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Some remarks on the partition calculus of ordinals

Published online by Cambridge University Press:  12 March 2014

Péter Komjáth*
Affiliation:
Department of Computer Science, Eötvös University, Budapest, Múzeum Krt. 6–8, 1088, Hungary E-mail: [email protected]

Extract

One of the early partition relation theorems which include ordinals was the observation of Erdös and Rado [7] that if κ = cf(κ) > ω then the Dushnik–Miller theorem can be sharpened to κ→(κ, ω + 1)2. The question on the possible further extension of this result was answered by Hajnal who in [8] proved that the continuum hypothesis implies ω1 ↛ (ω1, ω + 2)2. He actually proved the stronger result ω1 ↛ (ω: 2))2. The consistency of the relation κ↛(κ, (ω: 2))2 was later extensively studied. Baumgartner [1] proved it for every κ which is the successor of a regular cardinal. Laver [9] showed that if κ is Mahlo there is a forcing notion which adds a witness for κ↛ (κ, (ω: 2))2 and preserves Mahloness, ω-Mahloness of κ, etc. We notice in connection with these results that λ→(λ, (ω: 2))2 holds if λ is singular, in fact λ→(λ, (μ: n))2 for n < ω, μ < λ (Theorem 4).

In [11] Todorčević proved that if cf(λ) > ω then a ccc forcing can add a counter-example to λ→(λ, ω + 2)2. We give an alternative proof of this (Theorem 5) and extend it to larger cardinals: if GCH holds, cf (λ) > κ = cf (κ) then < κ-closed, κ+-c.c. forcing adds a counter-example to λ→(λ, κ + 2)2 (Theorem 6).

Erdös and Hajnal remarked in their problem paper [5] that Galvin had proved ω2→(ω1, ω + 2)2 and he had also asked if ω2→(ω1, ω + 3)2 is true. We show in Theorem 1 that the negative relation is consistent.

Type
Research Article
Copyright
Copyright © Association for Symbolic Logic 1999

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References

REFERENCES

[1] Baumgartner, J. E., Almost-disjoint sets, the dense set problem, and the partition calculus, Annals of Mathematical Logic, vol. 10 (1976), pp. 401–439.Google Scholar
[2] Baumgartner, J. E. and Shelah, S., Remarks on superatomic Boolean algebras, Annals of Pure and Applied Logic, vol. 33 (1987), pp. 109–129.CrossRefGoogle Scholar
[3] Dushnik, B. and Miller, E.W., Concerning similarity transformations of linearly ordered sets, Bulletin of the American Mathematical Society, vol. 46 (1940), pp. 322–326.CrossRefGoogle Scholar
[4] Erdös, P. and Hajnal, A., Unsolved problems in set theory, Proceedings of symposia in pure mathematics XIII (Providence, Rhode Island), American Mathematical Society, 1971, pp. 17–48.Google Scholar
[5] Erdös, P. and Hajnal, A., Unsolved and solved problems in set theory, Proceedings of the Tarski Symposium (Berkeley, California 1971) (Providence, Rhode Island), American Mathematical Society, 1974, pp. 269–287.Google Scholar
[6] Erdös, P. and Hajnal, A., Máté, A., and Rado, R., Combinatorial set theory: Partition relation for cardinals, North-Holland, 1984.Google Scholar
[7] Erdös, P. and Rado, R., A partition calculus in set theory, Bulletin of the American Mathematical Society, vol. 62 (1956), pp. 427–489.CrossRefGoogle Scholar
[8] Hajnal, A., Some results and problems in set theory, Acta Mathematica Academlae Scientifica Hungarica, vol. 11 (1960), pp. 277–298.Google Scholar
[9] Laver, R., Partition relations for uncountable cardinals < , Infinite and finite sets, Keszthely, Hungary, Colloquia Mathematica Societatis János Bolyai, vol. 10, 1973, pp. 1029–1042.Google Scholar
[10] Todorčević, S., Forcing positive partition relation, Transactions of the American Mathematical Society, vol. 280 (1983), pp. 703–720.CrossRefGoogle Scholar
[11] Todorčević, S., Reals and positive partition relations, Logic, methodology, and philosophy of science, VII, Salzburg, 1983 (Amsterdam, New York), Studies in Logic, vol. 114, North-Holland, 1986, pp. 159–169.Google Scholar