Factorization in Haar system Hardy spaces
Abstract
A Haar system Hardy space is the completion of the linear span of the Haar system (hI)I, either under a rearrangement-invariant norm \|· \| or under the associated square function norm equation* \| ΣIaIhI \|* = \| ( ΣI aI2 hI2 )1/2 \|. equation* Apart from Lp, 1 p<∞, the class of these spaces includes all separable rearrangement-invariant function spaces on [0,1] and also the dyadic Hardy space H1. Using a unified and systematic approach, we prove that a Haar system Hardy space Y with Y C() (C() denotes the continuous functions on the Cantor set) has the following properties, which are closely related to the primariness of Y: For every bounded linear operator T on Y, the identity IY factors either through T or through IY - T, and if T has large diagonal with respect to the Haar system, then the identity factors through T. In particular, we obtain that equation* MY = \ T∈ B(Y) : IY ATB for all A, B∈ B(Y) \ equation* is the unique maximal ideal of the algebra B(Y) of bounded linear operators on Y. Moreover, we prove similar factorization results for the spaces p(Y), 1 p ≤ ∞, and use them to show that they are primary.
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