Algebras on the disk and doubly commuting multiplication operators

Axler, Sheldon; Gorkin, Pamela

doi:10.1090/S0002-9947-1988-0961609-9

Algebras on the disk and doubly commuting multiplication operators
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by Sheldon Axler and Pamela Gorkin PDF

Trans. Amer. Math. Soc. 309 (1988), 711-723 Request permission

Abstract:

We prove that a bounded analytic function $f$ on the unit disk is in the little Bloch space if and only if the uniformly closed algebra on the disk generated by ${H^\infty }$ and $\overline f$ does not contain the complex conjugate of any interpolating Blaschke product. A version of this result is then used to prove that if $f$ and $g$ are bounded analytic functions on the unit disk such that the commutator ${T_f}T_g^{\ast } - T_g^{\ast }{T_f}$ (here ${T_f}$ denotes the operator of multiplication by $f$ on the Bergman space of the disk) is compact, then $(1 - |z{|^2})\min \{ |f’ (z)|,\;|g’ (z)|\} \to 0$ as $|z| \uparrow 1$.

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