公開日期 | 標題 | 作者 | 來源出版物 | WOS | 全文 |
2008 | Identifying time-dependent damping and stiffness functions by a simple and yet accurate method | Chein-Shan Liu | Journal of Sound and Vibration | | |
2016 | An implicit Lie-group iterative scheme for solving the nonlinear Klein-Gordon and sine-Gordon equations | Chang, C. W.; Chein-Shan Liu | Applied Mathematical Modelling | | |
2008 | Improving the ill-conditioning of the method of fundamental solutions for 2D Laplace equation | Chein-Shan Liu | Cmes-Computer Modeling in Engineering & Sciences | | |
2016 | An integral equation method to recover non-additive and non-separable heat source without initial temperature | Chein-Shan Liu | International Journal of Heat and Mass Transfer | | |
2000 | Intermittent transition to quasiperiodicity demonstrated via a circular differential equation | Chein-Shan Liu | International Journal of Non-Linear Mechanics | | |
2004 | Internal symmetry groups for perfect elastoplasticity under axial-torsional loadings | Chein-Shan Liu | Journal of the Chinese Institute of Engineers | | |
2004 | Internal symmetry groups for the Drucker-Prager material model of plasticity and numerical integrating methods | Chein-Shan Liu | International Journal of Solids and Structures | | |
1999 | Internal symmetry in bilinear elastoplasticity | Hong, H. K.; Chein-Shan Liu | International Journal of Non-Linear Mechanics | | |
2000 | Internal symmetry in the constitutive model of perfect elastoplasticity | Hong, H. K.; Chein-Shan Liu | International Journal of Non-Linear Mechanics | | |
2011 | An inverse problem for computing a leading coefficient in the Sturm-Liouville operator by using the boundary data | Chein-Shan Liu | Applied Mathematics and Computation | | |
2015 | An iterative algorithm for identifying heat source by using a DQ and a Lie-group method | Chein-Shan Liu | Inverse Problems in Science and Engineering | | |
2011 | An Iterative Algorithm for Solving a System of Nonlinear Algebraic Equations, F(x)=0, Using the System of ODEs with an Optimum alpha in (x) over dot = lambda alpha F + (1-a)(BF)-F-T ; B-ij = partial derivative F-i/partial derivative x(j) | Chein-Shan Liu ; Atluri, S. N. | Cmes-Computer Modeling in Engineering & Sciences | | |
2010 | An Iterative and Adaptive Lie-Group Method for Solving the Calderon Inverse Problem | Chein-Shan Liu ; Atluri, S. N. | Cmes-Computer Modeling in Engineering & Sciences | | |
2013 | An iterative GL(n, R) method for solving non-linear inverse vibration problems | Chein-Shan Liu | Nonlinear Dynamics | | |
2017 | An iterative method based-on eigenfunctions and adjoint eigenfunctions for solving the Falkner-Skan equation | Chein-Shan Liu | Applied Mathematics Letters | | |
2014 | AN ITERATIVE METHOD TO RECOVER THE HEAT CONDUCTIVITY FUNCTION OF A NONLINEAR HEAT CONDUCTION EQUATION | Chein-Shan Liu | Numerical Heat Transfer Part B-Fundamentals | | |
2011 | An Iterative Method Using an Optimal Descent Vector, for Solving an Ill-Conditioned System Bx = b, Better and Faster than the Conjugate Gradient Method | Chein-Shan Liu ; Atluri, S. N. | Cmes-Computer Modeling in Engineering & Sciences | | |
2011 | Iterative Solution of a System of Nonlinear Algebraic Equations F(x)=0, Using (x) over dot = lambda alpha R plus beta P or (x) over dot = lambda alpha F plus beta P* R is a Normal to a Hyper-Surface Function of F, P Normal to R, and P* Normal to F | Chein-Shan Liu ; Dai, H. H.; Atluri, S. N. | Cmes-Computer Modeling in Engineering & Sciences | | |
2000 | A Jordan algebra and dynamic system with associator as vector field | Chein-Shan Liu | International Journal of Non-Linear Mechanics | | |
2012 | The Jordan Structure of Residual Dynamics Used to Solve Linear Inverse Problems | Chein-Shan Liu ; Zhang, S. Y.; Atluri, S. N. | Cmes-Computer Modeling in Engineering & Sciences | | |