Charles J. G. Morgan, Samuel G. Da Silva
Published 2016-09-19Version 1
The second author has recently shown ([20]) that any selectively (a) almost disjoint family must have cardinality strictly less than $2^{\alpeh_0}$, so under the Continuum Hypothesis such a family is necessarily countable. However, it is also shown in the same paper that $2^{\alpeh_0} < 2^{\alpeh_1}$ alone does not avoid the existence of uncountable selectively (a) almost disjoint families. We show in this paper that a certain effective parametrized weak diamond principle is enough to ensure countability of the almost disjoint family in this context. We also discuss the deductive strength of this specific weak diamond principle (which is consistent with the negation of the Continuum Hypothesis, apart from other features).
Comments: 17 pages
Journal: Houston Journal of Mathematics, Volume 42, No. 3, 2016, pp. 1031-1046
Maximal almost disjoint families and pseudocompactness of hyperspaces
Universal flows and automorphisms of $\mathcal P(ω)/\mathrm{fin}$
New Hindman spaces
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