公開日期 | 標題 | 作者 | 來源出版物 | WOS | 全文 |
2016 | Fast Solution of Three-Dimensional Modified Helmholtz Equations by the Method of Fundamental Solutions | Lin, J.; Chen, C. S.; Chein-Shan Liu | Communications in Computational Physics | | |
2018 | Fast Solving the Cauchy Problems of Poisson Equation in an Arbitrary Three-Dimensional Domain | Chein-Shan Liu ; Wang, F. J.; Qu, W. Z. | Cmes-Computer Modeling in Engineering & Sciences | | |
2018 | FAST-CONVERGENCE ITERATIVE ALGORITHMS FOR SOLVING A NONLINEAR BEAM EQUATION WITH AN INTEGRAL TERM SUBJECTED TO DIFFERENT BOUNDARY CONDITIONS | Chein-Shan Liu ; Chang, C. W. | Journal of Marine Science and Technology-Taiwan | | |
2015 | Fast-multipole accelerated singular boundary method for large-scale three-dimensional potential problems | Gu, Y.; Gao, H. W.; Chen, W.; Chein-Shan Liu ; Zhang, C. Z.; He, X. Q. | International Journal of Heat and Mass Transfer | | |
2008 | A Fictitious Time Integration Method (FTIM) for Solving Mixed Complementarity Problems with Applications to Non-Linear Optimization | Chein-Shan Liu ; Atluri, S. N. | Cmes-Computer Modeling in Engineering & Sciences | | |
2009 | A Fictitious Time Integration Method for a Quasilinear Elliptic Boundary Value Problem, Defined in an Arbitrary Plane Domain | Chein-Shan Liu | Cmc-Computers Materials & Continua | | |
2009 | A Fictitious Time Integration Method for Backward Advection-Dispersion Equation | Chang, C. W.; Chein-Shan Liu | Cmes-Computer Modeling in Engineering & Sciences | | |
2009 | A Fictitious Time Integration Method for Solving Delay Ordinary Differential Equations | Chein-Shan Liu | Cmc-Computers Materials & Continua | | |
2009 | A Fictitious Time Integration Method for Solving m-Point Boundary Value Problems | Chein-Shan Liu | Cmes-Computer Modeling in Engineering & Sciences | | |
2009 | A Fictitious Time Integration Method for the Burgers Equation | Chein-Shan Liu | Cmc-Computers Materials & Continua | | |
2009 | A Fictitious Time Integration Method for the Numerical Solution of the Fredholm Integral Equation and for Numerical Differentiation of Noisy Data, and Its Relation to the Filter Theory | Chein-Shan Liu ; Atluri, S. N. | Cmes-Computer Modeling in Engineering & Sciences | | |
2008 | A Fictitious Time Integration Method for Two-Dimensional Quasilinear Elliptic Boundary Value Problems | Chein-Shan Liu | Cmes-Computer Modeling in Engineering & Sciences | | |
2010 | The Fictitious Time Integration Method to Solve the Space- and Time-Fractional Burgers Equations | Chein-Shan Liu | Cmc-Computers Materials & Continua | | |
2015 | Finding unknown heat source in a nonlinear Cauchy problem by the Lie-group differential algebraic equations method | Chein-Shan Liu | Engineering Analysis with Boundary Elements | | |
2007 | Five different formulations of the finite strain perfectly plastic equations | Chein-Shan Liu | Cmes-Computer Modeling in Engineering & Sciences | | |
2020 | Forced and free vibrations of composite beams solved by an energetic boundary functions collocation method | Chein-Shan Liu ; Li, B. T. | Mathematics and Computers in Simulation | | |
2009 | The Fourth-Order Group Preserving Methods for the Integrations of Ordinary Differential Equations | Lee, H. C.; Chein-Shan Liu | Cmes-Computer Modeling in Engineering & Sciences | | |
2006 | Fractal basin of elastic shakedown attractors under cyclic rectilinear generalized strain paths | Chein-Shan Liu | Journal of the Chinese Institute of Engineers | | |
2002 | Frictional behaviour of a belt-driven and periodically excited oscillator | Chein-Shan Liu ; Chang, W. T. | Journal of Sound and Vibration | | |
2011 | A Further Study on Using (x) over dot = lambda alpha R+beta P (P = F - R(F center dot R)/parallel to R parallel to(2)) and (x) over dot = lambda alpha F+beta P* (P* = R - F(F center dot R)/parallel to F parallel to(2)) in Iteratively Solving the Nonlinear System of Algebraic Equations F(x)=0 | Chein-Shan Liu ; Dai, H. H.; Atluri, S. N. | Cmes-Computer Modeling in Engineering & Sciences | | |