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Boolean Algebras de Roman Sikorski

Boolean Algebras: ERGEBNISSE DER MATHEMATIK UND IHRER GRENZGEBIETE 2 FOLGE, cartea 25

Autor Roman Sikorski
en Limba Engleză Paperback – 9 apr 2012
There are two aspects to the theory of Boolean algebras; the algebraic and the set-theoretical. A Boolean algebra can be considered as a special kind of algebraic ring, or as a generalization of the set-theoretical notion of a field of sets. Fundamental theorems in both of these directions are due to M. H. STONE, whose papers have opened a new era in the develop­ ment of this theory. This work treats the set-theoretical aspect, with little mention being made of the algebraic one. The book is composed of two chapters and an appendix. Chapter I is devoted to the study of Boolean algebras from the point of view of finite Boolean operations only; a greater part of its contents can be found in the books of BIRKHOFF [2J and HERMES [1]. Chapter II seems to be the first systematic study of Boolean algebras with infinite Boolean operations. To understand Chapters I and II it suffices only to know fundamental notions from general set theory and set-theoretical topology. No know­ ledge of lattice theory or of abstract algebra is presumed. Less familiar topological theorems are recalled, and only a few examples use more advanced topological means; but these may be omitted. All theorems in both chapters are given with full proofs.
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Specificații

ISBN-13: 9783642858222
ISBN-10: 3642858228
Pagini: 252
Ilustrații: X, 240 p.
Dimensiuni: 155 x 235 x 13 mm
Greutate: 0.36 kg
Ediția:Softcover reprint of the original 3rd ed. 1969
Editura: Springer Berlin, Heidelberg
Colecția Springer
Seria ERGEBNISSE DER MATHEMATIK UND IHRER GRENZGEBIETE 2 FOLGE

Locul publicării:Berlin, Heidelberg, Germany

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Cuprins

I. Finite joins and meets.- § 1. Definition of Boolean algebras.- § 2. Some consequences of the axioms.- § 3. Ideals and filters.- § 4. Subalgebras.- § 5. Homomorphisms, isomorphisms.- § 6. Maximal ideals and filters.- § 7. Reduced and perfect fields of sets.- § 8. A fundamental representation theorem.- § 9. Atoms.- § 10. Quotient algebras.- §11. Induced homomorphisms between fields of sets.- § 12. Theorems on extending to homomorphisms.- § 13. Independent subalgebras. Products.- § 14. Free Boolean algebras.- § 15. Induced homomorphisms between quotient algebras.- § 16. Direct unions.- § 17. Connection with algebraic rings.- II. Infinite joins and meets.- § 18. Definition.- § 19. Algebraic properties of infinite joins and meets. (m, n)-distributivity..- § 20. m-complete Boolean algebras.- § 21. m-ideals and m-filters. Quotient algebras.- § 22. m-homomorphisms. The interpretation in Stone spaces.- § 23. m-subalgebras.- § 24. Representations by m-fields of sets.- § 25. Complete Boolean algebras.- § 26. The field of all subsets of a set.- §27. The field of all Borel subsets of a metric space.- §28. Representation of quotient algebras as fields of sets.- § 29. A fundamental representation theorem for Boolean ?-algebras. m-representability.- § 30. Weak m-distributivity.- § 31. Free Boolean m-algebras.- § 32. Homomorphisms induced by point mappings.- § 33. Theorems on extension of homomorphisms.- § 34. Theorems on extending to homomorphisms.- § 35. Completions and m-completions.- § 36. Extensions of Boolean algebras.- § 37. m-independent subalgebras. The field m-product.- § 38. Boolean (m, n)-products.- § 39. Relation to other algebras.- § 40. Applications to mathematical logic. Classical calculi.- § 41. Topology in Boolean algebras.Applications to non-classical logic.- § 42. Applications to measure theory.- § 43. Measurable functions and real homomorphisms.- § 44. Measurable functions. Reduction to continuous functions.- § 45. Applications to functional analysis.- § 46. Applications to foundations of the theory of probability.- § 47. Problems of effectivity.- List of symbols.- Author Index.