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Kernels of vector-valued Toeplitz operators

Published 23 Jan 2010 in math.FA and math.CV | (1001.4210v1)

Abstract: Let $S$ be the shift operator on the Hardy space $H2$ and let $S*$ be its adjoint. A closed subspace $\FF$ of $H2$ is said to be nearly $S*$-invariant if every element $f\in\FF$ with $f(0)=0$ satisfies $S*f\in\FF$. In particular, the kernels of Toeplitz operators are nearly $S*$-invariant subspaces. Hitt gave the description of these subspaces. They are of the form $\FF=g (H2\ominus u H2)$ with $g\in H2$ and $u$ inner, $u(0)=0$. A very particular fact is that the operator of multiplication by $g$ acts as an isometry on $H2\ominus uH2$. Sarason obtained a characterization of the functions $g$ which act isometrically on $H2\ominus uH2$. Hayashi obtained the link between the symbol $\phii$ of a Toeplitz operator and the functions $g$ and $u$ to ensure that a given subspace $\FF=gK_u$ is the kernel of $T_\phii$. Chalendar, Chevrot and Partington studied the nearly $S*$-invariant subspaces for vector-valued functions. In this paper, we investigate the generalization of Sarason's and Hayashi's results in the vector-valued context.

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