The Axiom of Choice Edited byThomas J. Jech-State University of New York at Bufalo and The Institute for Advanced Study, Princeton, New Jersey Volume 75, Pages iii-viii, 1-202 (1973) Download full volume Previous volume Next volume
Subsequent chapters examine embedding theorems, models with finite supports, weaker versions of the axiom, and nontransferable statements. The final sections consider mathematics without choice, cardinJech, Thomas Jdoi:10.1016/0022-4049(80)90097-3Thomas J. Jech...
Kleinberg [3] showed that every proof of Ramsey's theorem must use the axiom of choice, although rather weak forms of this axiom suffice. J. Dawson has raised the question of the position of Ramsey's theorem in the hierarchy of weak axioms of choice. In this paper, we prove or refute...
【中商原版】集合理论 修订和扩充版 英文原版 Set Theory The Third Millennium Edition, revised and expanded Thomas Jech 作者:Thomas Jech出版社:Springer出版时间:2006年03月 手机专享价 ¥ 当当价 降价通知 ¥2156 配送至 广东佛山市 至 北京市东城区 服务 由“中华商务进口图书旗舰店”发货,并提供售后...
摘要: The Association for Symbolic Logic publishes analytical reviews of selected books and articles in the field of symbolic logic. The reviews were published in The journal of symbolic logic from the founding of the Journal in 1936 until the end of 1999. The Association...
Thomas Jech: The Axiom of ChoiceThis chapter discusses a theorem by Jech on a finitary version of the Axiom of Choice. A bootstrapping trick for constructing finite choice functions may have other applications in theory.doi:10.1007/978-3-642-41422-0_37Richard J. Lipton...
The method of forcing and boolean — valued modelsdoi:10.1007/BFb0061147Thomas J. JechSpringer Berlin Heidelberg
stationary set projective stationary set stationary reflection principlesWe isolate several classes of stationary sets of [k]ωand investigate implications among them. Under a large cardinal assumption, we prove a structure theorem for stationary sets.Thomas JECH Jind ich ZAPLETAL中国科学:数学(英文版)...
A short proof of the Cushing-Henson conjectureMathematics - LogicGives a short proof of Dehornoy's latest result. The same simple argument (and more) was discovered by Laver's student Larue.Thomas JechMathematics
Thomas J. JechStudies in Logic & the Foundations of MathematicsJech, T.J.: About the Axiom of Choice. In: Handbook of Mathematical Logic, pp. 345–370. North-Holland, Amsterdam (1977)Thomas Jech. About the axiom of choice. Handbook of mathematical logic, 90:345-370, 1977....