Optimal range of Haar martingale transforms and its applications

Abstract

Let (Fn)n 0 be the standard dyadic filtration on [0,1]. Let EFn be the conditional expectation from L1=L1[0,1] onto F n, n 0, and let EF -1 =0. We present the sharp estimate for the distribution function of the martingale transform T defined by align* Tf=Σm=0∞ ( EF2m f-EF2m-1f ), ~f∈ L1, align* in terms of the classical Calder\'on operator. As an application, for a given symmetric function space E on [0,1], we identify the symmetric space SE, the optimal Banach symmetric range of martingale transforms/Haar basis projections acting on E.