Contractive Hilbert modules and their dilations
Abstract
In this note, we show that a quasi-free Hilbert module R defined over the polydisk algebra with kernel function k(z, w) admits a unique minimal dilation (actually an isometric co-extension) to the Hardy module over the polydisk if and only if S^{-1}(z, w) k(z, w) is a positive kernel function, where S(z, w) is the Szeg\"{o} kernel for the polydisk. Moreover, we establish the equivalence of such a factorization of the kernel function and a positivity condition, defined using the hereditary functional calculus, which was introduced earlier by Athavale \cite{Ath} and Ambrozie, Englis and M\"{u}ller. An explicit realization of the dilation space is given along with the isometric embedding of the module R in it. The proof works for a wider class of Hilbert modules in which the Hardy module is replaced by more general quasi-free Hilbert modules such as the classical spaces on the polydisk or the unit ball in {C}^m. Some consequences of this more general result are then explored in the case of several natural function algebras.
Cite
@article{arxiv.0907.0026,
title = {Contractive Hilbert modules and their dilations},
author = {Ronald G. Douglas and Gadadhar Misra and Jaydeb Sarkar},
journal= {arXiv preprint arXiv:0907.0026},
year = {2010}
}
Comments
17 pages. Title changed, Improved presentation, Typos corrected. To appear in the Israel Journal of Mathematics