Invariant subspace of composition operators on Hardy space
Abstract
We consider the invariant subspace of composition operators on Hardy space Hp where the composition operators corresponding to a function that is a holomorphic self-map of D. Firstly, we discuss composition operators C on subspace Hα,βp of Hardy space Hp. We will explore the invariant subspaces for C in various special cases. Secondly, we consider Beurling type invariant subspace for C. When θ is a inner function, we prove that θ Hp is invariant for C if and only if θθ belongs to S( D). Thirdly, we obtain that znHp is nontrivial invariant subspace for Deddends algebras DC when C is a compact composition operator and satisfies that (0)=0 and ∞<1.
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