Dimension dependence of factorization problems: Haar system Hardy spaces

Abstract

For n∈ N, let Yn denote the linear span of the first n+1 levels of the Haar system in a Haar system Hardy space Y (this class contains all separable rearrangement-invariant function spaces and also related spaces such as dyadic H1). Let IYn denote the identity operator on Yn. We prove the following quantitative factorization result: Fix ,δ, > 0, and let n,N ∈ N be chosen such that N Cn2, where C = C(,δ,) > 0 (this amounts to a quasi-polynomial dependence between YN and Yn). Then for every linear operator T YN YN with \|T\| , there exist operators A,B with \|A\|\|B\| 2(1+) such that either IYn = ATB or IYn = A(IYN - T)B. Moreover, if T has δ-large positive diagonal with respect to the Haar system, then we have IYn = ATB for some A,B with \|A\|\|B\| (1+)/δ. If the Haar system is unconditional in Y, then an inequality of the form N Cn is sufficient for the above statements to hold (hence, YN depends polynomially on Yn). Finally, we prove an analogous result in the case where T has large but not necessarily positive diagonal entries.

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