Pairs of Clark Unitary Operators on the Bidisk and their Taylor Joint Spectra

Abstract

We develop a Clark theory for commuting compressed shift operators on model spaces Kϕ associated with inner functions ϕ on the bidisk, which exhibits both similarities and marked differences compared to the classical one-variable version. We first identify the adjoint of the embedding operator Jα Kϕ L2(σα) as a weighted Cauchy transform of the Clark measure σα. Under natural assumptions, which generically include the case when ϕ is rational inner, we obtain commuting unitaries on Kϕ that are (often infinite-dimensional) perturbations of the compressed shift operators Kϕ. We prove that these unitaries are unitarily equivalent to multiplication by the coordinate functions on L2(σα) and then establish a number of related properties and simplified results in special cases. Finally, we show that the Taylor joint spectrum of these Clark unitaries coincides with level sets of ϕ when ϕ is a rational inner function.