Inner approximations of doubling weights provide a sufficient density condition for zero sets of Toeplitz kernels with real analytic unimodular symbols and characterize admissible Beurling-Malliavin majorants in model spaces from meromorphic one-component inner functions.
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Inner approximations of doubling weights with applications to Beurling-Malliavin theory in Toeplitz kernels
Inner approximations of doubling weights provide a sufficient density condition for zero sets of Toeplitz kernels with real analytic unimodular symbols and characterize admissible Beurling-Malliavin majorants in model spaces from meromorphic one-component inner functions.