“School of Mathematics”
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| Paper IPM / M / 7371 | ||||||||||||||||||||
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A bounded linear operator T on a separable Hilbert space
H is called reflexive power if Tn is reflexive for
every n ≥ 1. In this note sufficient conditions are given so
that the operator Mz of multiplication by z on a Hilbert
space of functions analytic on a domain Ω, is reflexive
power. Also we discuss it when the underlying space can be certain
Banach spaces.
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