Sharp Weak Type Estimates for Maximal Operators associated to Rare Bases
Abstract
Let B denote a nonempty translation invariant collection of intervals in Rn (which we regard as a rare basis), and define the associated geometric maximal operator MB by MBf(x) = x ∈ R ∈ B 1|R|∫R |f|. We provide a sufficient condition on B so that the estimate |\x ∈ Rn : MBf(x) > α\|≤ Cn ∫Rn |f|α(1++|f|α)n-1 is sharp. As a corollary we obtain sharp weak type estimates for maximal operators associated to several classes of rare bases including C\'ordoba, Soria and Zygmund bases.
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