Probability method for Cerenkov luminescence tomography based on conformance error minimization

Ding, Xintao; Wang, Kun; Jie, Biao; Luo, Yonglong; Hu, Zhenhua; Hui, Hui

doi:10.1364/boe.5.002091

Cited by 25 publications

(11 citation statements)

References 47 publications

(81 reference statements)

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“…In order to further improve the accuracy and efficiency for reconstruction, it is essential to use the iterative solution method to obtain meaningful solutions. The optimization problems of the objective function in (34) are solved by using the following iterative solution methods to improve the accuracy and efficiency for reconstruction such as the Newton method [96], conjugate gradient method [85,97], augmented Lagrangian method [98], primal-dual interior-point method [99], iterative shrinkage method [100,101], Split Bregman method [88,[102][103][104], projection method [86,95,105] and probability method [76,106]. In order to test the performance of the regularization methods and iterative solution methods, Figure 3 has been given http://engine.scichina.com/doi/10.1007/s11432-014-5222-5 depicting the experimental results of the subspace pursuit method that has been employed for solving the sparse regularization.…”

Section: The Iterative Solution Methodsmentioning

confidence: 99%

Mathematical method in optical molecular imaging

Leng

Tian

2015

Sci. China Inf. Sci.

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Optical molecular imaging is an important technique of studies at molecular level and provides promising tools to non-invasively delineate in vivo physiological and pathological activities at cellular and molecular levels, and it has been widely used for diagnosing, managing diseases, metastasis detection and drug development. From a mathematical perspective, this paper mainly focuses on the forward problem and inverse problem in biological tissues based on the radiative transfer equation (RTE). The forward problem is accustomed to describing photon propagation in biological tissues and the inverse problem is used to reconstruct internal source distribution from the signal detected on the external surface. We also introduce the detailed derivation of the RTE and Robin boundary condition and discretization of the forward problem, along with the reconstruction methods and iterative solution algorithms summarized for the inverse problem. Finally, the current and future challenges of optical molecular imaging are discussed. This survey aims to construct a mathematical method, a state-of-the-art framework for optical molecular imaging, from which future research may benefit.

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Section: The Iterative Solution Methodsmentioning

confidence: 99%

Mathematical method in optical molecular imaging

Leng

Tian

2015

Sci. China Inf. Sci.

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“…The 3D anatomical imaging modality, such as computed tomography (CT) or magnetic resonance imaging (MRI), provides a spatial outline of the imaging subjects. Based on the outline and Cerenkov luminescence images, the 3D distribution of Cerenkov source is acquired by solving the diffusion equation [14]. It is considered that CLT is a highly promising imaging modality for clinical applications owing to its semi-quantitative analysis capability of in vivo radiopharmaceuticals distribution [15].…”

Section: Introductionmentioning

confidence: 99%

Non-Negative Iterative Convex Refinement Approach for Accurate and Robust Reconstruction in Cerenkov Luminescence Tomography

Cai

Zhang

Shi

et al. 2020

IEEE Trans. Med. Imaging

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Cerenkov luminescence tomography (CLT) is a promising imaging tool for obtaining three-dimensional (3D) non-invasive visualization of the in vivo distribution of radiopharmaceuticals. However, the reconstruction performance remains unsatisfactory for biomedical applications because the inverse problem of CLT is severely ill-conditioned and intractable. In this study, therefore, a novel non-negative iterative convex refinement (NNICR) approach was utilized to improve the CLT reconstruction accuracy, robustness as well as the shape recovery capability. The spike and slab prior information was employed to capture the sparsity of Cerenkov source, which could be formalized as a non-convex optimization problem. The NNICR approach solved this non-convex problem by refining the solutions of the convex sub-problems. To evaluate the performance of the NNICR approach, numerical simulations and in vivo tumor-bearing mice models experiments were conducted. Conjugated gradient based Tikhonov regularization approach (CG-Tikhonov), fast iterative shrinkage-thresholding algorithm based Lasso approach (Fista-Lasso) and Elastic-Net regularization approach were used for the comparison of the reconstruction performance. The results of these experiments demonstrated that the NNICR approach obtained superior reconstruction performance in terms of location accuracy, shape recovery capability, robustness and in vivo practicability. It was believed that this study would facilitate the preclinical and clinical applications of CLT in the future.

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“…CLT can reconstruct the distribution of internal radionuclides using the surface measurements [20]- [24]. The concept of CLT was first proposed by Li et al to reconstruct the 3D distribution 18 FDG in a homogeneous mouse model [20].…”

Section: Introductionmentioning

confidence: 99%

Adaptively Hybrid $3^{\text{rd}}$ Simplified Spherical Harmonics With Diffusion Equation-Based Multispectral Cerenkov Luminescence Tomography

Wang

Cao

et al. 2019

IEEE Access

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Cerenkov luminescence tomography (CLT) can reproduce the location of the tumor inside the body and the physiological processes that are related to its biological behavior, it has thus attracted more attention in the field of imaging technology. The inadequacy of signals that are measured on the body surface might cause ill-posed problems during image reconstruction, thus affecting the quantitative accuracy of CLT. This can be improved using a multispectral strategy by providing more measurements. However, current reconstruction algorithms for multispectral CLT are based on the light transport model that uses a single equation (a diffusion equation or a 3 rd simplified spherical harmonics equation) for each spectrum, which cannot guarantee the accuracy and efficiency of the reconstruction. In order to make full use of the broadspectrum characteristics of Cerenkov luminescence and ensure an accurate and efficient reconstruction, in this work we apply an adaptively hybrid model to the multispectral CLT, that can automatically select the light transport equation. Here, the hybrid model was not only applied to different spectra, but also to different tissues at a certain spectrum. The selection of the light transport equation was accomplished by automatically comparing the index with a predefined threshold. Our proposed method was evaluated with numerical simulations and mouse-based experiments and the results showed the feasibility and effectiveness of the adaptively hybrid model based multispectral CLT.

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Probability method for Cerenkov luminescence tomography based on conformance error minimization

Cited by 25 publications

References 47 publications

Mathematical method in optical molecular imaging

Mathematical method in optical molecular imaging

Non-Negative Iterative Convex Refinement Approach for Accurate and Robust Reconstruction in Cerenkov Luminescence Tomography

Adaptively Hybrid $3^{\text{rd}}$ Simplified Spherical Harmonics With Diffusion Equation-Based Multispectral Cerenkov Luminescence Tomography

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