On some questions about composition operators on weighted Hardy spaces
Abstract
We first consider some questions raised by N. Zorboska in her thesis. In particular she asked for which sequences β every symbol D D with ∈ H2 (β) induces a bounded composition operator Cφ on the weighted Hardy space H2 (β). We give partial answers and investigate when H2 (β) is an algebra. We answer negatively another question in showing that there are a sequence β and ∈ H2 (β) such that \| \|∞ < 1 and the composition operator C is not bounded on H2 (β). In a second part, we show that for p ≠ 2, no automorphism of D, except those that fix 0, induces a bounded composition operator on the Beurling-Sobolev space pA, and even on any weighted version of this space.
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