A Note on the Boundedness of Doob Maximal Operators on a Filtered Measure Space

Abstract

Let M be the Doob maximal operator on a filtered measure space and let v be an Ap weight with 1<p<+∞. We try proving that equation M f L p(v) ≤ p[v]1p-1Ap f L p (v),equation where 1/p+1/p=1. Although we do not find an approach which gives the constant p, we obtain that equation M f L p(v) ≤ p1p-1p[v]1p-1Ap f L p (v), equation with p→+∞p1p-1=1.