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88E. G. K. Lopez-Escobar. An interpolation theorem for denumerably long formulas. Fundamenta mathematicae, vol. 57 no. 3 (1965), pp. 253–257. - E. G. K. Lopez-Escobar. Universal formulas in the infinitary language L αβ. Bulletin de l'Académie Polonaise des Sciences, Série des sciences mathématiques, astronomiques et physiques, vol. 13 (1965), pp. 383–388 (review)Journal of Symbolic Logic 34 (2): 301-302. 1969.
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48A Complete, Infinitary Axiomatization of Weak Second-Order LogicJournal of Symbolic Logic 35 (3): 467-467. 1970.
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320Meeting of the association for symbolic logic: Atlanta 1973Journal of Symbolic Logic 39 (2): 390-405. 1974.
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103W. W. Tait. Infinitely long terms of transfinite type. Formal systems and recursive functions, Proceedings of the Eighth Logic Colloquium, Oxford, July 1963, edited by J. N. Crossley and M. A. E. Dummett, Studies in logic and the foundations of mathematics, North-Holland Publishing Company, Amsterdam 1965, pp. 176–185Journal of Symbolic Logic 40 (4): 623-624. 1975.
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89Wilbur John WalkoeJr., Finite partially-ordered quantification. The journal of symbolic logic, vol. 35 , pp. 535–555Journal of Symbolic Logic 40 (2): 239-240. 1975.
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127Remarks on the church-Rosser propertyJournal of Symbolic Logic 55 (1): 106-112. 1990.A reduction algebra is defined as a set with a collection of partial unary functions (called reduction operators). Motivated by the lambda calculus, the Church-Rosser property is defined for a reduction algebra and a characterization is given for those reduction algebras satisfying CRP and having a measure respecting the reductions. The characterization is used to give (with 20/20 hindsight) a more direct proof of the strong normalization theorem for the impredicative second order intuitionistic…Read more
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145On the interpolation theorem for the logic of constant domainsJournal of Symbolic Logic 46 (1): 87-88. 1981.
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152David W. Kueker. Generalized interpolation and definability. Annals of mathematical logic, vol. 1 no. 4 , pp. 423–468Journal of Symbolic Logic 39 (2): 337-338. 1974.
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130Circumscription within monotonic inferencesJournal of Symbolic Logic 53 (3): 888-904. 1988.A conservative extension of first order logic, suitable for circumscriptive inference, is introduced
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46Andrzej Grzegorczyk. An outline of mathematical logic. Fundamental results and notions explained with all details. English translation by Olgierd Wojtasiewicz and Wacław Zawadowski of the second edition of Zarys logiki matematycznej. Synthese library, vol. 70. D. Reidel Publishing Company, Dordrecht and Boston, and PWN—Polish Scientific Publishers, Warsaw, 1974, X + 596 pp (review)Journal of Symbolic Logic 48 (1): 220-222. 1983.
