Automorphisms of subalgebras of bounded analytic functions
Abstract
Let H∞ denote the algebra of all bounded analytic functions on the unit disk. It is well-known that every (algebra) automorphism of H∞ is a composition operator induced by disc automorphism. Maurya et al., (J. Math. Anal. Appl. 530 : Paper No: 127698, 2024) proved that every automorphism of the subalgebras \f∈ H∞ : f(0) = 0\ or \f∈ H∞ : f'(0) = 0\ is a composition operator induced by a rotation. In this article, we give very simple proof of their results. As an interesting generalization, for any ∈ H∞, we show that every automorphism of H∞ must be a composition operator and characterize all such composition operators. Using this characterization, we find all automorphism of H∞ for few choices of with various nature depending on its zeros.
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