Super-wavelets versus poly-Bergman spaces
Abstract
Motivated by potential applications in multiplexing and by recent results on Gabor analysis with Hermite windows due to Gr\"{o}chenig and Lyubarskii, we investigate vector-valued wavelet transforms and vector-valued wavelet frames, which constitute special cases of super-wavelets, with a particular attention to the case when the analyzing wavelet vector is related to Fourier transforms of Laguerre functions. We construct an isometric isomorphism between and poly-Bergman spaces, with a view to relate the sampling sequences in the poly-Bergman spaces to the wavelet frames and super-frames with the windows . One of the applications of the theory is a proof that is a necessary condition for the (scalar) wavelet frame associated to the to exist. This seems to be the first known result of this type outside the setting of analytic functions (the case , which has been completely studied by Seip in 1993).
Keywords
Cite
@article{arxiv.0909.4830,
title = {Super-wavelets versus poly-Bergman spaces},
author = {Luis Daniel Abreu},
journal= {arXiv preprint arXiv:0909.4830},
year = {2009}
}
Comments
Preliminar version; 19 pages