Multipliers on bi-parameter Haar system Hardy spaces

Abstract

Let (hI) denote the standard Haar system on [0,1], indexed by I∈ D, the set of dyadic intervals and hI hJ denote the tensor product (s,t) hI(s) hJ(t), I,J∈ D. We consider a class of two-parameter function spaces which are completions of the linear span V(δ2) of hI hJ, I,J∈ D. This class contains all the spaces of the form X(Y), where X and Y are either the Lebesgue spaces Lp[0,1] or the Hardy spaces Hp[0,1], 1 p<∞. We say that D X(Y) X(Y) is a Haar multiplier if D(hI hJ) = dI,J hI hJ, where dI,J∈ R, and ask which more elementary operators factor through D. A decisive role plays the Capon projection C V(δ2) V(δ2) given by C hI hJ = hI hJ if |I|≤ |J|, and C hI hJ = 0 if |I| > |J|, as our main result highlights: Given any bounded Haar multiplier D X(Y) X(Y), there exist λ,μ∈ R such that equation* λ C + μ (Id-C) approximately 1-projectionally factors through D, equation* i.e., for all η>0, there exist bounded operators A,B so that AB is the identity operator Id, \|A\|·\|B\|=1 and \|λ C + μ (Id-C) - ADB\|<η. Additionally, if C is unbounded on X(Y), then λ = μ and then Id either factors through D or Id-D.

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