Almost everywhere convergence of a wavelet-type Malmquist-Takenaka series
Abstract
The Malmquist-Takenaka (MT) system is a complete orthonormal system in H2(T) generated by an arbitrary sequence of points an in the unit disk with Σn (1-|an|) = ∞. The point an is responsible for multiplying the nth and subsequent terms of the system by a M\"obius transform taking an to 0. One can recover the classical trigonometric system, its perturbations or conformal transformations, as particular examples of the MT system. However, many interesting choices of the sequence an, the MT system is less understood. In this paper, we consider a wavelet-type MT system and prove its almost everywhere convergence in H2(T).
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