Abstract
This article is the second of a two part series on de Branges spaces of vector valued functions and their applications. This part focuses on applications to direct and inverse problems for canonical differential systems and Dirac–Kreĭn systems. The exposition is again divided into a number of short sections, each of which focuses on one topic. The list of topics covered includes: spectral functions for the spaces \(\mathcal{H}(U)\) and \(\mathcal{B}(\mathfrak{E})\), generalized Fourier transforms, direct and inverse spectral problems for regular canonical differential systems, the Kreĭn accelerant extension problem, the inverse monodromy problem, other directions. The notation is the same as in the first part.
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Arov, D.Z., Dym, H. (2015). Applications of de Branges Spaces of Vector-Valued Functions. In: Alpay, D. (eds) Operator Theory. Springer, Basel. https://doi.org/10.1007/978-3-0348-0667-1_1
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