English | 繁體

Search in the results

UM

Browse/Search Results:  1-10 of 12 Help

Selected(0)Clear Items/Page:    Sort:
A Two-Step Modulus-Based Matrix Splitting Iteration Method Without Auxiliary Variables for Solving Vertical Linear Complementarity Problems Journal article
Zheng, Hua, Lu, Xiaoping, Vong, Seakweng. A Two-Step Modulus-Based Matrix Splitting Iteration Method Without Auxiliary Variables for Solving Vertical Linear Complementarity Problems[J]. Communications on Applied Mathematics and Computation, 2024, 6(4), 2475-2492.
Authors:  Zheng, Hua;  Lu, Xiaoping;  Vong, Seakweng
Favorite | TC[WOS]:5 TC[Scopus]:5  IF:1.4/0 | Submit date:2024/02/23
Modulus-based Matrix Splitting  Two-step Method  Vertical Linear Complementarity Problem  
A relaxation two-step parallel modulus method without auxiliary variable for solving large sparse vertical linear complementarity problems Journal article
Guo, Wenxiu, Zheng, Hua, Lu, Xiaoping, Zhang, Yongxiong, Vong, Seakweng. A relaxation two-step parallel modulus method without auxiliary variable for solving large sparse vertical linear complementarity problems[J]. Numerical Algorithms, 2024.
Authors:  Guo, Wenxiu;  Zheng, Hua;  Lu, Xiaoping;  Zhang, Yongxiong;  Vong, Seakweng
Favorite | TC[WOS]:1 TC[Scopus]:1  IF:1.7/1.9 | Submit date:2024/05/16
Modulus Method  Parallel  Relaxation  Two-step Multisplitting  Vertical Linear Complementarity Problem  
A two-step parallel iteration method for large sparse horizontal linear complementarity problems Journal article
Yongxiong Zhang, Hua Zheng, Seakweng Vong, Xiaoping Lu. A two-step parallel iteration method for large sparse horizontal linear complementarity problems[J]. APPLIED MATHEMATICS AND COMPUTATION, 2022, 438, 127609.
Authors:  Yongxiong Zhang;  Hua Zheng;  Seakweng Vong;  Xiaoping Lu
Favorite | TC[WOS]:5 TC[Scopus]:5  IF:3.5/3.1 | Submit date:2023/02/22
Horizontal Linear Complementarity Problem  Two-step Method  Modulus-based Method  Synchronous Multisplitting  
A Two-Step Iteration Method for Vertical Linear Complementarity Problems Journal article
Song, Yunlin, Zheng, Hua, Lu, Xiaoping, Vong, Seak Weng. A Two-Step Iteration Method for Vertical Linear Complementarity Problems[J]. Symmetry-Basel, 2022, 14(9), 1882.
Authors:  Song, Yunlin;  Zheng, Hua;  Lu, Xiaoping;  Vong, Seak Weng
Favorite | TC[WOS]:3 TC[Scopus]:5  IF:2.2/2.3 | Submit date:2022/10/06
Modulus-based Method  Two-step Splitting  Vertical Linear Complementarity Problem  
The Riemannian two-step perturbed Gauss–Newton method for least squares inverse eigenvalue problems Journal article
Zhao, Zhi, Jin, Xiao Qing, Yao, Teng Teng. The Riemannian two-step perturbed Gauss–Newton method for least squares inverse eigenvalue problems[J]. Journal of Computational and Applied Mathematics, 2022, 405, 113971.
Authors:  Zhao, Zhi;  Jin, Xiao Qing;  Yao, Teng Teng
Favorite | TC[WOS]:1 TC[Scopus]:1  IF:2.1/2.1 | Submit date:2022/05/13
Nonlinear Least Squares Problem  Parameterized Least Squares Inverse Eigenvalue Problem  Two-step Perturbed Gauss–newton Method  
Water, a Green Solvent for Fabrication of High-Quality CsPbBr3 Films for Efficient Solar Cells Journal article
Cao,Xiaobing, Zhang,Guoshuai, Jiang,Long, Cai,Yifan, Gao,Yan, Yang,Weijia, He,Xin, Zeng,Qingguang, Xing,Guichuan, Jia,Yi, Wei,Jinquan. Water, a Green Solvent for Fabrication of High-Quality CsPbBr3 Films for Efficient Solar Cells[J]. ACS Applied Materials and Interfaces, 2020, 12(5), 5925-5931.
Authors:  Cao,Xiaobing;  Zhang,Guoshuai;  Jiang,Long;  Cai,Yifan;  Gao,Yan; et al.
Favorite | TC[WOS]:79 TC[Scopus]:77  IF:8.3/8.7 | Submit date:2021/03/11
Cspbbr3 Film  Green Solvent  Perovskite  Solar Cell  Two-step Method  
A two-step inexact Newton-Chebyshev-like method for inverse eigenvalue problems Journal article
Wen,Chao Tao, Chen,Xiao Shan, Sun,Hai Wei. A two-step inexact Newton-Chebyshev-like method for inverse eigenvalue problems[J]. Linear Algebra and Its Applications, 2020, 585, 241-262.
Authors:  Wen,Chao Tao;  Chen,Xiao Shan;  Sun,Hai Wei
Favorite | TC[WOS]:9 TC[Scopus]:8  IF:1.0/1.1 | Submit date:2021/03/09
Chebyshev Method  Cubical Convergence  Inexact Newton-like Method  Inverse Eigenvalue Problem  Two-step  
A two-step inexact Newton-Chebyshev-like method for inverse eigenvalue problems Journal article
Wen, C.T., Chen, X.S., Sun, H. W.. A two-step inexact Newton-Chebyshev-like method for inverse eigenvalue problems[J]. Linear Algegra and its Applications, 2020, 241-262.
Authors:  Wen, C.T.;  Chen, X.S.;  Sun, H. W.
Favorite | TC[WOS]:9 TC[Scopus]:8  IF:1.0/1.1 | Submit date:2022/07/25
Inverse Eigenvalue Problem  Two-step  Inexact Newton-like Method  Chebyshev Method  Cubical Convergence  
Improved convergence theorems of the two-step modulus-based matrix splitting and synchronous multisplitting iteration methods for solving linear complementarity problems Journal article
Zheng,Hua, Vong,Seakweng. Improved convergence theorems of the two-step modulus-based matrix splitting and synchronous multisplitting iteration methods for solving linear complementarity problems[J]. Linear and Multilinear Algebra, 2019, 67(9), 1773-1784.
Authors:  Zheng,Hua;  Vong,Seakweng
Favorite | TC[WOS]:23 TC[Scopus]:24  IF:0.9/1.0 | Submit date:2021/03/09
65f10  90c33  H-splitting  Linear Complementarity Problem  Synchronous Multisplitting  Two-step Modulus-based Method  
TWO-STEP NEWTON TYPE METHODS FOR SOLVING INVERSE EIGENVALUE PROBLEMS Journal article
Chen, X.S., Wen, C.T., Sun, H. W.. TWO-STEP NEWTON TYPE METHODS FOR SOLVING INVERSE EIGENVALUE PROBLEMS[J]. Numerical Linear Algebra with Applications, 2018, e.2185-2185.
Authors:  Chen, X.S.;  Wen, C.T.;  Sun, H. W.
Favorite | TC[WOS]:10 TC[Scopus]:10 | Submit date:2022/07/25
Inverse Eigenvalue Problem  Two-step Newton Type Method  Super Quadratically Convergent