A characterization of the uniform strong type (1,1) bounds for averaging operators
Abstract
We prove that in a metric measure space (X, d, μ), the averaging operators Ar, μ satisfy a uniform strong type (1,1) bound r, μ \|Ar, μ \|L1 L1 < ∞ if and only if X satisfies a certain geometric condition, the equal radius Besicovitch intersection property.
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