Michael T. Jury, Robert T. W. Martin
Published 2021-08-09Version 1
We examine densely defined (but possibly unbounded) multiplication operators in Hilbert function spaces possessing a complete Nevanlinna-Pick (CNP) kernel. For such a densely defined operator $T$, the domains of $T$ and $T^*$ are reproducing kernel Hilbert spaces contractively contained in the ambient space. We study several aspects of these spaces, especially the domain of $T^*$, which can be viewed as analogs of the classical deBranges-Rovnyak spaces in the unit disk.
Equivalence of modes of convergence on reproducing kernel Hilbert spaces
Lipschitz and Hölder Continuity in Reproducing Kernel Hilbert Spaces
An $H^p$ scale for complete Pick spaces
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