No CrossRef data available.
Article contents
Combinator realizability of a constructive Morse set theory
Published online by Cambridge University Press: 12 March 2014
Extract
A constructive version of Morse set theory is given, based on Heyting's predicate calculus and with countable rather than full choice. An elaboration of the method of [5] is used to show that the theory is combinator-realizable in the sense defined there. The proof depends on the assumption of the syntactic consistency of the theory.
The method is introduced by first treating a subtheory without countable choice of foundation.
It is intended that the work can be read either classically or constructively, though whether the word constructive is correctly used as a description of either the theory or the metatheory is of course a matter of opinion.
- Type
- Research Article
- Information
- Copyright
- Copyright © Association for Symbolic Logic 1974
References
REFERENCES
[1]
Barendregt, Henk, Combinatory logic and the axiom of choice, Indagationes Mathematicae, vol. 35 (1973), pp. 205–221.Google Scholar
[2]
Friedman, H., Some applications of Kleene's methods for intuitionistic systems, Cambridge Summer School in Mathematical Logic (Mathias, A. R. D. and Rogers, H., Editors, Springer, 1973, pp. 113–170.Google Scholar
[4]
Myhill, John, Some properties of intuitionistic Zermelo-Freankel set theory, Cambridge Summer School in Mathematical Logic (Mathias, A. R. D. and Rogers, H., Editor), Springer, Berlin, 1973, pp. 206–231.Google Scholar
[5]
Staples, John, Combinator realizability of constructive finite type analysis, Cambridge Summer School in Mathematical Logic (Mathias, A. R. D. and Rogers, H., Editors), Springer, Berlin, 1973, pp. 253–273.Google Scholar