Boundary representations from constrained interpolation

Abstract

In this paper, we study C*-envelopes of finite-dimensional operator algebras arising from constrained interpolation problems on the unit disc. In particular, we consider interpolation problems for the algebra H∞node that consists of bounded analytic functions on the unit disk that satisfy f(0) = f(λ) for some 0 ≠ λ ∈ D. We show that there exist choices of four interpolation nodes that exclude both 0 and λ, such that if I is the ideal of functions that vanish at the interpolation nodes, then C*e(H∞node/I) 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 C*e(H∞node/I) for any choice of n interpolation nodes that do not contain the constrained points into Mn(G2nc), where G2nc is Brown's noncommutative Grassmannian.