Least squares QR-based decomposition provides an efficient way of computing optimal regularization parameter in photoacoustic tomography

Abstract. A computationally efficient approach that computes the optimal regularization parameter for the Tikhonov-minimization scheme is developed for photoacoustic imaging. This approach is based on the least squares-QR decomposition which is a well-known dimensionality reduction technique for a large system of equations. It is shown that the proposed framework is effective in terms of quantitative and qualitative reconstructions of initial pressure distribution enabled via finding an optimal regularization parameter. The computational efficiency and performance of the proposed method are shown using a test case of numerical blood vessel phantom, where the initial pressure is exactly known for quantitative comparison.

[1]  Vasilis Ntziachristos,et al.  Acceleration of Optoacoustic Model-Based Reconstruction Using Angular Image Discretization , 2012, IEEE Transactions on Medical Imaging.

[2]  B T Cox,et al.  k-Wave: MATLAB toolbox for the simulation and reconstruction of photoacoustic wave fields. , 2010, Journal of biomedical optics.

[3]  V. Ntziachristos,et al.  Model-based optoacoustic inversions with incomplete projection data. , 2011, Medical physics.

[4]  S. Jacques,et al.  Iterative reconstruction algorithm for optoacoustic imaging. , 2002, The Journal of the Acoustical Society of America.

[5]  Quing Zhu,et al.  Curved array photoacoustic tomographic system for small animal imaging. , 2008, Journal of biomedical optics.

[6]  M. Anastasio,et al.  Investigation of iterative image reconstruction in three-dimensional optoacoustic tomography , 2012, Physics in medicine and biology.

[7]  Jaya Prakash,et al.  A LSQR-type method provides a computationally efficient automated optimal choice of regularization parameter in diffuse optical tomography. , 2013, Medical physics.

[8]  Michael A. Saunders,et al.  LSQR: An Algorithm for Sparse Linear Equations and Sparse Least Squares , 1982, TOMS.

[9]  Phaneendra K Yalavarthy,et al.  Minimal residual method provides optimal regularization parameter for diffuse optical tomography , 2012, Journal of biomedical optics.

[10]  Manojit Pramanik,et al.  Design and evaluation of a novel breast cancer detection system combining both thermoacoustic (TA) and photoacoustic (PA) tomography. , 2008, Medical physics.

[11]  Lihong V. Wang,et al.  Photoacoustic Tomography: In Vivo Imaging from Organelles to Organs , 2012, Science.

[12]  Vasilis Ntziachristos,et al.  Accurate Model-Based Reconstruction Algorithm for Three-Dimensional Optoacoustic Tomography , 2012, IEEE Transactions on Medical Imaging.