Algebras associated with Blaschke products of type G
Abstract
Let and be the sets of all interpolating Blaschke products of type G and of finite type G, respectively. Let E and E be the Douglas algebras generated by H∞ together with the complex conjugates of elements of and , respectively. We show that the set of all invertible inner functions in E is the set of all finite products of elements of , which is also the closure of among the Blaschke products. Consequently, finite convex combinations of finite products of elements of are dense in the closed unit ball of the subalgebra of H∞ generated by . The same results hold when we replace by and E by E.
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