The Feichtinger conjecture for reproducing kernels in model subspaces

Anton Baranov; Konstantin Dyakonov

arXiv:0906.2158·math.CV·December 26, 2011·2 cites

The Feichtinger conjecture for reproducing kernels in model subspaces

Anton Baranov, Konstantin Dyakonov

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Abstract

We obtain two results concerning the Feichtinger conjecture for systems of normalized reproducing kernels in the model subspace $K_{Θ} = H^{2} ⊖ Θ H^{2}$ of the Hardy space $H^{2}$ , where $Θ$ is an inner function. First, we verify the Feichtinger conjecture for the kernels $\tilde{k}_{λ_{n}} = k_{λ_{n}} /∥ k_{λ_{n}} ∥$ under the assumption that $sup_{n} ∣Θ (λ_{n}) ∣ < 1$ . Secondly, we prove the Feichtinger conjecture in the case where $Θ$ is a one-component inner function, meaning that the set ${z : ∣Θ (z) ∣ < ε}$ is connected for some $ε \in (0, 1)$ .

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TopicsHolomorphic and Operator Theory · Spectral Theory in Mathematical Physics · Algebraic and Geometric Analysis