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Table des matières de ce fascicule | Article précédent | Article suivant
Ferro, Ruggero
Consistency property and model existence theorem for second order negative languages with conjunctions and quantifications over sets of cardinality smaller than a strong limit cardinal of denumerable cofinality. Rendiconti del Seminario Matematico della Università di Padova, 55 (1976), p. 123-141
Texte intégral djvu | pdf | Analyses MR 460065 | Zbl 0365.02006 | 7 citations dans Numdam
URL stable: http://www.numdam.org/item?id=RSMUP_1976__55__123_0
[1] J.L. Bell - A. B. SLOMSON, Models and ultraproducts: An introduction, North Holland, Amsterdam, 1969. MR 269486 | Zbl 0179.31402
[2] C.C. Chang, Two interpolation theorems, Proceedings of the Rome conference on model theory, Symposia Mathematica, vol. V, Academic Press, New York, 1970, pp. 5-19. MR 282819 | Zbl 0222.02008
[3] C.C. Chang - H.J. Kiesler, Model theory, North Holland, Amsterdam, 1973.
[4] J. Green, Consistency property for uncountable finite-quantifier languages, Doctoral Dissertation, University of Maryland, 1972.
[5] C.R. Karp, Languages with formulas of infinite length, Doctoral Dissertation, University of Southern California, 1959.
[6] C.R. Karp, Languages with expressions of infinite length, North Holland, Amsterdam, 1964. MR 176910 | Zbl 0127.00901
[7] C.R. Karp, Infinite quantifier languages and ω-chain of models, to appear in the forthcoming Proceedings of the Tarski Symposium. Zbl 0308.02016
[8] H.J. Keisler, Model theory for infinitary languages, North Holland, Amsterdam, 1971. MR 344115 | Zbl 0222.02064
[9] S. Maehara - G. Takeuti, Two interpolation theorems for a positive second order predicate calculus, Journal of Symbolic Logic, 36 (1971), pp. 262-270. MR 307876 | Zbl 0278.02013
[10] M. Makkai, On the model theory of denumerably long formulas with finite strings of quantifiers, Journal of Symbolic Logic, 34 (1969), pp. 437-459. MR 255383 | Zbl 0235.02050
[11] J.I. Malitz, Problems in the model theory of infinitary languages, Doctoral Dissertation, University of California, Berkeley, 1966.
[12] E. Mendelson, Introduction to mathematical logic, Van Nostrand, Princeton, 1964. MR 164867 | Zbl 0192.01901
[13] R.M. Smullyan, First order logic, Springer-Verlag, Berlin, 1968. MR 243994 | Zbl 0172.28901
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