Quantitative results on continuity of the spectral factorization mapping in the scalar case
Abstract
In the scalar case, the spectral factorization mapping f f+ puts a nonnegative integrable function f having an integrable logarithm in correspondence with an outer analytic function f+ such that f = |f+|2 almost everywhere. The main question addressed here is to what extent \|f+ - g+\|H2 is controlled by \|f-g\|L1 and \| f - g\|L1.
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