Geodesic
Sub-Bergman Hilbert spaces on the unit disk III
Canadian journal of mathematics, Tome 76 (2024) no. 5, pp. 1520-1537

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DOI

For a bounded analytic function $\varphi $ on the unit disk $\mathbb {D}$ with $\|\varphi \|_\infty \le 1$, we consider the defect operators $D_\varphi $ and $D_{\overline \varphi }$ of the Toeplitz operators $T_{\overline \varphi }$ and $T_\varphi $, respectively, on the weighted Bergman space $A^2_\alpha $. The ranges of $D_\varphi $ and $D_{\overline \varphi }$, written as $H(\varphi )$ and $H(\overline \varphi )$ and equipped with appropriate inner products, are called sub-Bergman spaces.We prove the following three results in the paper: for $-1<\alpha \le 0$, the space $H(\varphi )$ has a complete Nevanlinna–Pick kernel if and only if $\varphi $ is a Möbius map; for $\alpha>-1$, we have $H(\varphi )=H(\overline \varphi )=A^2_{\alpha -1}$ if and only if the defect operators $D_\varphi $ and $D_{\overline \varphi }$ are compact; and for $\alpha>-1$, we have $D^2_\varphi (A^2_\alpha )= D^2_{\overline \varphi }(A^2_\alpha )=A^2_{\alpha -2}$ if and only if $\varphi $ is a finite Blaschke product. In some sense, our restrictions on $\alpha $ here are best possible.
DOI : 10.4153/S0008414X23000494
Mots-clés : Bergman space, Nevanlinna–Pick kernel, Toeplitz operator, defect operator, sub-Bergman spaces 
Luo, Shuaibing; Zhu, Kehe. Sub-Bergman Hilbert spaces on the unit disk III. Canadian journal of mathematics, Tome 76 (2024) no. 5, pp. 1520-1537. doi: 10.4153/S0008414X23000494
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     title = {Sub-Bergman {Hilbert} spaces on the unit disk {III}},
     journal = {Canadian journal of mathematics},
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     year = {2024},
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