Your search keyword '"Cheng, XiaoLiang"' showing total 8 results

1. A THEORETICAL FRAMEWORK OF X-RAY DARK-FIELD TOMOGRAPHY

Author

HAN, WEIMIN, EICHHOLZ, JOSEPH A., CHENG, XIAOLIANG, and WANG, GE

Published

2011

2. Solving a backward problem for a distributed-order time fractional diffusion equation by a new adjoint technique.

Author

Yuan, Lele, Cheng, Xiaoliang, and Liang, Kewei

Subjects

*HEAT equation, *ADJOINT differential equations, *CONJUGATE gradient methods, *REGULARIZATION parameter, *TIKHONOV regularization, *INVERSE problems

Abstract

This paper studies a backward problem for a time fractional diffusion equation, with the distributed order Caputo derivative, of determining the initial condition from a noisy final datum. The uniqueness, ill-posedness and a conditional stability for this backward problem are obtained. The inverse problem is formulated into a minimization functional with Tikhonov regularization. Based on the series representation of the regularized solution, we give convergence rates under an a-priori and an a-posteriori regularization parameter choice rule. With a new adjoint technique to compute the gradient of the functional, the conjugate gradient method is applied to reconstruct the initial condition. Numerical examples in one- and two-dimensional cases illustrate the effectiveness of the proposed method. [ABSTRACT FROM AUTHOR]

Published

2020

3. A coupled complex boundary method for parameter identification in elliptic problems.

Author

Zheng, Xuan, Cheng, Xiaoliang, and Gong, Rongfang

Subjects

*PARAMETER identification, *ELLIPTIC differential equations, *TIKHONOV regularization, *BOUNDARY value problems, *INVERSE problems, *REGULARIZATION parameter, *NEUMANN boundary conditions

Abstract

In this paper, we study a parameter identification problem for elliptic partial differential equations. We reconstruct the coefficient with additional boundary measurements, including both Dirichlet and Neumann boundary conditions. To solve the problem, the coupled complex boundary method (CCBM), originally proposed in Cheng et al. [A novel coupled complex boundary method for solving inverse source problems, Inverse Probl. 30 (2014), p. 055002] is used. With CCBM, a complex boundary problem is introduced in such a way that the boundary conditions are coupled in a complex Robin boundary condition with a parameter τ. Using Tikhonov regularization, the coefficient is sought such that the imaginary part of the solution of the forward Robin boundary value problem vanishes in the problem domain, which brings advantages on robustness in reconstruction. Besides, the reconstruction is feasible even for very small regularization parameter through choosing the values of τ properly. Some theoretical analyses are given. Moreover, noise model is analysed and the finite element method is used for discretization. Numerical examples show the feasibility and stability of the proposed method. [ABSTRACT FROM AUTHOR]

Published

2020

4. Inverse source problem for a distributed-order time fractional diffusion equation.

Author

Cheng, Xiaoliang, Yuan, Lele, and Liang, Kewei

Subjects

*HEAT equation, *INVERSE problems, *CONJUGATE gradient methods, *ADJOINT differential equations, *TIKHONOV regularization, *MATHEMATICAL regularization

Abstract

This paper studies an inverse source problem for a time fractional diffusion equation with the distributed order Caputo derivative. The space-dependent source term is recovered from a noisy final data. The uniqueness, ill-posedness and a conditional stability for this inverse source problem are obtained. The inverse problem is formulated into a minimization functional with Tikhonov regularization method. Further, based on the series representation of the regularized solution, we give convergence rates of the regularized solution under an a-priori and an a-posteriori regularization parameter choice rule. With an adjoint technique for computing the gradient of the regularization functional, the conjugate gradient method is applied to reconstruct the space-dependent source term. Two numerical examples illustrate the effectiveness of the proposed method. [ABSTRACT FROM AUTHOR]

Published

2020

5. A parametric level set based collage method for an inverse problem in elliptic partial differential equations.

Author

Lin, Guangliang, Cheng, Xiaoliang, and Zhang, Ye

Subjects

*LEVEL set methods, *INVERSE problems, *NUMERICAL solutions to partial differential equations, *FIXED point theory, *APPROXIMATION theory

Abstract

In this work, based on the collage theorem, we develop a new numerical approach to reconstruct the locations of discontinuity of the conduction coefficient in elliptic partial differential equations (PDEs) with inaccurate measurement data and coefficient value. For a given conductivity coefficient, one can construct a contraction mapping such that its fixed point is just the gradient of a solution to the elliptic system. Therefore, the problem of reconstructing a conductivity coefficient in PDEs can be considered as an approximation of the observation data by the fixed point of a contraction mapping. By collage theorem, we translate it to seek a contraction mapping that keeps the observation data as close as possible to itself, which avoids solving adjoint problems when applying the gradient descent method to the corresponding optimization problem. Moreover, the total variation regularizing strategy is applied to tackle the ill-posedness and the parametric level set technique is adopted to represent the discontinuity of the conductivity coefficient. Various numerical simulations are given to show the efficiency of the proposed method. [ABSTRACT FROM AUTHOR]

Published

2018

6. An optimal finite element error estimate for an inverse problem in multispectral bioluminescence tomography.

Author

Gong, Rongfang and Cheng, Xiaoliang

Subjects

*BIOLUMINESCENCE, *INVERSE problems, *MONOCHROMATORS, *MONOCHROMATIC light, *TOMOGRAPHY

Abstract

Inspired by the paper (Gong, W., Li, R., Yan, N. N. & Zhao, W. B. (2008) An improved error analysis for finite element approximation of bioluminescence tomography. J. Comput. Math., 26, 1–13), we consider an optimal finite element error estimate for an inverse problem in multispectral bioluminescence tomography. Different from achromatic or monochromatic measurements, hyperspectral or multispectral data can reduce the ill-posedness of the inverse problem and yield improved depth reconstruction. Compared with Gong et al. (2008, An improved error analysis for finite element approximation of bioluminescence tomography. J. Comput. Math., 26, 1–13), which just improved the error order of piecewise constant light source function, error order in this paper is optimal and all error estimates here are valid for a general smooth domain rather than a polyhedral/polygonal one. Moreover, under a boundedness assumption for the admissible source set, the constants in our error estimates do not depend on the regularization parameter, and therefore are bounded. [ABSTRACT FROM AUTHOR]

Published

2015

7. A fast solver for an inverse problem arising in bioluminescence tomography.

Author

Gong, Rongfang, Cheng, Xiaoliang, and Han, Weimin

Subjects

*INVERSE problems, *NUMERICAL analysis, *BIOLUMINESCENCE, *TOMOGRAPHY, *DIAGNOSTIC imaging, *OPTICAL signal detection, *PARTIAL differential equations

Abstract

Abstract: Bioluminescence tomography (BLT) is a new method in biomedical imaging, with a promising potential in monitoring non-invasively physiological and pathological processes in vivo at the cellular and molecular levels. The goal of BLT is to quantitatively reconstruct a three dimensional bioluminescent source distribution within a small animal from two dimensional optical signals on the surface of the animal body. Mathematically, BLT is an under-determined inverse source problem and is severely ill-posed, making its numerical treatments very challenging. In this paper, we provide a new Tikhonov regularization framework for the BLT problem. Compared with the existing reconstruction methods about BLT, our new method uses an energy functional defined over the whole problem domain for measuring the data fitting, associated with two related but different boundary value problems. Based on the new formulation, a fast solver is introduced by transforming the proposed optimization model into a system of partial differential equations. Moreover, a finite element method is used to obtain a regularized discrete solution. Finally, numerical results show that the fast solver for BLT is feasible and effective. [Copyright &y& Elsevier]

Published

2014

8. A novel coupled complex boundary method for solving inverse source problems.

Author

Cheng, Xiaoliang, Gong, Rongfang, Han, Weimin, and Zheng, Xuan

Subjects

*INVERSE problems, *PARTIAL differential equations, *NEUMANN boundary conditions, *DIRICHLET problem, *BOUNDARY value problems, *ELLIPTIC differential equations, *TIKHONOV regularization

Abstract

In this paper, we consider an inverse source problem for elliptic partial differential equations with Dirichlet and Neumann boundary data. The unknown source term is to be determined from additional boundary conditions. Unlike the existing methods found in the literature, which usually use some of the boundary conditions to form a boundary value problem for the elliptic partial differential equation and the remaining boundary conditions in the objective functional for optimization to determine the source term, the novel method that we propose here has coupled complex boundary conditions. We use a complex elliptic partial differential equation with a Robin boundary condition coupling the Dirichlet and Neumann boundary data, and optimize with respect to the imaginary part of the solution in the domain to determine the source term. Then, on the basis of the complex boundary value problem, Tikhonov regularization is used to obtain a stable approximate source function and the finite element method is used for discretization. Theoretical analysis is given for both the continuous model and the discrete model. Several numerical examples are provided to show the usefulness of the proposed coupled complex boundary method. [ABSTRACT FROM AUTHOR]

Published

2014