Resumen
We consider the C*-algebra generated by Toeplitz operators acting on the Bergman space over the upper half-plane whose symbols depend on the imaginary part of the argument only. Such algebra is known to be commutative, and is isometrically isomorphic to an algebra of bounded complex-valued functions on the positive half-line. In the paper we prove that the latter algebra consists of all bounded functions f that are very slowly oscillating in the sense that the composition of f with the exponential function is uniformly continuous or, in other words.
Idioma original | Inglés |
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Páginas (desde-hasta) | 149-166 |
Número de páginas | 18 |
Publicación | Integral Equations and Operator Theory |
Volumen | 77 |
N.º | 2 |
DOI | |
Estado | Publicada - oct. 2013 |