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Replacing One Theory by Another Under Preservation of a Given Feature

Published online by Cambridge University Press:  14 March 2022

Rolf A. Eberle
Rolf A. Eberle*
Affiliation:
The University of Rochester
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Extract

The conditions are examined under which one theory is said to be replaceable by another, while preserving those features of the original theory which made it serviceable for a given purpose. Among such replacements, special attention is given to ones which qualify as so-called reductions of a theory, and some theorems are proved concerning the notion of a reduction.

Type
Research Article
Information
Philosophy of Science , Volume 38 , Issue 4 , December 1971 , pp. 486 - 501
Copyright
Copyright © 1971 by The Philosophy of Science Association

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Footnotes

1

For their valuable suggestions I am especially indebted to Henry E. Kyburg, Jr., as well as to an anonymous referee whose specific criticism prompted some revisions and numerous additions.

References

[1] Adams, E. W. “The Foundations of Rigid Body Mechanics and the Derivation of its Laws from those of Particle Mechanics.” The Axiomatic Method. Edited by Henkin, L., Suppes, P., and Tarski, A. Amsterdam: North-Holland Publishing Company, 1959, pp. 250–65.Google Scholar
[2] Feyerabend, P. K. “Explanation, Reduction, and Empiricism.” Minnesota Studies in the Philosophy of Science, vol. 3. Edited by H. Feigl and G. Maxwell. Minneapolis: University of Minnesota Press, 1962, pp. 2897.Google Scholar
[3] Mates, B. Elementary Logic. Oxford University Press. 1965.Google Scholar
[4] Nagel, E. “The Meaning of Reduction in the Natural Sciences.” Philosophy of Science. Edited by Danto, A. and Morgenbesser, S. Cleveland: Meridian Books, 1960, pp. 288312.Google Scholar
[5] Quine, W. V. “Ontological Reduction and the World of Numbers.” The Ways of Paradox and Other Essays. New York: Random House, 1966, pp. 199207.Google Scholar
[6] Schaffner, K. F. “Approaches to Reduction.” Philosophy of Science 34 (June 1967): 137–47.CrossRefGoogle Scholar
[7] Suppes, P. Introduction to Logic. Princeton: Van Nostrand, 1957.Google Scholar
[8] Tarski, A. “On Some Fundamental Concepts of Metamathematics.” Logic, Semantics, Metamathematics. Oxford: 1956, pp. 3037.Google Scholar
[9] Tarski, A., Mostowski, A., and Robinson, R. M. Undecidable Theories. Amsterdam: North-Holland, 1953.Google Scholar