Commutators of automorphic composition operators with adjoints
Abstract
In this paper, we investigate the compactness of the commutator [C, C] on the Hardy space H2(BN) or the weighted Bergman space A2s(BN) (s>-1), when and are automorphisms of the unit ball BN. We obtain that [C, C] is compact if and only if and commute and they are both unitary. This generalizes the corresponding result in one variable. Moreover, our technique is different and simpler. In addition, we also discuss the commutator [C, C] on the Dirichlet space D(BN), where and are linear fractional self-maps or both automorphisms of BN.
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