- Definitive compendium of all of modern set theory
- Chapters written by the leading experts in their areas
- Carefully crafted, self-contained expositions for all the subfields of set theory
- No other up-to-date single source available for all the subfields of set theory
Definitive compendium of all of modern set theory
Chapters written by the leading experts in their areas
Carefully crafted, self-contained expositions for all the subfields of set theory
No other up-to-date single source available for all the subfields of set theory
Includes supplementary material: sn.pub/extras
Numbers imitate space, which is of such a di?erent nature —Blaise Pascal It is fair to date the study of the foundation of mathematics back to the ancient Greeks. The urge to understand and systematize the mathematics of the time led Euclid to postulate axioms in an early attempt to put geometry on a ?rm footing. With roots in the Elements, the distinctive methodology of mathematics has become proof. Inevitably two questions arise: What are proofs? and What assumptions are proofs based on? The ?rst question, traditionally an internal question of the ?eld of logic, was also wrestled with in antiquity. Aristotle gave his famous syllogistic s- tems, and the Stoics had a nascent propositional logic. This study continued with ?ts and starts, through Boethius, the Arabs and the medieval logicians in Paris and London. The early germs of logic emerged in the context of philosophy and theology. The development of analytic geometry, as exempli?ed by Descartes, ill- tratedoneofthedi?cultiesinherentinfoundingmathematics. Itisclassically phrased as the question ofhow one reconciles the arithmetic with the geom- ric. Arenumbers onetypeofthingand geometricobjectsanother? Whatare the relationships between these two types of objects? How can they interact? Discovery of new types of mathematical objects, such as imaginary numbers and, much later, formal objects such as free groups and formal power series make the problem of ?nding a common playing ?eld for all of mathematics importunate. Several pressures made foundational issues urgent in the 19th century.
Handbook of Set Theory, Volume I, Akihiro Kanamori, 0. Introduction Thomas Jech, 1. Stationary Sets Andras Hajnal and Jean Larson, 2. Partition Relations Stevo Todorcevic, 3. Coherent Sequences Greg Hjorth, 4. Borel Equivalence Relations Uri Abraham, 5. Proper Forcing Andreas Blass, 6. Combinatorial Cardinal Characteristics of the Continuum Tomek Bartoszynski, 7. Invariants of Measure and Category Sy Friedman, 8. Constructibility and Class Forcing 48Ralf-Dieter Schindler and Martin Zeman, 9. Fine Structure 52Philip Welch, 10. S* Fine Structure 80Volume II, Patrick Dehornoy, 11. Elementary Embeddings and Algebra James Cummings, 12. Iterated Forcing and Elementary Embeddings Matthew Foreman, 13. Ideals and Generic Elementary Embeddings Uri Abraham and Menachem Magidor, 14. Cardinal Arithmetic Todd Eisworth, 15. Successors of Singular Cardinals Moti Gitik, 16. Prikry-Type Forcings Volume III, William Mitchell, 17. Beginning Inner Model Theory William Mitchell, 18. The Covering Lemma John Steel, 19. An Outline of Inner Model Theory Ernest Schimmerling, 20. A Core Model Tool Box and Guide Steve Jackson, 21. Structural Consequences of AD Itay Neeman, 22. Determinacy in L(R) Peter Koellner and Hugh Woodin, 23. Large Cardinals from Determinacy Paul Larson, 24. Forcing over Models of Determinacy
This handbook is the definitive compendium of the methods, results, and current initiatives in modern set theory in all its research directions. Set theory has entered its prime as an advanced and autonomous field of mathematics with foundational significance, and the expanse and variety of this handbook attests to the richness and sophistication of the subject. The chapters are written by acknowledged experts, major research figures in their areas, and they each bring to bear their experience and insights in carefully wrought, self-contained expositions. There is historical depth, elegant development, probing to the frontiers, and prospects for the future. This handbook is essential reading for the aspiring researcher, a pivotal focus for the veteran set theorist, and a massive reference for all those who want to gain a larger sense of the tremendous advances that have been made in the subject, one which first appeared as a foundation of mathematics but in the last several decades has expanded into a broad and far-reaching field with its own self-fueling initiatives.
From the reviews:
"This Handbook is written for graduate students and researchers ... . The 24 chapters and a long introduction are written by acknowledged experts, major research figures in their areas. ... The Handbook is completed by an extensive Index.” (Martin Weese, Zentralblatt MATH, Vol. 1197, 2010)
Inhaltsverzeichnis
Handbook of Set Theory,
Volume I,
Akihiro Kanamori, 0. Introduction
Thomas Jech, 1. Stationary Sets
Andras Hajnal and Jean Larson, 2. Partition Relations
Stevo Todorcevic, 3. Coherent Sequences
Greg Hjorth, 4. Borel Equivalence Relations
Uri Abraham, 5. Proper Forcing
Andreas Blass, 6. Combinatorial Cardinal Characteristics of the Continuum
Tomek Bartoszynski, 7. Invariants of Measure and Category
Sy Friedman, 8. Constructibility and Class Forcing 48
Ralf-Dieter Schindler and Martin Zeman, 9. Fine Structure 52
Philip Welch, 10. S* Fine Structure 80
Volume II,
Patrick Dehornoy, 11. Elementary Embeddings and Algebra
James Cummings, 12. Iterated Forcing and Elementary Embeddings
Matthew Foreman, 13. Ideals and Generic Elementary Embeddings
Uri Abraham and Menachem Magidor, 14. Cardinal Arithmetic
Todd Eisworth, 15. Successors of Singular Cardinals
Moti Gitik, 16. Prikry-Type Forcings
Volume III,
William Mitchell, 17. Beginning Inner Model Theory
William Mitchell, 18. The Covering Lemma
John Steel, 19. An Outline of Inner Model Theory
Ernest Schimmerling, 20. A Core Model Tool Box and Guide
Steve Jackson, 21. Structural Consequences of AD
Itay Neeman, 22. Determinacy in L(R)
Peter Koellner and Hugh Woodin, 23. Large Cardinals from Determinacy
Paul Larson, 24. Forcing over Models of Determinacy
Klappentext
Numbers imitate space, which is of such a di?erent nature ¿Blaise Pascal It is fair to date the study of the foundation of mathematics back to the ancient Greeks. The urge to understand and systematize the mathematics of the time led Euclid to postulate axioms in an early attempt to put geometry on a ?rm footing. With roots in the Elements, the distinctive methodology of mathematics has become proof. Inevitably two questions arise: What are proofs? and What assumptions are proofs based on? The ?rst question, traditionally an internal question of the ?eld of logic, was also wrestled with in antiquity. Aristotle gave his famous syllogistic s- tems, and the Stoics had a nascent propositional logic. This study continued with ?ts and starts, through Boethius, the Arabs and the medieval logicians in Paris and London. The early germs of logic emerged in the context of philosophy and theology. The development of analytic geometry, as exempli?ed by Descartes, ill- tratedoneofthedi?cultiesinherentinfoundingmathematics. Itisclassically phrased as the question ofhow one reconciles the arithmetic with the geom- ric. Arenumbers onetypeofthingand geometricobjectsanother? Whatare the relationships between these two types of objects? How can they interact? Discovery of new types of mathematical objects, such as imaginary numbers and, much later, formal objects such as free groups and formal power series make the problem of ?nding a common playing ?eld for all of mathematics importunate. Several pressures made foundational issues urgent in the 19th century.
Definitive compendium of all of modern set theory
n
Chapters written by the leading experts in their areas
n
Carefully crafted, self-contained expositions for all the subfields of set theory
n
No other up-to-date single source available for all the subfields of set theory
n
Includes supplementary material: sn.pub/extras
n
