000 02299cam a2200337 a 4500
001 12891052
003 OSt
005 20170322165239.0
008 020812s2003 gw b 001 0 eng
010 _a 2002030443
020 _a3540440852
020 _a9783540440857
022 _a14397382
040 _aDLC
_cDLC
_dDLC
041 _aeng.
082 0 0 _a511.322
_221
100 1 _aJech, Thomas J.
245 1 0 _aSet theory /
_cThomas Jech.
250 _a3rd ed.
260 _aBerlin :
_bSpringer ;
_c2003.
300 _axiii, 769 p. ;
_c24 cm.
490 _aSpringer monographs in mathematics.
500 _aIncludes indexes.
504 _aIncludes bibliographical references (p. 707-732).
505 _tPart I. Basic Set Theory. - Axioms of Set Theory. - Ordinal Numbers. - Cardinal Numbers. - Real Numbers. - The Axiom of Choice and Cardinal Arithmetic. - The Axiom of Regularity. - Filters, Ultrafilters and Boolean Algebras. - Stationary Sets. - Combinatorial Set Theory. - Measurable Cardinals. - Borel and Analytic Sets. - Models of Set Theory.
_tPart II. Advanced Set Theory. - Constructible Sets. - Forcing. - Applications of Forcing. - Iterated Forcing and Martin's Axiom. - Large Cardinals. - Large Cardinals and L. - Iterated Ultrapowers and LÄUÜ. - Very Large Cardinals. - Large Cardinals and Forcing. - Saturated Ideals. - The Nonstationary Ideal. - The Singular Cardinal Problem. - Descriptive Set Theory. - The Real Line.
_tPart III. Selected Topics. - Combinatorial Principles in L. - More Applications of Forcing. - More Combinatorial Set Theory. - Complete Boolean Algebras. - Proper Forcing. - More Descriptive Set Theory. - Determinacy. - Supercompact Cardinals and the Real Line. - Inner Models for Large Cadinals. - Forcing and Large Cardinals. - Martin's Maximum. - More on Stationary Sets. - Bibliography. - Notation. - Index. - Name Index.
650 0 _aSet theory.
856 4 2 _3Publisher description
_uhttp://www.loc.gov/catdir/enhancements/fy0816/2002030443-d.html
906 _a7
_bcbc
_corignew
_d1
_eocip
_f20
_gy-gencatlg
942 _2ddc
_cLIBRO
955 _apc17 2002-08-12 to ASCD
_ajp00 2002-08-13 CIP recd
_cjp20 2002-08-14 to subj
_aaa07 2002-08-15
_aps16 2002-12-05 bk rec'd, to CIP ver.
_ajp00 2002-12-12
999 _c2686