Boundary representations from constrained interpolation
Abstract
In this paper, we study -envelopes of finite-dimensional operator algebras arising from constrained interpolation problems on the unit disc. In particular, we consider interpolation problems for the algebra that consists of bounded analytic functions on the unit disk that satisfy for some . We show that there exist choices of four interpolation nodes that exclude both and , such that if is the ideal of functions that vanish at the interpolation nodes, then is infinite-dimensional. This differs markedly from the behavior of the algebra corresponding to interpolation nodes that contain the constrained points studied in the literature. Additionally, we use the distance formula to provide a completely isometric embedding of for any choice of interpolation nodes that do not contain the constrained points into , where is Brown's noncommutative Grassmannian.
Cite
@article{arxiv.2501.11027,
title = {Boundary representations from constrained interpolation},
author = {Gal Ben Ayun and Eli Shamovich},
journal= {arXiv preprint arXiv:2501.11027},
year = {2025}
}
Comments
second version. Fixed typos, notations, and structure. Improved some arguments