The covering number of the strong measure zero ideal can be above almost everything else

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Archive for Mathematical Logic 61 (5):599-610 (2022)
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Abstract

We show that certain type of tree forcings, including Sacks forcing, increases the covering of the strong measure zero ideal \. As a consequence, in Sacks model, such covering number is equal to the size of the continuum, which indicates that this covering number is consistently larger than any other classical cardinal invariant of the continuum. Even more, Sacks forcing can be used to force that \<\mathrm {cov}<\mathrm {cof}\), which is the first consistency result where more than two cardinal invariants associated with \ are pairwise different. Another consequence is that \ in ZFC where \ denotes Marczewski’s ideal.

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10.1007/s00153-021-00808-0

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Miguel A. Cardona
Hebrew University of Jerusalem

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References found in this work

Many simple cardinal invariants.Martin Goldstern & Saharon Shelah - 1993 - Archive for Mathematical Logic 32 (3):203-221.
The cofinality of the strong measure zero ideal.Teruyuki Yorioka - 2002 - Journal of Symbolic Logic 67 (4):1373-1384.
Finite support iteration and strong measure zero sets.Janusz Pawlikowski - 1990 - Journal of Symbolic Logic 55 (2):674-677.

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