B-spline interpolation problem in Hilbert C*-modules
Abstract
We introduce the -spline interpolation problem corresponding to a -valued sesquilinear form on a Hilbert -module and study its basic properties as well as the uniqueness of solution. We first study the problem in the case when the Hilbert -module is self-dual. Extending a bounded -valued sesquilinear form on a Hilbert -module to a sesquilinear form on its second dual, we then provide some necessary and sufficient conditions for the -spline interpolation problem to have a solution. Passing to the setting of Hilbert -modules, we present our main result by characterizing when the spline interpolation problem for the extended -valued sesquilinear to the dual of the Hilbert -module has a solution. As a consequence, we give a sufficient condition that for an orthogonally complemented submodule of a self-dual Hilbert -module is orthogonally complemented with respect to another -inner product on . Finally, solutions of the -spline interpolation problem for Hilbert -modules over -ideals of -algebras are extensively discussed. Several examples are provided to illustrate the existence or lack of a solution for the problem.
Keywords
Cite
@article{arxiv.2004.01444,
title = {B-spline interpolation problem in Hilbert C*-modules},
author = {Rasoul Eskandari and Michael Frank and Vladimir Manuilov and Mohammad Sal Moslehian},
journal= {arXiv preprint arXiv:2004.01444},
year = {2025}
}
Comments
25 pages, final version, to appear in J. Operator Theory