Abstract
We consider the set of all Toeplitz operators acting on the weighted Bergman space over the upper half-plane whose L∞-symbols depend only on the argument of the polar coordinates. The main result states that the uniform closure of this set coincides with the C*-algebra generated by the above Toeplitz operators and is isometrically isomorphic to the C*-algebra of bounded functions that are very slowly oscillating on the real line in the sense that they are uniformly continuous with respect to the arcsinh-metric on the real line.
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