Issue Date | Title | Author(s) | Source | WOS | Fulltext/Archive link |
2021 | Asymptotic Numerical Solutions for Second-order Quasilinear Singularly Perturbed Problems | Liu, Chein-Shan ; Chang, Chih-Wen | JOURNAL OF MARINE SCIENCE AND TECHNOLOGY-TAIWAN | 1 | |
2021 | A boundary shape function iterative method for solving nonlinear singular boundary value problems | Liu, Chein-Shan ; El-Zahar, Essam R.; Chang, Chih-Wen | MATHEMATICS AND COMPUTERS IN SIMULATION | 9 | |
2022 | Higher-Order Asymptotic Numerical Solutions for Singularly Perturbed Problems with Variable Coefficients | Liu, Chein-Shan ; El-Zahar, Essam R.; Chang, Chih-Wen | MATHEMATICS | 1 | |
2022 | Lie-Group Shooting/Boundary Shape Function Methods for Solving Nonlinear Boundary Value Problems | Liu, Chein-Shan ; Chang, Chih-Wen | SYMMETRY-BASEL | 2 | |
2024/1/1 | Memory-Accelerating Methods for One-Step Iterative Schemes with Lie Symmetry Method Solving Nonlinear Boundary-Value Problem | Liu, Chein-Shan ; Chang, Chih-Wen; Kuo, Chung-Lun | SYMMETRY-BASEL | | |
2022 | Modified asymptotic solutions for second-order nonlinear singularly perturbed boundary value problems | Liu, Chein-Shan ; Chang, Chih-Wen | MATHEMATICS AND COMPUTERS IN SIMULATION | 4 | |
2022 | A novel perturbation method to approximate the solution of nonlinear ordinary differential equation after being linearized to the Mathieu equation | Liu, Chein-Shan ; Chang, Chih-Wen | MECHANICAL SYSTEMS AND SIGNAL PROCESSING | 1 | |
2024/1/15 | Optimal Shape Factor and Fictitious Radius in the MQ-RBF: Solving Ill-Posed Laplacian Problems | Liu, Chein-Shan ; Kuo, Chung-Lun; Chang, Chih-Wen | CMES-COMPUTER MODELING IN ENGINEERING & SCIENCES | | |
2022 | Periodic Orbits of Nonlinear Ordinary Differential Equations Computed by a Boundary Shape Function Method | Liu, Chein-Shan ; Chang, Chih-Wen; Chen, Yung-Wei ; Chang, Yen-Shen | SYMMETRY-BASEL | 2 | |
2023 | Periodic solutions of nonlinear ordinary differential equations computed by a boundary shape function method and a generalized derivative-free Newton method | Liu, Chein-Shan ; Chang, Chih-Wen | MECHANICAL SYSTEMS AND SIGNAL PROCESSING | 0 | |
2021 | Recovering external forces on vibrating Euler-Bernoulli beams using boundary shape function methods | Liu, Chein-Shan ; Chung-Lun Kuo ; Chang, Chih-Wen | Mechanical Systems and Signal Processing | 3 | |
2020 | Reducing the near boundary errors of nonhomogeneous heat equations by boundary consistent methods | Liu, Chein-Shan ; Chang, Chih-Wen | IMA JOURNAL OF APPLIED MATHEMATICS | 0 | |
2022 | Solving nonlinear boundary value problems by a boundary shape function method and a splitting and linearizing method | Liu, Chein-Shan ; El-Zahar, Essam R.; Chang, Chih-Wen | INTERNATIONAL JOURNAL OF NONLINEAR SCIENCES AND NUMERICAL SIMULATION | 0 | |
2022 | Solving nonlinear parabolic equations under nonlocal conditions by a nonlocal boundary shape function and splitting-linearizing method | Liu, Chein-Shan ; Chang, Chih-Wen | NUMERICAL HEAT TRANSFER PART B-FUNDAMENTALS | 0 | |
2021 | Three novel fifth-order iterative schemes for solving nonlinear equations | Liu, Chein-Shan ; El-Zahar, Essam R.; Chang, Chih-Wen | MATHEMATICS AND COMPUTERS IN SIMULATION | 3 | |
2022 | To Solve Forward and Backward Nonlocal Wave Problems with Pascal Bases Automatically Satisfying the Specified Conditions | Liu, Chein-Shan ; Chang, Chih-Wen; Chen, Yung-Wei ; Shen, Jian-Hung | MATHEMATICS | 0 | |
2023 | A Two-Dimensional Variant of Newton's Method and a Three-Point Hermite Interpolation: Fourth- and Eighth-Order Optimal Iterative Schemes | Liu, Chein-Shan ; El-Zahar, Essam R.; Chang, Chih-Wen | MATHEMATICS | | |
2022 | Uniform Torsion Analysis of Composite Shafts Using Point Collocation Method Based on Pascal Polynomials | Chang, Chih-Wen; Wu, Jyh-Hong; Lin, Ying-Ru; Lin, Yu-Feng; Huang, Nan-Nong | J MAR SCI TECH-JAPAN | 0 | |