Scientific Reports (Oct 2024)

Radiation image reconstruction and uncertainty quantification using a Gaussian process prior

  • Jaewon Lee,
  • Tenzing H. Joshi,
  • Mark S. Bandstra,
  • Donald L. Gunter,
  • Brian J. Quiter,
  • Reynold J. Cooper,
  • Kai Vetter

DOI
https://doi.org/10.1038/s41598-024-71336-z
Journal volume & issue
Vol. 14, no. 1
pp. 1 – 17

Abstract

Read online

Abstract We propose a complete framework for Bayesian image reconstruction and uncertainty quantification based on a Gaussian process prior (GPP) to overcome limitations of maximum likelihood expectation maximization (ML-EM) image reconstruction algorithm. The prior distribution is constructed with a zero-mean Gaussian process (GP) with a choice of a covariance function, and a link function is used to map the Gaussian process to an image. Unlike many other maximum a posteriori approaches, our method offers highly interpretable hyperparamters that are selected automatically with the empirical Bayes method. Furthermore, the GP covariance function can be modified to incorporate a priori structural priors, enabling multi-modality imaging or contextual data fusion. Lastly, we illustrate that our approach lends itself to Bayesian uncertainty quantification techniques, such as the preconditioned Crank–Nicolson method and the Laplace approximation. The proposed framework is general and can be employed in most radiation image reconstruction problems, and we demonstrate it with simulated free-moving single detector radiation source imaging scenarios. We compare the reconstruction results from GPP and ML-EM, and show that the proposed method can significantly improve the image quality over ML-EM, all the while providing greater understanding of the source distribution via the uncertainty quantification capability. Furthermore, significant improvement of the image quality by incorporating a structural prior is illustrated.