Subnormality and composition operators on H2

The present paper shows that the algebra C C generated by C ¬ g Aut B is n 2 Ž . 2 Ž . cyclic on H B , and any nonconstant function f g H B is a cyclic vector of n n C C. In addition, the hypercyclic and cyclic composition operators will be discussed.

For an integer k ≥ 2, k th -order slant Toeplitz operator Uϕ [1] with symbol ϕ in L ∞ (T), where T is the unit circle in the complex plane, is an operator whose representing matrix M = (αij ) is given by αij = ϕ, z ki-j , where . , . is the usual inner product in L 2 (T). The operator Vϕ denotes the

## Abstract We characterize and provide examples of the analytic self‐maps of the unit disc, which induce isometric com‐position operators on the space __BMOA__ equipped with a Möbius invariant __H__^2^ norm (© 2010 WILEY‐VCH Verlag GmbH & Co. KGaA, Weinheim)

Let , be analytic functions defined on ‫,ބ‬ such that ‫ބ‬ : ‫.ބ‬ The operator Ž . given by f ¬ f ( is called a weighted composition operator. In this paper we deal with the boundedness, compactness, weak compactness, and complete continu-Ž . ity of weighted composition operators on Hardy spaces H 1