Jaydeb Sarkar
Published 2013-09-10, updated 2013-09-29Version 2
Let T be a C_{\cdot 0}-contraction on a Hilbert space H and S be a non-trivial closed subspace of H. We prove that S is a T-invariant subspace of H if and only if there exists a Hilbert space D and a partially isometric operator \Pi : H^2_D(\mathbb{D}) \raro H such that \Pi M_z = T \Pi and that S = ran \Pi, or equivalently, P_S = \Pi \Pi^*. As an application we completely classify the shift-invariant subspaces of C_{\cdot 0}-contractive and analytic reproducing kernel Hilbert spaces over the unit disc. Our results also includes the case of weighted Bergman spaces over the unit disk.
Comments: 8 pages. Improved and revised version. Several variables results will be treated in part II
An Invariant Subspace Theorem and Invariant Subspaces of Analytic Reproducing Kernel Hilbert Spaces - II
Sub-Hardy Hilbert spaces and the Bergman kernel on the unit disk
The complement of M(a) in H(b)
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