Factorization in independent sums of Haar system Hardy spaces

Abstract

We introduce a generalization of the Bourgain-Rosenthal-Schechtman Rωp space: Let Y be a Haar system Hardy space, i.e., a separable rearrangement-invariant function space on the unit interval or an associated Hardy space defined via the square function (such as dyadic H1). Then we define Yω as the closed linear span in Y of independent distributional copies of the spaces Yn of dyadic step functions at scale 2-n. Combining finite-dimensional and infinite-dimensional techniques, we prove that the identity operator I on Yω factors through every bounded linear operator T on Yω which has large diagonal, and in general, the identity factors either through T or through I - T.