Maximal inequalities and weighted BMO processes

Abstract

For a general adapted integrable right-continuous with left limits (RCLL) process (Xt)t∈[0,τ] taking values in a metric space ( E,d), we show (among other things) that for every m∈(1,∞) m-12m-1\|t∈[0,τ]E(d(Xt-,Xτ)| Ft)\|m \|t∈[0,τ]d(X0,Xt)\|m cm2m-1 \|t∈[0,τ]E(d(Xt-,Xτ)| Ft)\|m with a universal constant c. This is a probabilistic version of Fefferman--Stein estimate for the sharp maximal functions. While the former inequality is derived easily from Doob's martingale inequality, the later inequality is a consequence of John--Nirenberg inequalities for weighted BMO processes, which are obtained in this note. We explain how John--Nirenberg inequalities can be utilized to obtain inequalities for martingales, both old and new alike in a unified way.

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