Complex symmetry of Composition operators induced by involutive Ball automorphisms
Abstract
Suppose H is a weighted Hardy space of analytic functions on the unit ball Bn⊂Cn such that the composition operator C defined by Cf=f is bounded on H whenever is a linear fractional self-map of Bn. If is an involutive Moebius automorphism of Bn, we find a conjugation operator J on H such that C=J C*J. The case n=1 answers a question of Garcia and Hammond.
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