Sampling theorems and compressive sensing on the sphere
Abstract
We discuss a novel sampling theorem on the sphere developed by McEwen & Wiaux recently through an association between the sphere and the torus. To represent a band-limited signal exactly, this new sampling theorem requires less than half the number of samples of other equiangular sampling theorems on the sphere, such as the canonical Driscoll & Healy sampling theorem. A reduction in the number of samples required to represent a band-limited signal on the sphere has important implications for compressive sensing, both in terms of the dimensionality and sparsity of signals. We illustrate the impact of this property with an inpainting problem on the sphere, where we show superior reconstruction performance when adopting the new sampling theorem.
Cite
@article{arxiv.1110.6297,
title = {Sampling theorems and compressive sensing on the sphere},
author = {J. D. McEwen and G. Puy and J. -Ph. Thiran and P. Vandergheynst and D. Van De Ville and Y. Wiaux},
journal= {arXiv preprint arXiv:1110.6297},
year = {2013}
}
Comments
9 pages, 2 figures, Proceedings of Wavelets and Sparsity XIV, SPIE Optics and Photonics 2011