Unitary perturbations of compressed N-dimensional shifts

Abstract

Given a purely contractive matrix-valued analytic function on the unit disc D, we study the U (n)-parameter family of unitary perturbations of the operator Z of multiplication by z in the Hilbert space L2 of n-component vector-valued functions on the unit circle T which are square integrable with respect to the matrix-valued measure determined uniquely by and the matrix-valued Herglotz representation theorem. In the case where is an extreme point of the unit ball of bounded Mn-valued functions we verify that the U (n)-parameter family of unitary perturbations of Z * is unitarily equivalent to a U (n)-parameter family of unitary perturbations of X, the restriction of the backwards shift in H2n (D), the Hardy space of C n valued functions on the unit disc, to K2, the de Branges-Rovnyak space constructed using . These perturbations are higher dimensional analogues of the unitary perturbations introduced by D.N. Clark in the case where is a scalar-valued (n=1) inner function, and studied by E. Fricain in the case where is scalar-valued and an extreme point of the unit ball of H∞ (D)... A matrix-valued disintegration theorem for the Aleksandrov-Clark measures associated with matrix-valued contractive analytic functions is obtained as a consequence of the Weyl integration formula for U(n) applied to the family of unitary perturbations of Z...