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The consistency of some 4-stratified subsystem of NF including NF3

Published online by Cambridge University Press:  12 March 2014

Maurice Boffa
Affiliation:
Faculty of Sciences, University of Mons, 7000 Mons, Belgium
Paolo Casalegno
Affiliation:
Scuola Normale Superiore, 56100 Pisa, Italy

Extract

As is well known, NF is a first-order theory whose language coincides with that of ZF. The nonlogical axioms of the theory are: Extensionality. (x)(y)[(z)(zxzy) → x = y].

Comprehension. (Ex)(y)(yxψ) for every stratified ψ in which x does not occur free (a formula of NF is said to be stratified if it can be turned into a formula of the simple theory of types by adding type indices (natural numbers ≥ 0) to its variables).

Before stating our result, a few preliminaries are in order. Let T be the simple theory of types. If ψ is a formula of T, we denote by ψ+ the formula obtained from ψ by raising all type indices by 1. T* is the result of adding to T every axiom of the form ψψ+. A formula of T is n-stratified (n > 0) if it does not contain any type index ≥ n. A formula of NF is n-stratified if it can be turned into an n-stratified formula of T by adding type indices to its variables. (In practice, we shall allow ourselves to confuse an n-stratified formula of T with the corresponding n-stratified formula of NF). For n > 0, Tn (resp. ) is the subtheory of T (resp. T*) containing only n-stratified formulae. For n > 0, NFn is the subtheory of NF generated by those axioms of NF which are n-stratified. Let = 〈M0, M1,…,=, ∈〉 be a model of T.

Type
Research Article
Copyright
Copyright © Association for Symbolic Logic 1985

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References

REFERENCES

[1]Barwise, J., Back and forth through infinitary logic, Studies in model theory (Morley, M.D., editor), MAA Studies in Mathematics, vol. 8, Mathematical Association of America, Buffalo, New York, 1973, pp. 534.Google Scholar
[2]Boffa, M., The consistency problem for NF, this Journal, vol. 42 (1977), pp. 215220.Google Scholar
[3]Boffa, M., La théorie des types et NF, Bulletin de la Société Mathématique de Belgique, vol. 33 (1981), pp. 2131.Google Scholar
[4]Boffa, M. and Crabbé, M., Les théorèmes 3-stratifies de NF3, Comptes Rendus Hebdomadaires des Séances de l'Académie des Sciences de Paris, Séries A et B, vol. 280 (1975), pp. A1657A1658.Google Scholar
[5]Chang, C. C. and Keisler, H. J., Model theory, North-Holland, Amsterdam, 1975.Google Scholar
[6]Grišin, V. N., The method of stratification in set theory, Thesis, Academy of Sciences of the USSR, Moscow, 1973. (Russian)Google Scholar
[7]Grišin, V. N., Consistency of a fragment-of Quine's NF system, Soviet Mathematics: Doklady, vol. 10 (1969), pp. 13871390.Google Scholar
[8]Specker, E., The axiom of choice in Quine's new foundations for mathematical logic, Proceedings of the National Academy of Sciences of the United States of America, vol. 39 (1953), pp. 972975.CrossRefGoogle Scholar
[9]Specker, E., Typical ambiguity, Logic, methodology, and philosophy of science (Proceedings of the 1960 international congress; Nagel, E.et al, editors), Stanford University Press, Stanford, California, 1962, pp. 116124.Google Scholar