<oai_dc:dc xmlns:oai_dc="http://www.openarchives.org/OAI/2.0/oai_dc/" xmlns:dc="http://purl.org/dc/elements/1.1/" xmlns:xsi="http://www.w3.org/2001/XMLSchema-instance" xsi:schemaLocation="http://www.openarchives.org/OAI/2.0/oai_dc/ http://www.openarchives.org/OAI/2.0/oai_dc.xsd">
<dc:title>Two theorems on star-invariant subspaces of BMOA</dc:title>
<dc:creator>Konstantin Dyakonov</dc:creator>
<dc:subject>30D45</dc:subject><dc:subject>30D50</dc:subject><dc:subject>30D55</dc:subject><dc:subject>inner functions</dc:subject><dc:subject>star-invariant subspaces</dc:subject><dc:subject>BMO</dc:subject>
<dc:description>For an inner function $\theta$, let $K^2_{\theta}:=H^2\ominus\theta H^2$ and $K_{*	heta}:=K^2_{\theta}\cap\mathrm{BMO}$. Two theorems are proved. The first of these provides a criterion for a coanalytic Toeplitz operator to map $K_{*\theta}$ into a given space $X$, under certain assumptions on the latter. In particular, many natural smoothness spaces are eligible as $X$. As a consequence, for such spaces one has $K_{*\theta}\subset X$ whenever $\theta\in X$. The second theorem concerns the relationship between $K_{*\theta}$ and its counterpart $\widetilde{K_{*\theta}}$, defined as the image of $K_{*\theta}$ under the natural involution $f\mapsto\bar{z}\bar{f}\theta$. Specifically, it is proved that the inner factors associated with the two classes are the same if and only if $\theta$ is a Blaschke product whose zeros satisfy the so-called uniform Frostman condition.</dc:description>
<dc:publisher>Indiana University Mathematics Journal</dc:publisher>
<dc:date>2007</dc:date>
<dc:type>text</dc:type>
<dc:format>pdf</dc:format>
<dc:identifier>10.1512/iumj.2007.56.2915</dc:identifier>
<dc:source>10.1512/iumj.2007.56.2915</dc:source>
<dc:language>en</dc:language>
<dc:relation>Indiana Univ. Math. J. 56 (2007) 643 - 658</dc:relation>
<dc:coverage>state-of-the-art mathematics</dc:coverage>
<dc:rights>http://iumj.org/access/</dc:rights>
</oai_dc:dc>