Tomek Bartoszynski, Saharon Shelah
Published 1998-05-15, updated 2000-01-10Version 2
A set X subseteq R is strongly meager if for every measure zero set H, X+H not= R. Let SM denote the collection of strongly meager sets. We show that assuming CH, SM is not an ideal.
Strongly meager sets can be quite big
Strongly meager sets of size continuum
$omega_{1}$ under $Pi_{1}$-Collection
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