The complete Pick property for pairs of kernels and Shimorin's factorization
Abstract
Let (Hk, H) be a pair of Hilbert function spaces with kernels k, . In a 2005 paper, Shimorin showed that a certain factorization condition on (k, ) yields a commutant lifting theorem for multipliers Hk, thus unifying and extending previous results due to Ball-Trent-Vinnikov and Volberg-Treil. Our main result is a strong converse to Shimorin's theorem for a large class of holomorphic pairs (k, ), which leads to a full characterization of the complete Pick property for such pairs. We also present a short alternative proof of sufficiency for Shimorin's condition. Finally, we establish necessary conditions for abstract pairs (k, ) to satisfy the complete Pick property, further generalizing Shimorin's work with proofs that are new even in the single-kernel case k=. Our approach differs from Shimorin's in that we do not work with the Nevanlinna-Pick problem directly; instead, we are able to extract vital information for (k, ) through Carath\'eodory-Fej\'er interpolation.
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