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Strong bounded operators for ergodic averages and Lebesgue derivatives
Published online by Cambridge University Press: 03 August 2009
Abstract
The goal of this article is to give a new proof of there being strong type (p,p) bounds, for any p with 1>p>∞, for the class of square functions, oscillation operators and variation operators that arise when considering multiparameter differentiation and multiparameter ergodic averages. The method of proof is to first show that there is a strong estimate from L∞ to BMO for these operators in the case of multiparameter differentiation; then, by using known weak (1, 1) estimates and interpolation, one obtains strong bounds for these operators in the case of multiparameter differentiation. It follows from applying the Calderón transfer principle that these operators are of strong type (p,p), for all 1>p>∞, for the corresponding multiparameter ergodic averages.
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