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On shattering, splitting and reaping partitions | Lorenz Halbeisen
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16 Sep 2001 | Journal: | Mathematical Logic Quarterly 44 (1998) 123-134 | Subject: | Logic MSC-class: 03E05; 03E35; 03C25; 04A20; 05A18 | math.LO | Abstract: | In this article we investigate the dual-shattering cardinal H, the dual-splitting cardinal S and the dual-reaping cardinal R, which are dualizations of the well-known cardinals h (the shattering cardinal, also known as the distributivity number of P(omega) modulo finite, s (the splitting number) and r (the reaping number). Using some properties of the ideal J of nowhere dual-Ramsey sets, which is an ideal over the set of partitions of omega, we show that add(J)=cov(J)=H. With this result we can show that H > omega_1 is consistent with ZFC and as a corollary we get the relative consistency of H > t, where t is the tower number. Concerning S we show that cov(M) is less than or equal to S (where M is the ideal of the meager sets). For the dual-reaping cardinal R we get p is less than or equal to R, which is less than or equal to r (where p is the pseudo-intersection number) and for a modified dual-reaping number R’ we get that R’ is less than or equal to d (where d is the dominating number). As a consistency result we get R < cov(M). | Source: | arXiv, math.LO/0109099 | Other source: | [GID 791598] math.LO/0109099 | Services: | Forum | Review | PDF | Favorites |
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