On the Nevanlinna problem -- Characterization of all Schur-Agler class solutions affiliated with a given kernel

Abstract

Given a domain in Cm, and a finite set of points z1,z2,…, zn∈ and w1,w2,…, wn∈ D (the open unit disc in the complex plane), the Pick interpolation problem asks when there is a holomorphic function f: → D such that f(zi)=wi,1≤ i≤ n. Pick gave a condition on the data \zi, wi:1≤ i≤ n\ for such an interpolant to exist if =D. Nevanlinna characterized all possible functions f that interpolate the data. We generalize Nevanlinna's result to a domain in Cm admitting holomorphic test functions when the function f comes from the Schur-Agler class and is affiliated with a certain completely positive kernel. The Schur class is a naturally associated Banach algebra of functions with a domain. The success of the theory lies in characterizing the Schur class interpolating functions for three domains - the bidisc, the symmetrized bidisc and the annulus - which are affiliated to given kernels.