Distinguished varieties and the Nevanlinna-Pick interpolation problem on the symmetrized bidisk

Abstract

Starting with a solvable Nevanlinna-Pick interpolation problem with the initial data coming from the symmetrized bidisk, this paper studies the corresponding uniqueness set, i.e., the largest set in the domain where all solutions to the problem coincide. It is shown that the uniqueness set coincides with an algebraic variety in the domain. The algebraic variety - canonically constructed from the interpolation data - is called the uniqueness variety. It was shown that the uniqueness variety contains a distinguished variety which by definition is the zero set of a two-variable polynomial that intersects the domain and exits through its distinguished boundary. A complete algebraic and geometric characterizations of distinguished varieties are obtained in this paper.