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StocIPNet: A novel probabilistic interpretable network with affine-embedded reparameterization layer for high-dimensional stochastic inverse problems Journal article
Mo, Jiang, Yan, Wang Ji. StocIPNet: A novel probabilistic interpretable network with affine-embedded reparameterization layer for high-dimensional stochastic inverse problems[J]. Mechanical Systems and Signal Processing, 2024, 220, 111623.
Authors:  Mo, Jiang;  Yan, Wang Ji
Favorite | TC[WOS]:3 TC[Scopus]:3  IF:7.9/8.0 | Submit date:2024/08/05
Deep Learning  Model Updating  Reparameterization Trick  Stochastic Inverse Problems  Structural Health Monitoring  
An efficient two-level overlapping domain decomposition method for recovering unsteady sources of 3D parabolic problems Journal article
Deng, Xiaomao, Liao, Zi Ju, Cai, Xiao Chuan. An efficient two-level overlapping domain decomposition method for recovering unsteady sources of 3D parabolic problems[J]. COMPUTERS & MATHEMATICS WITH APPLICATIONS, 2022, 111, 98-108.
Authors:  Deng, Xiaomao;  Liao, Zi Ju;  Cai, Xiao Chuan
Favorite | TC[WOS]:3 TC[Scopus]:4  IF:2.9/2.6 | Submit date:2022/05/04
Domain Decomposition  Inverse Problems  Parallel Computing  Source Identification  
A Riemannian under-determined BFGS method for least squares inverse eigenvalue problems Journal article
Zhao, Zhi, Jin, Xiao Qing, Yao, Teng Teng. A Riemannian under-determined BFGS method for least squares inverse eigenvalue problems[J]. BIT NUMERICAL MATHEMATICS, 2021, 62(1), 311-337.
Authors:  Zhao, Zhi;  Jin, Xiao Qing;  Yao, Teng Teng
Favorite | TC[WOS]:0 TC[Scopus]:1  IF:1.6/1.8 | Submit date:2022/03/28
Parameterized Least Squares Inverse Eigenvalue Problems  Riemannian Under-determined Bfgs Method  Under-determined Equation  
A parallel multilevel domain decomposition method for source identification problems governed by elliptic equations Journal article
Xiaomao Deng, Zi-Ju Liao, Xiao-Chuan Cai. A parallel multilevel domain decomposition method for source identification problems governed by elliptic equations[J]. Journal of Computational and Applied Mathematics, 2020, 392.
Authors:  Xiaomao Deng;  Zi-Ju Liao;  Xiao-Chuan Cai
Favorite | TC[WOS]:2 TC[Scopus]:3  IF:2.1/2.1 | Submit date:2021/03/09
Domain Decomposition  Inverse Problems  Parallel Computing  Source Identification  
Riemannian inexact Newton method for structured inverse eigenvalue and singular value problems Journal article
Chiang,Chun Yueh, Lin,Matthew M., Jin,Xiao Qing. Riemannian inexact Newton method for structured inverse eigenvalue and singular value problems[J]. BIT Numerical Mathematics, 2019, 59(3), 675-694.
Authors:  Chiang,Chun Yueh;  Lin,Matthew M.;  Jin,Xiao Qing
Favorite | TC[WOS]:3 TC[Scopus]:4  IF:1.6/1.8 | Submit date:2021/03/09
Inverse EigenValue And Singular Value Problems  Nonnegative Matrices  Riemannian Inexact Newton Method  
A Riemannian inexact Newton-CG method for constructing nonnegative matrix with prescribed realizable spectrum Journal article
Zhi Zhao, Zheng-Jian Bai, Xiao-Qing Jin. A Riemannian inexact Newton-CG method for constructing nonnegative matrix with prescribed realizable spectrum[J]. Numerische Mathematik, 2018.
Authors:  Zhi Zhao;  Zheng-Jian Bai;  Xiao-Qing Jin
Favorite | TC[WOS]:12 TC[Scopus]:12  IF:2.1/2.4 | Submit date:2019/07/30
Inverse Eigenvalue Problems  Algorithm  Conjugate-gradient Method  Sufficient Conditions