Symmetries and reflections from composition operators in the disk
Abstract
We study the composition operators Ca acting on the Hardy space H2 of the unit disk, given by Caf=fa, where a(z)=a-z1-az, for |a|<1. These operators are reflections: Ca2=1. We study their eigenspaces N(Ca 1), their relative position (i.e., the intersections between these spaces and their orthogonal complementes for a b in the unit disk) and the symmetries induced by Ca and these eigenspaces.
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