English

Factorization in Haar system Hardy spaces

Functional Analysis 2025-04-25 v1

Abstract

A Haar system Hardy space is the completion of the linear span of the Haar system (hI)I(h_I)_I, either under a rearrangement-invariant norm \|\cdot \| or under the associated square function norm \begin{equation*} \Bigl\| \sum_Ia_Ih_I \Bigr\|_{*} = \Bigl\| \Bigl( \sum_I a_I^2 h_I^2 \Bigr)^{1/2} \Bigr\|. \end{equation*} Apart from LpL^p, 1p<1\le p<\infty, the class of these spaces includes all separable rearrangement-invariant function spaces on [0,1][0,1] and also the dyadic Hardy space H1H^1. Using a unified and systematic approach, we prove that a Haar system Hardy space YY with YC(Δ)Y\ne C(\Delta) (C(Δ)C(\Delta) denotes the continuous functions on the Cantor set) has the following properties, which are closely related to the primariness of YY: For every bounded linear operator TT on YY, the identity IYI_Y factors either through TT or through IYTI_Y - T, and if TT has large diagonal with respect to the Haar system, then the identity factors through TT. In particular, we obtain that \begin{equation*} \mathcal{M}_Y = \{ T\in \mathcal{B}(Y) : I_Y \ne ATB\text{ for all } A, B\in \mathcal{B}(Y) \} \end{equation*} is the unique maximal ideal of the algebra B(Y)\mathcal{B}(Y) of bounded linear operators on YY. Moreover, we prove similar factorization results for the spaces p(Y)\ell^p(Y), 1p1\le p \leq \infty, and use them to show that they are primary.

Keywords

Cite

@article{arxiv.2310.10572,
  title  = {Factorization in Haar system Hardy spaces},
  author = {Richard Lechner and Thomas Speckhofer},
  journal= {arXiv preprint arXiv:2310.10572},
  year   = {2025}
}

Comments

42 pages, 2 figures

R2 v1 2026-06-28T12:52:18.750Z