making the reading of those impenetrable texts possible for a beginner.” (Victor V. Pambuccian, zbMATH 06945597, 2021)
“This fun book can be viewed as a very gentle introduction to the notion of mathematical structure, and hence to model theory. … Each chapter concludes with a selection of exercises of varying degrees of difficulty, often asking the reader to establish facts. Apart from the uses suggested on the book's cover, I can well imagine teaching an introduction to proof class with this textbook.” (Jana Maříková, Mathematical Reviews, March 2021)
“The author has made a significant effort to present the (not so easy) material in an understandable way … . I am sure that readers of this well-written book will experience many such satisfying moments.” (Temur Kutsia, Computing Reviews, September 11, 2019)
“Such modesty and humility. Wow. Here is an outstanding book. In the beginning, we learn of the difficulties the author encountered as a student while learning some of the very topics he writes about in this book. So successfully has the author conquered his youthful difficulties that model theory is now his research specialty and is also an important component of this book.” (Dennis W. Gordon, MAA Reviews, May 19, 2019)