Extremal Signatures
Abstract
Let E= A - iB be a Hermite-Biehler entire function of exponential type τ/2 where A and B are real entire, and consider dμ(x) = dx/|E(x)|2. We show that the sign of the product A B is an extremal signature for the space of functions of exponential type τ with respect to the norm of L1(μ). This allows us to find best approximations by entire functions of exponential type τ in L1(μ)-norm to certain special functions (e.g., the Gaussian and the Poisson kernel).
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