The spectrum of composition operators induced by a rotation in the space of all analytic functions on the disc
Abstract
A characterization of those points in the unit disc which belong to the spectrum of a composition operator C, defined by a rotation (z)=rz with |r|=1, on the space H0(D) of all analytic functions on the unit disc which vanish at 0, is given. Examples show that the point 1 may or may not belong to the spectrum of C, and this is related to Diophantine approximation. Our results complement recent work by Arendt, Celari\`es and Chalendar.
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