Abstract. If $\varphi $ is an analytic map of the unit disk $D$ into itself, the composition operator $C_{\varphi }$ on the Hardy space $H^2(D)$ is defined by $C_{\varphi}(f) = f\circ\varphi$. For a certain class of composition operators with multivalent symbol $\varphi$, we identify a subspace of $H^2(D)$ on which $C^*_{\varphi}$ behaves like a weighted shift. We reproduce the description of the spectrum found in [Kam75] and show for this class of composition operators that the interior of the spectrum is a disk of eigenvalues of $C^*_{\varphi}$ of infinite multiplicity.
AMS Subject Classification
(1991): 47B38
Received February 9, 1999. (Registered under 2766/2009.)
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