Less than 2ω many translates of a compact nullset may cover the real line
Abstract
We answer a question of Darji and Keleti by proving that there exists a compact set C0⊂ of measure zero such that for every perfect set P⊂ there exists x∈ such that (C0+x) P is uncountable. Using this C0 we answer a question of Gruenhage by showing that it is consistent with ZFC (as it follows e.g. from cof()<2ω) that less than 2ω many translates of a compact set of measure zero can cover .
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