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Bibliography
S. Aanderaa [1973] Inductive definitions and their closure ordinals, in: J.E. Fenstad and P. Hinman,eds., Generalized Recursion Theory (North Holland, Amsterdam) 207–220.
F.G. Abramson, L.A. Harrington, E.M. Kleinberg, and W.S. Zwicker [1977] Flipping properties: a unifying thread in the theory of large cardinals, Annals Math. Logic 12(1), 37–58.
P. Aczel and W. Richter [1972] Inductive definitions and analogues of large cardinals, in: Conference in Mathematical Logic, London, 1970, Lecture Notes in Math. 255 (Springer, Berlin) 1–9.
[1974] Inductive definitions and reflecting properties of admissible ordinals, in: J.E. Fenstad and P. Hinman,eds., Generalized Recursion Theory (North Holland, Amsterdam) 301–381.
J.Barwise, M.Kaufmann, and M.Makkai [1978] Stationary logic, Annals Math. Logic 12(3).
J. Baumgartner [1975] Ineffability properties of cardinals I, in: Infinite and Finite Sets, Colloquia Mathematica Societatis Janos Bolyai, 10 (dedicated to P.Erdös) (North Holland, Amsterdam) vol.1.
[1976] A new class of order types, Annals Math. Logic 9(3), 187–222.
J. Baumgartner and F.Galvin (1977) Generalized Erdös cardinals and 0#, to appear.
J. Baumgartner, A. Hajnal, and A. Maté [1975] Weak saturation properties of ideals, in: Infinite and Finite Sets, Colloquia Mathematica Societatis Janos Bolyai, 10 (dedicated to P.Erdös) (North Holland, Amsterdam).
J. Baumgartner, L. Harrington, and E.M. Kleinberg [1976] Adding a closed unbounded set, J. Sym. Logic 41(2), 481–2.
J. Baumgartner, A. Taylor, and S. Wagon [1977] On splitting stationary subsets of large cardinals, J. Sym. Logic 42, 203–214.
(1978) Ideals and partitions, to appear.
J. Bell [1977] Boolean-valued Models and Independence Proofs in Set Theory, Oxford Logic Guides (Clarendon Press, Oxford).
M. Benda and J. Ketonen [1974] On regularity of ultrafilters, Israel J. of Math. 17, 231–240.
W. Boos [1975] Lectures on large cardinal axioms, in: Logic Conference, Kiel 1974, Lecture Notes in Math. 499 (Springer, Berlin) 25–88.
L. Bukovsky [1965] The continuum problem and powers of alephs, Commentationes Math. Univ. Caolinae 6, 181–197.
[1976] Changing cofinality to
, in: Set Theory and Hierarchy Theory, Lecture Notes in Math. 537 (Springer, Berlin) 37–49.E.Bull (1976) Successive large cardinals, to appear, and M.I.T. Ph.D. Thesis.
C.C. Chang [1971] Sets constructible using Lκκ, in: D.S. Scott,ed., Axiomatic Set Theory, Proc. Symp. Pure Math. 13(1) (Amer. Math. Soc., Providence, R.I.) 1–8.
C.C. Chang and H.J. Keisler [1973] Model Theory (North Holland, Amsterdam).
G.V. Chudnovsky and D.V. Chudnovsky [1971] Regularnye i ubyvajusche nepolnye ultrafiltry, Dokl. Akad. Nauk U.S.S.R. 198, 779–782.
W.W. Comfort and S. Negrepontis [1974] The Theory of Ultrafilters (Springer, Berlin).
Morton Davis [1964] Infinite games with perfect information, in: Advances in Game Theory, Annals of Math. Studies 52 (Princeton, N.J.) 85–101.
K.J. Devlin [1973] Some weak versions of large cardinal axioms, Annals Math. Logic 5, 291–325.
[1973a] Aspects of Constructibility, Lecture Notes in Math. 354 (Springer, Berlin).
[1974] Some remarks on changing cofinalities, J. Sym. Logic 39, 27–30.
[1975] Indescribability properties and small large cardinals, in: Logic Conference, Kiel 1974, Lecture Notes in Math. 499 (Springer, Berlin) 89–114.
K.J. Devlin and R.B. Jensen [1975] Marginalia to a theorem of Silver, in: Logic Conference, Kiel 1974, Lecture Notes in Math. 499 (Springer, Berlin) 115–142.
K.J. Devlin and H. Johnsbraten [1974] The Souslin Problem, Lecture Notes in Math. 405 (Springer, Berlin).
M.A. Dickmann [1976] Large Infinitary Languages (North Holland, Amsterdam).
C.DiPrisco (1976) M.I.T. Ph.D. Thesis.
C.DiPrisco and J.Henle (1977) On the compactness of
, to appear.C.DiPrisco and W.Zwicker (1977) Flipping properties and supercompact cardinals, to appear.
T.Dodd and R.B.Jensen (1976) The core model, circulated notes.
F.R. Drake [1974] Set Theory (North Holland, Amsterdam).
W.B. Easton [1964] Powers of regular cardinals, Annals Math. Logic 1, 139–178.
A. Ehrenfeucht and A. Mostowski [1956] Models of axiomatic theories admitting automorphisms, Fund. Math. 43, 50–68.
P. Erdös and A. Hajnal [1958] On the structure of set mappings, Acta Math. Acad. Sci. Hung. 9, 111–131.
[1962] Some remarks concerning our paper "On the structure of set mappings", Acta Math. Acad. Sci. Hung. 13, 223–226.
[1966] On a problem of B.Jónsson, Bull. Acad. Polon. Sci. Sér. Sci. Math. Ast. Phys. 14, 61–99.
[1971] Unsolved problems in set theory, in: D.S. Scott,ed., Axiomatic Set Theory, Proc. Symp. Pure Math. 13(1) (Amer. Math. Soc., Providence R.I.) 17–48.
P. Erdös, A. Hajnal, and R. Rado [1965] Partition relations for cardinal numbers, Acta Math. Acad. Sci. Hung. 16, 93–196.
P. Erdös and R. Rado [1952] Combinatorial theorems on classifications of subsets of a given set, Proc. London Math. Soc. (3)2, 417–439.
[1956] A partition calculus in set theory, Bull. Amer. Math. Soc. 62, 427–489.
P. Erdös and A. Tarski [1943] On families of mutually exclusive sets, Ann. Math. 44, 315–429.
[1961] On some problems involving inaccessible cardinals, in: Essays on the Foundations of Mathematics (Magnes Press, Jerusalem) 50–82.
G. Fodor [1956] Eine Bemerkung zur Theorie der regressiven Funktionen, Acta Sci. Math. (Széged) 17, 139–142.
[1966] On a process concerning inaccessible cardinals I, Acta Sci. Math. (Széged) 27, 111–124.
H. Friedman [1971] Higher set theory and mathematical practice, Annals Math. Logic 2, 326–357.
L. Fuchs [1970] Infinite Abelian Groups (Academic Press, London-New York).
H. Gaifman [1967] Uniform extension operators for models and their applications, in: J. Crossley, ed., Sets, Models and Recursion Theory (North Holland, Amsterdam) 122–155.
[1967a] A generalization of Mahlo's method for obtaining large cardinal numbers, Israel J. Math. 5, 188–200.
[1974] Elementary embeddings of set theory, in: T.J. Jech, ed., Axiomatic Set Theory, Proc. Symp. Pure Math. 13(2) (Amer. Math. Soc., Providence,R.I.) 33–101.
D.Gale and F.M.Stewart [1953] Infinite games with perfect information, in: Kuhn and Tucker, eds., Contributions to the Theory of Games, vol. 3, Annals of Math. Studies 28 (Princeton, N.J.) 245–266.
F. Galvin and A. Hajnal [1975] Inequalities for cardinal powers, Ann. Math. 101, 491–498.
F.Galvin, T.J.Jech, and M Magidor (1976) An ideal game, to appear in J. Sym. Logic.
F.Galvin and K.Prikry (1976) Infinitary Jónsson algebras, to appear.
K. Glöede [1973] Filters closed under Mahlo's and Gaifman's operation, in: Cambridge Summer School in Mathematical Logic, Lecture Notes in Math. 337 (Springer, Berlin) 495–527.
K. Gödel [1938] The consistency of the axiom of choice and of the generalized continuum hypothesis, Proc. Natl. Acad. Sci. U.S.A. 24, 556–557.
[1946] Remarks before the Princeton Bicentennial Conference on problems in mathematics, in: M. Davis, ed., The Undecidable (Raven Press, New York) 84–88.
[1947] What is Cantor's continuum problem?, Amer. Math. Monthly 54, 515–525.
J.Green (1977) Berkeley Ph.D.Thesis.
J. Gregory [1976] Higher Souslin trees and the generalized continuum hypothesis, J. Sym. Logic 41(3), 663–671.
D.Guaspari (1973) The largest constructible II 11 set, to appear.
W.P. Hanf [1964] Incompactness in languages with infinitely long expressions, Fund. Math. 53, 309–324.
On a problem of Erdös and Tarski, Fund. Math. 53, 325–334.
W.P. Hanf and D.S. Scott [1961] Classifying inaccessible cardinals, Notices Amer. Math. Soc. 8, 445.
L.Harrington [1973] M.I.T. Ph.D.Thesis.
[1974] The superjump and the first recursively Mahlo ordinal, in: J.E. Fenstad and P. Hinman, eds., Generalized Recursion Theory (North Holland, Amsterdam) 43–52.
(1975) Analytic determinacy and 0#, to appear.
F. Hausdorff [1908] Grundzüge einer Theorie der geordneten Mengen, Math. Annalen 65, 443.
E. Hewitt [1948] Rings of continuous functions I, Trans. Amer. Math. Soc. 64, 45–99.
T.J. Jech [1968] θ1 can be measurable, Israel J. Math. 6, 363–367.
[1971] Trees, J. Sym. Logic 36(1), 1–14.
[1973] Some combinatorial problems concerning uncountable cardinals, Annals Math. Logic 5, 165–198.
(1977) A game theoretic property of Boolean algebras, to appear in the proceedings of Wroclaw 1977 conference.
T.J.Jech, M.Magidor, W.Mitchell, and K.Prikry (1977) On precipitous ideals, to appear.
T.J.Jech and K Prikry (1977) Ideals over uncountable sets: applications of almost disjoint functions and generic ultrapowers, to appear.
R.B. Jensen [1972] The fine structure of the constructible hierarchy, Annals Math. Logic 4, 229–308.
(1975) Coding the universe in a real, circulated notes.
R.B.Jensen and B.Koppelberg (1977) Regularity of ultrafilters, to appear.
R.B.Jensen and K.Kunen (1971) Some combinatorial properties of L and V, circulated notes.
R.B. Jensen and R.M. Solovay [1970] Some applications of almost disjoint sets, in: Y. Bar-Hillel, ed., Mathe-Logic and Foundations of Set Theory (North Holland, Amsterdam) 84–104.
A. Kanamori [1976] Weakly normal filters and irregular ultrafilters, Trans. Amer. Math. Soc. 220, 393–399.
[1977] Ultrafilters over a measurable cardinal, Annals Math. Logic 11, 315–356.
[1978] On Vopěnka's and related principles, to appear in the proceedings of Wroclaw 1977 conference.
C. Karp [1964] Languages with Expressions of Infinite Length (North Holland, Amsterdam).
A. Kechris [1973] Measure and category in effective descriptive set theory, Annals Math. Logic 5, 337–384.
[1974] On projective ordinals, J. Sym. Logic 39(2), 269–282.
[1975] The theory of countable analytical sets, Trans Amer. Math. Soc. 202, 259–297.
(1977) AD and infinite exponent partition relations, manuscript.
H.J. Keisler [1971] Model Theory for Infinitary Logic (North Holland, Amsterdam).
H.J. Keisler and A. Tarski [1964] From accessible to inaccessible cardinals, Fund. Math. 53, 225–308.
J. Ketonen [1972] Strong compactness and other cardinal sins, Annals Math. Logic 5, 47–76.
[1976] Non-regular ultrafilters and large cardinals, Trans. Amer. Math. Soc. 224, 61–73.
E.M. Kleinberg [1970] Strong partition properties for infinite cardinals, J. Sym. Logic 35, 410–428.
[1973] Infinitary combinatorics, in: Cambridge Summer School in Mathematical Logic, Lecture Notes in Math. 337 (Springer, Berlin) 361–418.
[1973a] Rowbottom cardinals and Jónsson cardinals are almost the same, J. Sym. Logic 38(3) 423–427.
(1973) The equiconsistency of two large cardinal axioms, to appear in Fund. Math.
[1977] Infinitary Combinatorics and the Axiom of Determinateness, Lecture Notes in Math. 612 (Springer, Berlin).
D.W. Kueker [1977] Countable approximations and Löwenheim-Skolem theorems, Annals Math. Logic 11(1), 57–103.
K.Kunen [1968] Inaccessibility properties of cardinals, Stanford Ph.D.Thesis.
[1970] Some applications of iterated ultrapowers in set theory, Annals Math. Logic 1, 179–227.
[1970a] On the compactification of the integers, Notices Amer. Math. Soc. 17,299.
[1971] Elementary embeddings and infinitary combinatorics, J. Sym. Logic 36, 407–413.
[1971a] On the GCH at measurable cardinals, in: R.O. Gandy and C.E.M. Yates, eds., Logic Colloquium '69 (North Holland, Amsterdam) 107–110.
[1973] A model for the negation of the axiom of choice, in: Cambridge Summer School in Mathematical Logic, Lecture Notes in Math. 337 (Springer, Berlin) 489–494.
(1974) Saturated ideals, to appear in J. Sym. Logic.
[1976] Some points in βN, Proc. Cambridge Phil. Soc. 80, 385–398.
K. Kunen and J.B. Paris [1971] Boolean extensions and measurable cardinals, Annals Math. Logic 2, 359–378.
G. Kurepa [1935] Ensembles ordonnés et ramifiés, Publ. Math. Univ. Belgrade 4, 1–138.
[1936] L'hypothèse de ramification, Comptes Rendus, Hebdomadaires des Séances de l'Academie des Sciences, Séries A et B, vol.202, 185–187.
R.Laver (1974) Making the supercompactness of κ indestructible under κ directed closed forcing, to appear.
(1976) A saturation property of ideals and the partition relation κ → (κ,α)2.
A. Lévy [1960] A generalization of Gödel's notion of constructibility, J. Sym. Logic 25, 147–155.
[1965] A hierarchy of formulas in set theory, Mem. Amer. Math. Soc. 57.
[1971] The sizes of the indescribable cardinals, in: D.S. Scott, ed., Axiomatic Set Theory, Proc. Symp. Pure Math. 13(1) (Amer. Math. Soc., Providence, R.I.) 205–218.
A. Lévy and R.M. Solovay [1967] Measurable cardinals and the continuum hypothesis, Israel J. Math. 5, 234–248.
M. Magidor [1971] On the role of supercompact and extendible cardinals in logic, Israel J. Math. 10, 147–157.
[1974] Combinatorial characterization of supercompact cardinals, Proc. Amer. Math. Soc. 42(1).
(1975) Changing cofinalities of cardinals, to appear.
[1976] How large is the first strongly compact cardinal?, Annals Math. Logic 10, 33–57.
[1977] On the singular cardinals problem I, Israel J. of Math. 28(1), 1–31.
[1977a] Chang's conjecture and powers of singular cardinals, J. Sym. Logic 42(2), 272–276.
(1977) On the existence of non-regular ultrafilters and cardinality of ultrapowers, to appear.
[1978] On the singular cardinals problem II, to appear in Ann. Math.
P. Mahlo [1911] Uber lineare transfinite Mengen, Ber. Verhandl. Sächs. Akad. Wiss. Leipzig, Math.-Naturw. Kl. 63, 187–225.
[1912] Zur Theorie und Andwendung der ρ0-Zahlen, Ber. Verhandl. Sächs. Akad. Wiss. Leipzig, Math.-Naturw. Kl. 64, 108–112.
[1913] Zur Theorie und Andwendung der ρ0-Zahlen II, Ber. Verhandl. Sächs. Akad. Wiss. Leipzig, Math.-Naturw. Kl. 64, 268–282.
R. Mansfield [1970] Perfect subsets of definable sets of real numbers, Pacific J. Math. 35, 451–457.
D.A. Martin [1970] Measurable cardinals and analytic games, Fund. Math. 66, 287–291.
(1971) Projective sets and cardinal numbers, to appear.
[1975] Borel Determinacy, Ann. Math. 102, 363–371.
D.A. Martin and R.M. Solovay [1969] A basis theorem for Σ 13 sets of reals, Ann. Math. 89(2), 138–160.
[1970] Internal Cohen extensions, Annals Math. Logic 2, 143–178.
A.R.D. Mathias [1977] Happy families, Annals Math. Logic 12(1), 59–111.
T.K. Menas [1974] On strong compactness and supercompactness, Annals Math. Logic 7, 327–359.
[1975] A combinatorial property of p λκ , J. Sym. Logic 41(1), 225–233.
[1976] Consistency results concerning supercompactness, Trans. Amer. Math. Soc. 223, 61–91.
A.Miller [1977] Berkeley Ph.D.Thesis.
W. Mitchell [1972] Aronszajn trees and the independence of the transfer property, Annals Math. Logic 5, 21–46.
[1974] Sets constructible from sequences of ultrafilters, J. Sym. Logic 39, 57–66.
Y.N. Moschovakis [1970] Determinacy and prewellorderings of the continuum, in: Y. Bar-Hillel, ed., Mathematical Logic and Foundations of Set Theory (North Holland, Amsterdam) 24–62.
[1973] Analytical definability in a playful universe, in: Suppes et al, eds., Proceedings of Third International Congress for Logic, Methodology and Philosophy of Science, Bucharest 1971 (North Holland, Amsterdam) 77–85.
J. Mycielski [1964] On the axiom of determinateness, Fund. Math. 53, 205–224.
J. Mycielski and H. Steinhaus [1962] On a mathematical axiom contradicting the axiom of choice, Bull. Acad. Polon. Sci. Sér. Sci. Math. Ast. Phys. 10, 67–71.
J. Mycielski and S. Swierczkowski [1964] The Lebesgue measurability and the axiom of determinateness, Fund. Math. 54, 67–71.
J. Mycielski, S. Swierczkowski, and A. Zieba [1956] On infinite positional games, Bull. Acad. Polon. Sci. Sér. Sci. Math. Ast. Phys. 4, 485–488.
J. Mycielski and A. Zieba [1955] On infinite positional games, Bull. Acad. Polon. Sci. Sér. Sci. Math. Ast. Phys. 3, 133–136.
J.R. Myhill and D.S. Scott [1971] Ordinal definability, in: D.S. Scott, ed., Axiomatic Set Theory, Proc. Symp. Pure Math. 13(1) (Amer. Math. Soc., Providence, R.I.) 271–278.
J.B. Paris [1972] ZF ⊢ Σ 04 Determinateness, J.Sym. Logic 37, 661–667.
K. Prikry [1970] Changing measurable into accessible cardinals, Dissertationes Mathematicae (Rozprawy Matematyczne) 68, 5–52.
[1971] On a problem of Gillman and Keisler, Annals Math. Logic 2, 179–187.
[1973] On descendingly complete ultrafilters, in: Cambridge Summer School in Mathematical Logic, Lecture Notes in Math. 337 (Springer, Berlin) 459–488.
[1974] Ideals and powers of cardinals, to appear.
W.N. Reinhardt [1974] Remarks on reflection principles, large cardinals, and elementary embeddings, in: T.J. Jech, ed., Axiomatic Set Theory, Proc. Symp. Pure Math. 13(2) (Amer. Math. Soc., Providence, R.I.) 189–205.
G.E. Reyes [1972] \(L_{\omega _1 \omega } \) is enough: a reduction theorem for some infinitary languages, J. Sym. Logic 37, 705–710.
W. Richter [1971] Recursively Mahlo ordinals and inductive definitions, in: R.O. Gandy and C.E.M. Yates, eds., Logic Colloquium '69 (North Holland, Amsterdam), 273–288.
F. Rowbottom [1964] Some strong axioms of infinity incompatible with the axiom of constructibility, Madison Ph.D. Thesis; published as: Annals Math. Logic 3(1971) 1–44.
G.E. Sacks [1976] Countable admissible ordinals and hyperdegrees, Advances in Math. 20(2), 213–262.
D.S. Scott [1961] Measurable cardinals and constructible sets, Bull. Acad. Polon. Sci. Sér. Math. Ast. Phys. 7, 145–149.
S. Shelah [1975] A compactness theorem for singular cardinals, free algebras, Whitehead problem and transversals, Israel J. Math. 21(4), 319–349.
(1977) Jónsson groups, to appear in proceedings of Oxford 1977 conference (North Holland, Amsterdam).
J.R. Shoenfield [1971] Unramified forcing, in: D.S. Scott, ed., Axiomatic Set Theory, Proc. Symp. Pure Math. 13(1) (Amer. Math. Soc., Providence, R.I.) 357–381.
W. Sierpinski and A. Tarski [1930] Sur une propriété caractéristique des nombres inaccessibles, Fund. Math. 15, 292–300.
J.H. Silver [1966] Some applications of model theory in set theory, Berkeley Ph.D.Thesis, published as: Annals Math. Logic 3(1970), 45–110.
[1970] A large cardinal in the constructible universe, Fund. Math. 69, 93–100.
[1971] The consistency of the GCH with the existence of a measurable cardinal, in: D.S. Scott, ed., Axiomatic Set Theory, Proc. Symp. Pure Math. 13(1) (Amer. Math. Soc., Providence, R.I.) 391–395.
[1971a] The independence of Kurepa's conjecture and two-cardinal conjectures in model theory, in: D.S. Scott, ed., Axiomatic Set Theory, Proc. Symp. Pure Math. 13(1) (Amer. Math. Soc., Providence, R.I.) 383–390.
[1971b] Measurable cardinals and Δ 13 well-orderings, Ann. Math. 94, 414–446.
[1974] Indecomposable ultrafilters and 0#, in: L. Henkin et al, eds., Proceedings of the Tarski Symposium, Proc. Symp. Pure Math. 25 (Amer. Math. Soc., Providence, R.I.).
[1974a] On the singular cardinals problem, in: Proceedings of the International Congress of Matheamticians, Vancouver 1974, vol. 1, 265–268.
E.C. Smith and A. Tarski [1957] Higher degrees of distributivity and completeness in Boolean algebras, Trans. Amer. Math. Soc. 84, 230–257.
R.M. Solovay [1967] A non-constructible Δ 13 set of integers, Trans. Amer. Math. Soc. 127, 58–75.
[1969] The cardinality of Σ 12 sets of reals, in: J.J. Bullof, T.C. Holyoke, and S. Wilthan, eds., Foundations of Mathematics, Symposium papers commemorating the sixtieth birthday of Kurt Gödel (Springer, Berlin) 59–73.
[1970] A model of set theory in which every set of reals is Lebesgue measurable, Ann. Math. 92, 1–56.
[1971] Real-valued measurable cardinals, in: D.S. Scott, ed., Axiomatic Set Theory, Proc. Symp. Pure Math. 13(1) (Amer. Math. Soc., Providence, R.I.) 397–428.
[1974] Strongly compact cardinals and the G.C.H., in: L. Henkin et al, eds., Proceedings of the Tarski Symposium, Proc. Symp. Pure Math. 25 (Amer. Math. Soc., Providence, R.I.) 365–372.
R.M. Solovay, W.N. Reinhardt, and A. Kanamori [1978] Strong axioms of infinity and elementary embeddings, Annals Math. Logic 13(1), 73–116.
R.M. Solovay and S. Tennenbaum [1971] Iterated Cohen extensions and Souslin's problem, Ann. Math. 94, 201–245.
E. Specker [1951] Sur un problème de Sikorski, Colloq. Math. 2, 9–12.
[1957] Zur Axiomatik der Mengenlehre (Fundierungs und Answahl Axiome), Zeitschrift f. math. Logic und Grundlagen der Math. 3, 173–210.
M. Spector [1978] M.I.T. Ph.D.Thesis.
J. Stern (1973) The second strongly compact cardinal, notes.
D.H. Stewart [1966] Bristol M.Sc.Thesis.
A. Tarski [1939] Ideale in vollständigen Mengenkörpen I, Fund. Math. 32, 45–63.
[1962] Some problems and results relevant to the foundations of set theory, in: E. Nagel, P. Suppes, and A. Tarski, eds., Logic, Methodology, and Philosophy of Science (Stanford, California) 125–135.
A. Taylor (1977) Regularity properties of ideals and ultrafilters.
S. Ulam [1930] Zur Masstheorie in der algemeinen Mengenlehre, Fund. Math. 16, 140–150.
[1964] Combinatorial analysis in infinite sets, SIAM Rev., 343–355.
P. Vopěnka and K. Hrbáček [1966] On strongly measurable cardinals, Bull. Acad. Polon. Sci. Sér. Sci. Math. Ast. Phys. 14, 587–591.
S. Wagon (1975) The structure of precipitous ideals, to appear.
, in: Set Theory and Hierarchy Theory, Lecture Notes in Math. 537 (Springer, Berlin) 37–49.
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Kanamori, A., Magidor, M. (1978). The evolution of large cardinal axioms in set theory. In: Müller, G.H., Scott, D.S. (eds) Higher Set Theory. Lecture Notes in Mathematics, vol 669. Springer, Berlin, Heidelberg. https://doi.org/10.1007/BFb0103104
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