Weighted estimates for positive operators and Doob maximal operators on filtered measure spaces
Wei Chen, Chunxiang Zhu, Yahui Zuo, Yong Jiao
TL;DR
This paper characterizes two-weight inequalities for positive and Doob maximal operators on filtered measure spaces, extending classical dyadic results with probabilistic and mixed bounds using principal sets.
Contribution
It introduces new two-weight inequality characterizations and mixed bounds for the Doob maximal operator on filtered measure spaces, generalizing prior dyadic cube results.
Findings
Established strong and weak type inequalities with two weights.
Derived Hyt"onen-Pérez and Lerner-Moen type norm estimates.
Developed a principal sets construction method.
Abstract
We characterize strong type and weak type inequalities with two weights for positive operators on filtered measure spaces. These estimates are probabilistic analogues of two-weight inequalities for positive operators associated to the dyadic cubes in due to Lacey, Sawyer and Uriarte-Tuero \cite{LaSaUr}. Several mixed bounds for the Doob maximal operator on filtered measure spaces are also obtained. In fact, Hyt\"{o}nen-P\'{e}rez type and Lerner-Moen type norm estimates for Doob maximal operator are established. Our approaches are mainly based on the construction of principal sets.
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Taxonomy
TopicsAdvanced Harmonic Analysis Research · Mathematical Analysis and Transform Methods · Advanced Banach Space Theory