Efficient regularization with wavelet sparsity constraints in PAT
Abstract
In this paper we consider the reconstruction problem of photoacoustic tomography (PAT) with a flat observation surface. We develop a direct reconstruction method that employs regularization with wavelet sparsity constraints. To that end, we derive a wavelet-vaguelette decomposition (WVD) for the PAT forward operator and a corresponding explicit reconstruction formula in the case of exact data. In the case of noisy data, we combine the WVD reconstruction formula with soft-thresholding which yields a spatially adaptive estimation method. We demonstrate that our method is statistically optimal for white random noise if the unknown function is assumed to lie in any Besov-ball. We present generalizations of this approach and, in particular, we discuss the combination of vaguelette soft-thresholding with a TV prior. We also provide an efficient implementation of the vaguelette transform that leads to fast image reconstruction algorithms supported by numerical results.
Cite
@article{arxiv.1703.08240,
title = {Efficient regularization with wavelet sparsity constraints in PAT},
author = {Jürgen Frikel and Markus Haltmeier},
journal= {arXiv preprint arXiv:1703.08240},
year = {2017}
}
Comments
25 pages, 6 figures