Issue Date | Title | Author(s) | Source | WOS | Fulltext/Archive link |
2007 | A highly accurate solver for the mixed-boundary potential problem and singular problem in arbitrary plane domain | Chein-Shan Liu | Cmes-Computer Modeling in Engineering & Sciences | | |
2009 | A Highly Accurate Technique for Interpolations Using Very High-Order Polynomials, and Its Applications to Some Ill-Posed Linear Problems | Chein-Shan Liu ; Atluri, S. N. | Cmes-Computer Modeling in Engineering & Sciences | | |
2018 | A homogenization boundary function method for determining inaccessible boundary of a rigid inclusion for the Poisson equation | Chein-Shan Liu ; Liu, D. J. | Engineering Analysis with Boundary Elements | | |
2021 | A homogenization function method for inverse heat source problems in 3D functionally graded materials | Qiu, Lin; Lin, Ji; Wang, Fajie; Qin, Qing-Hua; Liu, Chein-Shan | APPLIED MATHEMATICAL MODELLING | 16 | |
- | A homogenization function technique to solve the 3D inverse Cauchy problem of elliptic type equations in a closed walled shell | Chein-Shan Liu ; Zhang, Y. M.; Wang, F. J. | Inverse Problems in Science and Engineering | | |
2021 | A homogenization method to solve inverse Cauchy-Stefan problems for recovering non-smooth moving boundary, heat flux and initial value | Liu, Chein-Shan ; Chang, Jiang-Ren | INVERSE PROBLEMS IN SCIENCE AND ENGINEERING | 1 | |
2016 | A Homogenized Function to Recover Wave Source by Solving a Small Scale Linear System of Differencing Equations | Chein-Shan Liu ; Chen, W.; Lin, J. | Cmes-Computer Modeling in Engineering & Sciences | | |
2016 | Homogenized functions to recover H(t)/H(x) by solving a small scale linear system of differencing equations | Chein-Shan Liu | International Journal of Heat and Mass Transfer | | |
2007 | Identification of temperature-dependent thermophysical properties in a partial differential equation subject to extra final measurement data | Chein-Shan Liu | Numerical Methods for Partial Differential Equations | | |
2017 | Identifying a rigidity function distributed in static composite beam by the boundary functional method | Chein-Shan Liu | Composite Structures | | |
2020 | Identifying heat conductivity and source functions for a nonlinear convective-diffusive equation by energetic boundary functional methods | Chein-Shan Liu ; Han-Taw Chen; Jiang-Ren Chang | Numerical Heat Transfer Part B-Fundamentals | 0 | |
2019 | IDENTIFYING NONLINEAR OSCILLATORS BY AN ENERGETIC FUNCTIONAL IN THE LINEAR SPACE OF TEMPORAL BOUNDARY FUNCTIONS | Jiang-Ren Chang ; Chein-Shan Liu ; Yung-Wei Chen | Journal of Marine Science and Technology-Taiwan | | |
2019 | IDENTIFYING NONLINEAR OSCILLATORS BY AN ENERGETIC FUNCTIONAL IN THE LINEAR SPACE OF TEMPORAL BOUNDARY FUNCTIONS | Liu, Chein-Shan ; Chen, Yung-Wei ; Chang, Jiang-Ren | JOURNAL OF MARINE SCIENCE AND TECHNOLOGY-TAIWAN | 2 | |
2020 | Identifying space-time dependent force on the vibrating Euler-Bernoulli beam by a boundary functional method | Chein-Shan Liu ; Li, B. T. | Journal of Inverse and Ill-Posed Problems | | |
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 | | |