Large BMO spaces vs interpolation

Abstract

In this paper we introduce a class of BMO spaces which interpolate with Lp and are sufficiently large to serve as endpoints for new singular integral operators. More precisely, let (, , μ) be a σ-finite measure space. Consider two filtrations of by successive refinement of two atomic σ-algebras a, b having trivial intersection. Construct the corresponding truncated martingale BMO spaces. Then, the intersection seminorm only leaves out constants and we provide a quite flexible condition on (a, b) so that the resulting space interpolates with Lp in the expected way. In the presence of a metric d, we obtain endpoint estimates for Calder\'on-Zygmund operators on (,μ, d) under additional conditions on (a, b). These are weak forms of the isoperimetric and the locally doubling properties of Carbonaro/Mauceri/Meda which admit less concentration at the boundary. Examples of particular interest include densities of the form e |x|α for any α > 0 or (1 + |x|β)-1 for any β n3/2. A (limited) comparison with Tolsa's RBMO is also possible. On the other hand, a more intrinsic formulation yields a Calder\'on-Zygmund theory adapted to regular filtrations over (a, b) without using a metric. This generalizes well-known estimates for perfect dyadic and Haar shift operators. In contrast to previous approaches, ours extends to matrix-valued functions (via recent results from noncommutative martingale theory) for which only limited results are known and no satisfactory nondoubling theory exists so far.