Mor Katz
Published 2015-03-20Version 1
We prove a simple criterion for essential normality of composition operators on the Hardy space induced by maps in a reasonably large class of analytic self-maps of the unit disk. By combining this criterion with boundary Carath\'{e}odory-Fej\'{e}r interpolation theory, we exhibit a parametrization for all rational self-maps of the unit disk which induce essentially normal composition operators.
Rigidity of composition operators on the Hardy space $H^p$
Toeplitzness of composition operators in several variables
Beurling's Theorem And Invariant Subspaces For The Shift On Hardy Spaces
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