| 公開日期 | 標題 | 作者 | 來源出版物 | WOS | 全文 |
1 | 2023 | Meshless generalized finite difference method with a domain-decomposition method for solving Helmholtz equation and its application to caisson resonance problems | Huang, Ji; Lyu, Hong-Guan; Chen, Jiahn-Horng ; Fan, Chia-Ming | OCEAN ENGINEERING | 0 | |
2 | 2022 | Meshless Generalized Finite Difference Method for the Propagation of Nonlinear Water Waves under Complex Wave Conditions | Huang, Ji; Fan, Chia-Ming ; Chen, Jiahn-Horng ; Yan, Jin | MATHEMATICS | 2 | |
3 | 2021 | A generalized finite difference method for solving elasticity interface problems | Xing, Yanan; Song, Lina; Fan, Chia-Ming | ENGINEERING ANALYSIS WITH BOUNDARY ELEMENTS | 3 | |
4 | 2021 | Improvement of generalized finite difference method for stochastic subsurface flow modeling | Chen, Shang-Ying; Hsu, Kuo-Chin; Fan, Chia-Ming | JOURNAL OF COMPUTATIONAL PHYSICS | 8 | |
5 | 2020 | On the propagation of nonlinear water waves in a three-dimensional numerical wave flume using the generalized finite difference method | Ji Huang; Chi-Nan Chu; Chia-Ming Fan ; Jiahn-Horng Chen ; Hongguan Lyu | Engineering Analysis with Boundary Elements | 7 | |
6 | 2020 | Topology optimization of steady-state heat conduction structures using meshless generalized finite difference method | Qinghai Zhao; Chia-Ming Fan ; Fajie Wang; Wenzhen Qu | Engineering Analysis with Boundary Elements | 14 | |
7 | 2020 | Generalized finite difference method for solving stationary 2D and 3D Stokes equations with a mixed boundary condition | Lina Song; Po-Wei Li; Yan Gu; Chia-Ming Fan | Computers & Mathematics with Applications | 24 | |
8 | 2020 | Generalized finite difference method for three-dimensional eigenproblems of Helmholtz equation | Zhang, Juan; Shuy, Rong-Juin; Chu, Chiung-Lin; Fan, Chia-Ming | MATHEMATICS AND COMPUTERS IN SIMULATION | 0 | |
9 | 2020 | A meshless collocation scheme for inverse heat conduction problem in three-dimensional functionally graded materials | Wen Hu; Yan Gu; Chia-Ming Fan | Engineering Analysis with Boundary Elements | 11 | |
10 | 2020 | Solving Boussinesq equations with a meshless finite difference method | Ting Zhang; Zhen-Huan Lin; Guan-Yi Huang; Chia-Ming Fan ; Po-Wei Li | Ocean Engineering | 14 | |
11 | 2019 | The generalized finite difference method for in-plane crack problems | Lei Jun; Xu Yanjie; Gu Yan; Chia-Ming Fan | Engineering Analysis with Boundary Elements | 24 | |
12 | 2018 | Domain-decomposition generalized finite difference method for stress analysis in multi-layered elastic materials | Wang, Y. Y.; Gu, Y.; Chia-Ming Fan ; Chen, W.; Zhang, C. Z. | Engineering Analysis with Boundary Elements | 2 | |
13 | 2018 | The generalized finite difference method for an inverse time-dependent source problem associated with three-dimensional heat equation | Yan Gu; Jun Lei; Chia-Ming Fan ; Xiao-Qiao He | Engineering Analysis with Boundary Elements | 28 | |
14 | 2018 | Numerical solutions of mild slope equation by generalized finite difference method | Zhang Ting; Huang Ying-Jie; Chyuan-Liang Lin; Chia-Ming Fan ; Li Po-Wei | Engineering Analysis with Boundary Elements | 13 | |
15 | 2016 | Application of generalized finite difference method to propagation of nonlinear water waves in numerical wave flume | Ting Zhang; Yu-Fei Ren; Zhi-Qiang Yang; Chia-Ming Fan ; Po-Wei Li | Ocean Engineering | 24 | |
16 | 2016 | Simulation of two-dimensional sloshing phenomenon by generalized finite difference method | Ting Zhang; Yu-Fei Ren; Chia-Ming Fan ; Po-Wei Li | Engineering Analysis with Boundary Elements | 29 | |
17 | 2015 | Generalized finite difference method for non-linear free-surface problems of liquid sloshing | 張挺; 任聿飛; 楊志強; 范佳銘 | 四川大学学报(工程科学版) | | |
18 | 2013 | Generalized finite difference method for solving two-dimensional non-linear obstacle problems | Hsin-Fang Chan; Chia-Ming Fan ; Chia-Wen Kuo | Engineering Analysis with Boundary Elements | 59 | |
19 | 2013 | Generalized finite difference method for solving two-dimensional nonlinear obstacle problems | Hsin-Fang Chan; Chia-Ming Fan ; Chia-Wen Kuo | Engineering Analysis with Boundary Elements | | |