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Infinite exponent partition relations and well-ordered choice1

Published online by Cambridge University Press:  12 March 2014

E. M. Kleinberg
Affiliation:
Massachusetts Institute of Technology, Cambridge, Massachusetts 02139
J. I. Seiferas
Affiliation:
Massachusetts Institute of Technology, Cambridge, Massachusetts 02139

Extract

The study of partition relations for cardinal numbers introduced by Erdös and his school in the 1950's has, for the past several years, had a profound impact in logic. Unfortunately, quite early in their development, it was noticed by Rado [1] that the potentially most fruitful class of such relations, infinite exponent partition relations, were always in contradiction with the axiom of choice (AC). As a result, such relations were overlooked. This turned out to be a mistake; for, as has been noticed recently, a close study of infinite exponent partition relations is both interesting and rewarding. For example, there are weakened versions of such relations which are provable in ZF and which have valuable applications in recursion theory and set theory. In addition, the pure theory of these relations, like that of the axiom of determinateness, is fruitful as well as elegant. For more background here one should refer to [3].

At any rate, with a more detailed look at infinite exponent partition relations came a more refined version of Rado's original theorem. Specifically, Rado used the full axiom of choice to carefully construct partitions to violate any desired relation—a more sophisticated look at the actual theory of such relations indicated how one could put together some desired partitions using only well-ordered choice [3].

The distinction between well-ordered choice and full choice is by no means vacuous in this context. For Mathias has shown [4] that the simplest infinite exponent partition relation, ω → (ω)ω, is consistent with countable choice (well-ordered choice of length ℵ0) and, in fact, is consistent with dependent choice.

Type
Research Article
Copyright
Copyright © Association for Symbolic Logic 1973

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Footnotes

1

The first author was partially supported by a Moore Instructorship at M.I.T. and by NSF grant GP-29079.

References

REFERENCES

[1]Erdös, P. and Rado, R., Combinatorial theorems on classification of subsets of a given set, Proceedings of the London Mathematical Society (3), vol. 2 (1952), pp. 417439.CrossRefGoogle Scholar
[2]Felgner, Ulrich, Models of ZF-set theory, Lecture Notes in Mathematics, no. 223, Springer-Verlag, New York, 1971, pp. 148149.Google Scholar
[3]Kleinberg, E. M., Strong partition properties for infinite cardinals, this Journal, vol. 35 (1970), pp. 410428.Google Scholar
[4]Mathias, A. R. D., On a generalization of Ramsey's theorem, Doctoral Dissertation, Peterhouse, Cambridge, England.Google Scholar