Two Distinguished Subspaces of Product BMO and the Nehari--AAK Theory for Hankel Operators on the Torus

Abstract

In this paper we show that the theory of Hankel operators in the torus d, for d > 1, presents striking differences with that on the circle , starting with bounded Hankel operators with no bounded symbols. Such differences are circumvented here by replacing the space of symbols L∞ () by BMOr(d), a subspace of product BMO, and the singular numbers of Hankel operators by so-called sigma numbers. This leads to versions of the Nehari--AAK and Kronecker theorems, and provides conditions for the existence of solutions of product Pick problems through finite Pick-type matrices. We give geometric and duality characterizations of BMOr, and of a subspace of it, bmo, closely linked with A2 weights. This completes some aspects of the theory of BMO in product spaces.

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