Uncertainty quantification for radio interferometric imaging  I. Proximal MCMC methods
Abstract
Uncertainty quantification is a critical missing component in radio interferometric imaging that will only become increasingly important as the bigdata era of radio interferometry emerges. Since radio interferometric imaging requires solving a highdimensional, illposed inverse problem, uncertainty quantification is difficult but also critical to the accurate scientific interpretation of radio observations. Statistical sampling approaches to perform Bayesian inference, like Markov chain Monte Carlo (MCMC) sampling, can in principle recover the full posterior distribution of the image, from which uncertainties can then be quantified. However, traditional highdimensional sampling methods are generally limited to smooth (e.g. Gaussian) priors and cannot be used with sparsitypromoting priors. Sparse priors, motivated by the theory of compressive sensing, have been shown to be highly effective for radio interferometric imaging. In this article proximal MCMC methods are developed for radio interferometric imaging, leveraging proximal calculus to support nondifferential priors, such as sparse priors, in a Bayesian framework. Furthermore, three strategies to quantify uncertainties using the recovered posterior distribution are developed: (i) local (pixelwise) credible intervals to provide error bars for each individual pixel; (ii) highest posterior density credible regions; and (iii) hypothesis testing of image structure. These forms of uncertainty quantification provide rich information for analysing radio interferometric observations in a statistically robust manner.
 Publication:

Monthly Notices of the Royal Astronomical Society
 Pub Date:
 November 2018
 DOI:
 10.1093/mnras/sty2004
 arXiv:
 arXiv:1711.04818
 Bibcode:
 2018MNRAS.480.4154C
 Keywords:

 methods: data analysis;
 methods: numerical;
 methods: statistical;
 techniques: image processing;
 techniques: interferometric;
 Astrophysics  Instrumentation and Methods for Astrophysics;
 Computer Science  Information Theory;
 Statistics  Methodology
 EPrint:
 16 pages, 7 figures, see companion article in this arXiv listing