On directional maximal operators associated with generalized lacunary sets
Abstract
Let be any set of directions (unit vectors) on the plane. We study maximal operators defined by 0 M f(x)=δ >0, ω ∈ 12δ∫-δδ |f(x+tω)|dt. for the generalized lacunary sets associated with an integer μ >0. It is proved the following sharp inequality: \|M f(x)\|2 μ \|f\|2.
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