Operator-Valued Hardy spaces and BMO Spaces on Spaces of Homogeneous Type
Abstract
Let M be a von Neumann algebra equipped with a normal semifinite faithful trace, (X,\,d,\,μ) be a space of homogeneous type in the sense of Coifman and Weiss, and N=L∞(X)M. In this paper, we introduce and then conduct a systematic study on the operator-valued Hardy space Hp(X,\,M) for all 1≤ p<∞ and operator-valued BMO space BMO(X,\,M). The main results of this paper include H1--BMO duality theorem, atomic decomposition of H1(X,\,M), interpolation between these Hardy spaces and BMO spaces, and equivalence between mixture Hardy spaces and Lp-spaces. %Compared with the communcative results, the novelty of this article is that μ is not assumed to satisfy the reverse double condition. %The approaches we develop bypass the use of harmonicity of infinitesimal generator, which allows us to extend Mei's seminal work m07 to a broader setting. %Our results extend Mei's seminal work m07 to a broader setting. In particular, without the use of non-commutative martingale theory as in Mei's seminal work m07, we provide a direct proof for the interpolation theory. Moreover, under our assumption on Calder\'on representation formula, these results are even new when going back to the commutative setting for spaces of homogeneous type which fails to satisfy reverse doubling condition. As an application, we obtain the Lp(N)-boundedness of operator-valued Calder\'on-Zygmund operators.
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