Properties of local orthonormal systems, Part I: Unconditionality in Lp, 1<p<∞

Abstract

Assume that we are given a filtration ( Fn) on a probability space (, F, P) of the form that each Fn is generated by the partition of one atom of Fn-1 into two atoms of Fn having positive measure. Additionally, assume that we are given a finite-dimensional linear space S of F-measurable, bounded functions on so that on each atom A of any σ-algebra Fn, all Lp-norms of functions in S are comparable independently of n or A. Denote by Sn the space of functions that are given locally, on atoms of Fn, by functions in S and by Pn the orthoprojector (with respect to the inner product in L2()) onto Sn. Since S = span\1\ satisfies the above assumption and Pn is then the conditional expectation En with respect to Fn, for such filtrations, martingales ( En f) are special cases of our setting. We show in this article that certain convergence results that are known for martingales (or rather martingale differences) are also true in the general framework described above. More precisely, we show that the differences (Pn - Pn-1)f converge unconditionally and are democratic in Lp for 1<p<∞. This implies that those differences form a greedy basis in Lp-spaces for 1<p<∞.