Paper Info
Title
A Novel Sparsity Reconstruction Method from Poisson Data for 3D Bioluminescence Tomography
Abstract
In this paper, we consider 3D Bioluminescence tomography (BLT) source reconstruction from Poisson data in three dimensional space. With a priori information of sources sparsity and MAP estimation of Poisson distribution, we study the minimization of Kullback-Leihbler divergence with 驴 1 and 驴 0 regularization. We show numerically that although several 驴 1 minimization algorithms are efficient for compressive sensing, they fail for BLT reconstruction due to the high coherence of the measurement matrix columns and high nonlinearity of Poisson fitting term. Instead, we propose a novel greedy algorithm for 驴 0 regularization to reconstruct sparse solutions for BLT problem. Numerical experiments on synthetic data obtained by the finite element methods and Monte-Carlo methods show the accuracy and efficiency of the proposed method.
Year
DOI
Venue
2012
10.1007/s10915-011-9533-z
J. Sci. Comput.
Keywords
Field
DocType
source reconstruction,poisson data,high coherence,bioluminescence tomography,poisson distribution,blt problem,blt reconstruction,poisson fitting term,minimization algorithm,novel sparsity reconstruction method,synthetic data,high nonlinearity
Matching pursuit,Mathematical optimization,A priori and a posteriori,Greedy algorithm,Synthetic data,Regularization (mathematics),Poisson distribution,Shot noise,Mathematics,Compressed sensing
Journal
Volume
Issue
ISSN
50
3
1573-7691
Citations 
PageRank 
References 
12
0.72
14
Authors
3
Name
Order
Citations
PageRank
Xiaoqun Zhang168429.21
Yujie Lu2192.83
Tony F. Chan360349.56