Equivalence of sparse and Carleson coefficients for general sets
classification
🧮 math.CA
keywords
carlesoncoefficientssetsdyadicgeneralsparsebi-parameterborel
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We remark that sparse and Carleson coefficients are equivalent for every countable collection of Borel sets and hence, in particular, for dyadic rectangles, the case relevant to the theory of bi-parameter singular integrals. The key observation is that a dual refomulation by I. E. Verbitsky for Carleson coefficients over dyadic cubes holds also for Carleson coefficients over general sets. We give a simple proof for this reformulation.
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Cited by 1 Pith paper
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Counterexamples for bi-parameter Carleson embedding
Several counterexamples are built for the two-weight bi-parameter Carleson embedding theorem.
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