Open AccessQuantitative Estimates of Sampling Constants in Model Spaces
Author(s) -
Andreas Hartmann,
Philippe Jaming,
Karim Kellay
Publication year - 2020
Publication title -
american journal of mathematics
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 3.818
H-Index - 67
eISSN - 1080-6377
pISSN - 0002-9327
DOI - 10.1353/ajm.2020.0029
Subject(s) - mathematics , meromorphic function , bounded function , sampling (signal processing) , measure (data warehouse) , constant (computer programming) , characterization (materials science) , pure mathematics , nyquist–shannon sampling theorem , function (biology) , component (thermodynamics) , mathematical analysis , materials science , physics , filter (signal processing) , evolutionary biology , computer science , computer vision , biology , programming language , nanotechnology , thermodynamics , database
We establish quantitative estimates for sampling (dominating) sets in model spaces associated with meromorphic inner functions, i.e. those corresponding to de Branges spaces. Our results encompass the Logvinenko-Sereda-Panejah (LSP) Theorem including Kovrijkine's optimal sampling constants for Paley-Wiener spaces. It also extends Dyakonov's LSP theoremfor model spaces associated with bounded derivative inner functions. Considering meromorphic inner functions allows us tointroduce a new geometric density condition, in terms of which the sampling sets are completely characterized. This, incomparison to Volberg's characterization of sampling measures in terms of harmonic measure, enables us to obtain explicitestimates on the sampling constants. The methods combine Baranov-Bernstein inequalities, reverse Carleson measures andRemez inequalities .
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