Clark model in general situation
Abstract
For a unitary operator the family of its unitary perturbations by rank one operators with fixed range is parametrized by a complex parameter . Namely all such unitary perturbations are , where . For operators are contractions with one-dimensional defects. Restricting our attention on the non-trivial part of perturbation we assume that is cyclic for . Then the operator , is a completely non-unitary contraction, and thus unitarily equivalent to its functional model , which is the compression of the multiplication by the independent variable onto the model space , where is the characteristic function of the contraction . The Clark operator is a unitary operator intertwining and its model , . If spectral measure of is purely singular (equivalently, is inner), operator was described from a slightly different point of view by D. Clark. When is extreme point of the unit ball in was treated by D. Sarason using the sub-Hardy spaces introduced by L. de Branges. We treat the general case and give a systematic presentation of the subject. We find a formula for the adjoint operator which is represented by a singular integral operator, generalizing the normalized Cauchy transform studied by A. Poltoratskii. We present a "universal" representation that works for any transcription of the functional model. We then give the formulas adapted for the Sz.-Nagy--Foias and de Branges--Rovnyak transcriptions, and finally obtain the representation of .
Cite
@article{arxiv.1308.3298,
title = {Clark model in general situation},
author = {Constanze Liaw and Sergei Treil},
journal= {arXiv preprint arXiv:1308.3298},
year = {2017}
}
Comments
34 pages. 8/17/2013: changed the arXiv abstract, so the symbols display correctly; no changes in the text