On the sweeping out property for convolution operators of discrete measures
Abstract
Let μn be a sequence of discrete measures on the unit =/ with μn(0)=0, and μn((-δ,δ)) 1, as n∞. We prove that the sequence of convolution operators (fμn)(x) is strong sweeping out, i.e. there exists a set E⊂ such that 0 n∞(Eμn)(x)= 1, ∈fn∞(Eμn)(x)= 0, almost everywhere on .
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