The Stein Str\"omberg Covering Theorem in metric spaces
Abstract
In NaTa Naor and Tao extended to the metric setting the O(d d) bounds given by Stein and Str\"omberg for Lebesgue measure in Rd, deriving these bounds first from a localization result, and second, from a random Vitali lemma. Here we show that the Stein-Str\"omberg original argument can also be adapted to the metric setting, giving a third proof. We also weaken the hypotheses, and additionally, we sharpen the estimates for Lebesgue measure.
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