Parallel inverse-problem solver for time-domain optical tomography with perfect parallel scaling

• Main Authors: Bruno, O.P (Author), Gaggioli, E.L (Author)
• Format: Article
• Language: English
• Published: Elsevier Ltd 2022
• Subjects: Accurate modeling; Biological tissues; Boundary conditions; Computational costs; Decomposition strategy; Inverse problems; Optical tomography; Parallel computer systems; Parallel processing systems; Problem solvers; Radiative transfer; Satellites; Scalings; Time domain; Transfer equation; Transport problems
• Online Access: View Fulltext in Publisher

 This paper presents an efficient parallel radiative transfer-based inverse-problem solver for time-domain optical tomography. The radiative transfer equation provides a physically accurate model for the transport of photons in biological tissue, but the high computational cost associated with its solution has hindered its use in time-domain optical-tomography and other areas. In this paper this problem is tackled by means of a number of computational and modeling innovations, including (1) A spatial parallel-decomposition strategy with perfect parallel scaling for the forward and inverse problems of optical tomography on parallel computer systems; and, (2) A Multiple Staggered Source method (MSS) that solves the inverse transport problem at a computational cost that is independent of the number of sources employed, and which significantly accelerates the reconstruction of the optical parameters: a six-fold MSS acceleration factor is demonstrated in this paper. Finally, this contribution presents (3) An intuitive derivation of the adjoint-based formulation for evaluation of functional gradients, including the highly-relevant general Fresnel boundary conditions—thus, in particular, generalizing results previously available for vacuum boundary conditions. Solutions of large and realistic 2D inverse problems are presented in this paper, which were produced on a 256-core computer system. The combined parallel/MSS acceleration approach reduced the required computing times by several orders of magnitude, from months to a few hours. © 2022 Elsevier Ltd