Year |
Citation |
Score |
2021 |
Ma Z, Li X, Chen CS. Ghost point method using RBFs and polynomial basis functions Applied Mathematics Letters. 111: 106618. DOI: 10.1016/J.Aml.2020.106618 |
0.377 |
|
2020 |
Cao Y, Chen CS, Zheng H. Space–time polynomial particular solutions method for solving time-dependent problems Numerical Heat Transfer Part B-Fundamentals. 77: 181-194. DOI: 10.1080/10407790.2019.1693199 |
0.448 |
|
2020 |
Chen CS, Shen SH, Dou F, Li J. The LMAPS for solving fourth-order PDEs with polynomial basis functions Mathematics and Computers in Simulation. 177: 500-515. DOI: 10.1016/J.Matcom.2020.05.013 |
0.491 |
|
2020 |
Chang W, Chen CS, Liu XY, Li J. Localized meshless methods based on polynomial basis functions for solving axisymmetric equations Mathematics and Computers in Simulation. 177: 487-499. DOI: 10.1016/J.Matcom.2020.05.006 |
0.506 |
|
2020 |
Lin J, Zhao Y, Watson D, Chen CS. The radial basis function differential quadrature method with ghost points Mathematics and Computers in Simulation. 173: 105-114. DOI: 10.1016/J.Matcom.2020.01.006 |
0.45 |
|
2020 |
Deng C, Zheng H, Fu M, Xiong J, Chen CS. An efficient method of approximate particular solutions using polynomial basis functions Engineering Analysis With Boundary Elements. 111: 1-8. DOI: 10.1016/J.Enganabound.2019.10.014 |
0.502 |
|
2020 |
Liu XY, Wang H, Chen CS, Wang Q, Zhou X, Wang Y. Implicit surface reconstruction with radial basis functions via PDEs Engineering Analysis With Boundary Elements. 110: 95-103. DOI: 10.1016/J.Enganabound.2019.09.021 |
0.441 |
|
2020 |
Wang D, Chen CS, Li W. An efficient MAPS for solving fourth order partial differential equations using trigonometric functions Computers & Mathematics With Applications. 79: 934-946. DOI: 10.1016/J.Camwa.2019.08.005 |
0.488 |
|
2020 |
Dou F, Zhang LP, Li ZC, Chen CS. Source Nodes On Elliptic Pseudo-Boundaries In the Method of Fundamental Solutions for Laplace's Equation; Selection of Pseudo-Boundaries Journal of Computational and Applied Mathematics. 377: 112861. DOI: 10.1016/J.Cam.2020.112861 |
0.442 |
|
2020 |
Ghimire BK, Li X, Chen CS, Lamichhane AR. Hybrid Chebyshev polynomial scheme for solving elliptic partial differential equations Journal of Computational and Applied Mathematics. 364: 112324. DOI: 10.1016/J.Cam.2019.06.040 |
0.515 |
|
2020 |
Watson DW, Karageorghis A, Chen C. The radial basis function-differential quadrature method for elliptic problems in annular domains Journal of Computational and Applied Mathematics. 363: 53-76. DOI: 10.1016/J.Cam.2019.05.027 |
0.514 |
|
2020 |
Chen CS, Karageorghis A, Dou F. A Novel RBF Collocation Method Using Fictitious Centres Applied Mathematics Letters. 101: 106069. DOI: 10.1016/J.Aml.2019.106069 |
0.442 |
|
2020 |
Zhu X, Dou F, Karageorghis A, Chen CS. A fictitious points one–step MPS–MFS technique Applied Mathematics and Computation. 382: 125332. DOI: 10.1016/J.Amc.2020.125332 |
0.53 |
|
2019 |
Chen C, Karageorghis A. Local RBF Algorithms for Elliptic Boundary Value Problems in Annular Domains Communications in Computational Physics. 25: 41. DOI: 10.4208/Cicp.Oa-2018-0031 |
0.329 |
|
2019 |
Lin J, Reutskiy S, Chen C, Lu J. A Novel Method for Solving Time-Dependent 2D Advection-Diffusion-Reaction Equations to Model Transfer in Nonlinear Anisotrophic Media Communications in Computational Physics. 26: 233-264. DOI: 10.4208/Cicp.Oa-2018-0005 |
0.366 |
|
2019 |
Wang D, Chen C, Fan CM, Li M. The MAPS based on trigonometric basis functions for solving elliptic partial differential equations with variable coefficients and Cauchy–Navier equations Mathematics and Computers in Simulation. 159: 119-135. DOI: 10.1016/J.Matcom.2018.11.001 |
0.475 |
|
2019 |
Fan CM, Huang YK, Chen C, Kuo SR. Localized method of fundamental solutions for solving two-dimensional Laplace and biharmonic equations Engineering Analysis With Boundary Elements. 101: 188-197. DOI: 10.1016/J.Enganabound.2018.11.008 |
0.51 |
|
2019 |
Xi Q, Chen CS, Fu Z, Comino E. The MAPS with polynomial basis functions for solving axisymmetric time-fractional equations Computers & Mathematics With Applications. DOI: 10.1016/J.Camwa.2019.11.014 |
0.457 |
|
2019 |
Dou F, Liu Y, Chen C. The Method of Particular Solutions for Solving Nonlinear Poisson Problems Computers & Mathematics With Applications. 77: 501-513. DOI: 10.1016/J.Camwa.2018.09.053 |
0.503 |
|
2018 |
Lin J, Zhang Y, Chen CS, Dangal T. Solution of Cauchy Problems by the Multiple Scale Method of Particular Solutions Using Polynomial Basis Functions Communications in Computational Physics. 24. DOI: 10.4208/Cicp.Oa-2017-0187 |
0.441 |
|
2018 |
Jankowska MA, Karageorghis A, Chen CS. Kansa RBF method for nonlinear problems The International Journal of Computational Methods and Experimental Measurements. 6: 1000-1007. DOI: 10.2495/Cmem-V6-N6-1000-1007 |
0.344 |
|
2018 |
Lin J, Lamichhane AR, Chen CS, Lu J. The adaptive algorithm for the selection of sources of the method of fundamental solutions Engineering Analysis With Boundary Elements. 95: 154-159. DOI: 10.1016/J.Enganabound.2018.07.008 |
0.377 |
|
2018 |
Xiong J, Jiang P, Zheng H, Chen C. A High Accurate Simulation of Thin Plate Problems By Using the Method of Approximate Particular Solutions With High Order Polynomial Basis Engineering Analysis With Boundary Elements. 94: 153-158. DOI: 10.1016/J.Enganabound.2018.06.009 |
0.482 |
|
2018 |
Jankowska MA, Karageorghis A, Chen C. Improved Kansa RBF method for the solution of nonlinear boundary value problems Engineering Analysis With Boundary Elements. 87: 173-183. DOI: 10.1016/J.Enganabound.2017.11.012 |
0.465 |
|
2018 |
Liu X, Chen C, Li W, Li M. Particular solutions of products of Helmholtz-type equations using the Matern function Computers & Mathematics With Applications. 75: 3158-3171. DOI: 10.1016/J.Camwa.2018.01.038 |
0.493 |
|
2018 |
Tian Z, Li X, Fan CM, Chen C. The method of particular solutions using trigonometric basis functions Journal of Computational and Applied Mathematics. 335: 20-32. DOI: 10.1016/J.Cam.2017.11.028 |
0.522 |
|
2018 |
Chang W, Chen C, Li W. Solving fourth order differential equations using particular solutions of Helmholtz-type equations Applied Mathematics Letters. 86: 179-185. DOI: 10.1016/J.Aml.2018.06.012 |
0.477 |
|
2018 |
Dou F, Li Z, Chen C, Tian Z. Analysis On the Method of Fundamental Solutions for Biharmonic Equations Applied Mathematics and Computation. 339: 346-366. DOI: 10.1016/J.Amc.2018.07.016 |
0.451 |
|
2018 |
Karageorghis A, Jankowska MA, Chen C. Kansa-RBF Algorithms for Elliptic Problems In Regular Polygonal Domains Numerical Algorithms. 79: 399-421. DOI: 10.1007/S11075-017-0443-5 |
0.447 |
|
2017 |
Lv H, Hao F, Wang Y, Chen C. The MFS versus the Trefftz method for the Laplace equation in 3D Engineering Analysis With Boundary Elements. 83: 133-140. DOI: 10.1016/J.Enganabound.2017.06.006 |
0.5 |
|
2017 |
Pei X, Chen C, Dou F. The MFS and MAFS for solving Laplace and biharmonic equations Engineering Analysis With Boundary Elements. 80: 87-93. DOI: 10.1016/J.Enganabound.2017.02.011 |
0.498 |
|
2017 |
Dangal TR, Chen C, Lin J. Polynomial particular solutions for solving elliptic partial differential equations Computers & Mathematics With Applications. 73: 60-70. DOI: 10.1016/J.Camwa.2016.10.024 |
0.521 |
|
2017 |
Lin J, Chen C, Wang F, Dangal T. Method of particular solutions using polynomial basis functions for the simulation of plate bending vibration problems Applied Mathematical Modelling. 49: 452-469. DOI: 10.1016/J.Apm.2017.05.012 |
0.504 |
|
2017 |
Tian Z, Li Z, Huang H, Chen CS. Analysis of the method of fundamental solutions for the modified Helmholtz equation Applied Mathematics and Computation. 305: 262-281. DOI: 10.1016/J.Amc.2017.01.063 |
0.492 |
|
2017 |
Liu X, Chen CS, Karageorghis A. Conformal Mapping for the Efficient Solution of Poisson Problems with the Kansa-RBF Method Journal of Scientific Computing. 71: 1035-1061. DOI: 10.1007/S10915-016-0330-6 |
0.402 |
|
2017 |
Yao G, Chen C, Zheng H. A modified method of approximate particular solutions for solving linear and nonlinear PDEs Numerical Methods For Partial Differential Equations. 33: 1839-1858. DOI: 10.1002/Num.22161 |
0.415 |
|
2016 |
Lin J, Chen CS, Liu C. Fast Solution of Three-Dimensional Modified Helmholtz Equations by the Method of Fundamental Solutions Communications in Computational Physics. 20: 512-533. DOI: 10.4208/Cicp.060915.301215A |
0.474 |
|
2016 |
Karageorghis A, Chen CS, Liu X. Kansa-RBF Algorithms for Elliptic Problems in Axisymmetric Domains Siam Journal On Scientific Computing. 38. DOI: 10.1137/15M1037974 |
0.486 |
|
2016 |
Lamichhane AR, Young DL, Chen CS. Fast method of approximate particular solutions using Chebyshev interpolation Engineering Analysis With Boundary Elements. 64: 290-294. DOI: 10.1016/J.Enganabound.2015.12.015 |
0.482 |
|
2016 |
Li M, Tian ZL, Hon YC, Chen CS, Wen PH. Improved finite integration method for partial differential equations Engineering Analysis With Boundary Elements. 64: 230-236. DOI: 10.1016/J.Enganabound.2015.12.012 |
0.463 |
|
2016 |
Lin J, Chen CS, Liu C, Lu J. Fast simulation of multi-dimensional wave problems by the sparse scheme of the method of fundamental solutions Computers & Mathematics With Applications. 72: 555-567. DOI: 10.1016/J.Camwa.2016.05.016 |
0.443 |
|
2016 |
Zhang X, Chen M, Chen CS, Li Z. Localized method of approximate particular solutions for solving unsteady Navier-Stokes problem Applied Mathematical Modelling. 40: 2265-2273. DOI: 10.1016/J.Apm.2015.09.048 |
0.512 |
|
2016 |
Chen CS, Karageorghis A, Li Y. On choosing the location of the sources in the MFS Numerical Algorithms. 72: 107-130. DOI: 10.1007/S11075-015-0036-0 |
0.403 |
|
2015 |
Zhang X, An X, Chen CS. Local RBFs Based Collocation Methods for Unsteady Navier-Stokes Equations Advances in Applied Mathematics and Mechanics. 7: 430-440. DOI: 10.4208/Aamm.2013.M337 |
0.469 |
|
2015 |
Wang MQ, Wang CX, Li M, Chen CS. A numerical scheme based on FD-RBF to solve fractional-diffusion inverse heat conduction problems Numerical Heat Transfer; Part a: Applications. 68: 978-992. DOI: 10.1080/10407782.2014.986376 |
0.376 |
|
2015 |
Lamichhane AR, Chen CS. Particular solutions of Laplace and bi-harmonic operators using Matérn radial basis functions International Journal of Computer Mathematics. 1-17. DOI: 10.1080/00207160.2015.1127359 |
0.442 |
|
2015 |
Li W, Li M, Chen CS, Liu X. Compactly supported radial basis functions for solving certain high order partial differential equations in 3D Engineering Analysis With Boundary Elements. 55: 2-9. DOI: 10.1016/J.Enganabound.2014.11.012 |
0.522 |
|
2015 |
Yao G, Chen CS, Li W, Young DL. The localized method of approximated particular solutions for near-singular two- and three-dimensional problems Computers and Mathematics With Applications. DOI: 10.1016/J.Camwa.2015.09.028 |
0.447 |
|
2015 |
Li M, Chen CS, Hon YC, Wen PH. Finite integration method for solving multi-dimensional partial differential equations Applied Mathematical Modelling. 39: 4979-4994. DOI: 10.1016/J.Apm.2015.03.049 |
0.447 |
|
2015 |
Lamichhane AR, Chen CS. The closed-form particular solutions for Laplace and biharmonic operators using a Gaussian function Applied Mathematics Letters. 46: 50-56. DOI: 10.1016/J.Aml.2015.02.004 |
0.496 |
|
2015 |
Yao G, Duo J, Chen CS, Shen LH. Implicit local radial basis function interpolations based on function values Applied Mathematics and Computation. 265: 91-102. DOI: 10.1016/J.Amc.2015.04.107 |
0.383 |
|
2015 |
Liu XY, Karageorghis A, Chen CS. A Kansa-Radial Basis Function Method for Elliptic Boundary Value Problems in Annular Domains Journal of Scientific Computing. DOI: 10.1007/S10915-015-0009-4 |
0.504 |
|
2014 |
Lin J, Chen W, Chen CS. Numerical treatment of acoustic problems with boundary singularities by the singular boundary method Journal of Sound and Vibration. 333: 3177-3188. DOI: 10.1016/J.Jsv.2014.02.032 |
0.487 |
|
2014 |
Li M, Chen CS, Chu CC, Young DL. Transient 3D heat conduction in functionally graded materials by the method of fundamental solutions Engineering Analysis With Boundary Elements. 45: 62-67. DOI: 10.1016/J.Enganabound.2014.01.019 |
0.466 |
|
2014 |
Feng G, Li M, Chen CS. On the ill-conditioning of the MFS for irregular boundary data with sufficient regularity Engineering Analysis With Boundary Elements. 41: 98-102. DOI: 10.1016/J.Enganabound.2014.01.011 |
0.347 |
|
2014 |
Lin CY, Gu MH, Young DL, Chen CS. Localized method of approximate particular solutions with Cole-Hopf transformation for multi-dimensional Burgers equations Engineering Analysis With Boundary Elements. 40: 78-92. DOI: 10.1016/J.Enganabound.2013.11.019 |
0.447 |
|
2014 |
Liu X, Li W, Li M, Chen CS. Circulant matrix and conformal mapping for solving partial differential equations Computers & Mathematics With Applications. 68: 67-76. DOI: 10.1016/J.Camwa.2014.05.005 |
0.412 |
|
2014 |
Lin J, Chen W, Chen CS. A new scheme for the solution of reaction diffusion and wave propagation problems Applied Mathematical Modelling. 38: 5651-5664. DOI: 10.1016/J.Apm.2014.04.060 |
0.502 |
|
2013 |
Lin J, Chen W, Chen C, Jiang X. Fast Boundary Knot Method for Solving Axisymmetric Helmholtz Problems with High Wave Number Cmes-Computer Modeling in Engineering & Sciences. 94: 485-505. DOI: 10.3970/Cmes.2013.094.485 |
0.361 |
|
2013 |
Jiang X, Chen W, Chen CS. A Fast Method Of Fundamental Solutions For Solving Helmholtz-Type Equations International Journal of Computational Methods. 10: 1341008. DOI: 10.1142/S0219876213410089 |
0.457 |
|
2013 |
Chen CS, Huang C-, Lin KH. On The Convergence Of The Mfs–Mps Scheme For 1D Poisson'S Equation International Journal of Computational Methods. 10: 1341006. DOI: 10.1142/S0219876213410065 |
0.524 |
|
2013 |
Chen W, Lin J, Chen CS. The Method of Fundamental Solutions for Solving Exterior Axisymmetric Helmholtz Problems with High Wave-Number Advances in Applied Mathematics and Mechanics. 5: 477-493. DOI: 10.1017/S207007330000134X |
0.435 |
|
2013 |
Li M, Chen W, Chen CS. The Localized RBFs Collocation Methods for Solving High Dimensional PDEs Engineering Analysis With Boundary Elements. 37: 1300-1304. DOI: 10.1016/J.Enganabound.2013.06.001 |
0.43 |
|
2013 |
Jiang X, Chen W, Chen CS. Fast multipole accelerated boundary knot method for inhomogeneous Helmholtz problems Engineering Analysis With Boundary Elements. 37: 1239-1243. DOI: 10.1016/J.Enganabound.2013.05.007 |
0.407 |
|
2013 |
Li M, Chen CS, Karageorghis A. The MFS for the solution of harmonic boundary value problems with non-harmonic boundary conditions Computers & Mathematics With Applications. 66: 2400-2424. DOI: 10.1016/J.Camwa.2013.09.004 |
0.429 |
|
2012 |
Jiang T, Li M, Chen C. The Method of Particular Solutions for Solving Inverse Problems of a Nonhomogeneous Convection-Diffusion Equation with Variable Coefficients Numerical Heat Transfer Part a-Applications. 61: 338-352. DOI: 10.1080/10407782.2011.643722 |
0.487 |
|
2012 |
Kompiš V, Qin Q, Fu Z, Chen C, Droppa P, Kelemen M, Chen W. Parallel computational models for composites reinforced by CNT-fibres Engineering Analysis With Boundary Elements. 36: 47-52. DOI: 10.1016/J.Enganabound.2011.04.009 |
0.338 |
|
2012 |
Chen C, Fan C, Wen P. The method of approximate particular solutions for solving certain partial differential equations Numerical Methods For Partial Differential Equations. 28: 506-522. DOI: 10.1002/Num.20631 |
0.518 |
|
2011 |
Chen C, Fan C, Wen P. The Method of Approximate Particular Solutions for Solving Elliptic Problems with Variable Coefficients International Journal of Computational Methods. 8: 545-559. DOI: 10.1142/S0219876211002484 |
0.516 |
|
2011 |
Li M, Chen CS, Hon YC. A Meshless Method for Solving Nonhomogeneous Cauchy Problems Engineering Analysis With Boundary Elements. 35: 499-506. DOI: 10.1016/J.Enganabound.2010.09.003 |
0.522 |
|
2011 |
Yao G, Šarler B, Chen C. A comparison of three explicit local meshless methods using radial basis functions Engineering Analysis With Boundary Elements. 35: 600-609. DOI: 10.1016/J.Enganabound.2010.06.022 |
0.391 |
|
2011 |
Yao G, Kolibal J, Chen CS. A localized approach for the method of approximate particular solutions Computers and Mathematics With Applications. 61: 2376-2387. DOI: 10.1016/J.Camwa.2011.02.007 |
0.514 |
|
2010 |
Chen CS, Kwok TO, Ling L. Adaptive method of particular solution for solving 3D inhomogeneous elliptic equations International Journal of Computational Methods. 7: 499-511. DOI: 10.1142/S0219876210002271 |
0.509 |
|
2010 |
Li M, Chen C, Tsai CH. Meshless Method Based on Radial Basis Functions for Solving Parabolic Partial Differential Equations with Variable Coefficients Numerical Heat Transfer Part B-Fundamentals. 57: 333-347. DOI: 10.1080/10407790.2010.481489 |
0.535 |
|
2010 |
Wen P, Chen C. The method of particular solutions for solving scalar wave equations International Journal For Numerical Methods in Biomedical Engineering. 26: 1878-1889. DOI: 10.1002/Cnm.1278 |
0.506 |
|
2009 |
Yao G, Chen C, Tsai C. A Revisit on the Derivation of the Particular Solution for the Differential Operator ∆ 2 ± λ 2 Advances in Applied Mathematics and Mechanics. 1: 750-768. DOI: 10.4208/Aamm.09-M09S01 |
0.423 |
|
2009 |
Karageorghis A, Chen C, Smyrlis Y. Matrix decomposition RBF algorithm for solving 3D elliptic problems Engineering Analysis With Boundary Elements. 33: 1368-1373. DOI: 10.1016/J.Enganabound.2009.05.006 |
0.433 |
|
2009 |
Tsai C, Chen C, Hsu T. The method of particular solutions for solving axisymmetric polyharmonic and poly-Helmholtz equations Engineering Analysis With Boundary Elements. 33: 1396-1402. DOI: 10.1016/J.Enganabound.2009.04.013 |
0.507 |
|
2009 |
Tsai C, Cheng AH-, Chen C. Particular solutions of splines and monomials for polyharmonic and products of Helmholtz operators Engineering Analysis With Boundary Elements. 33: 514-521. DOI: 10.1016/J.Enganabound.2008.08.007 |
0.452 |
|
2008 |
Tian HY, Reutskiy S, Chen CS. A basis function for approximation and the solutions of partial differential equations Numerical Methods For Partial Differential Equations. 24: 1018-1036. DOI: 10.1002/Num.20304 |
0.462 |
|
2008 |
Reutskiy SY, Chen CS, Tian HY. A boundary meshless method using Chebyshev interpolation and trigonometric basis function for solving heat conduction problems International Journal For Numerical Methods in Engineering. 74: 1621-1644. DOI: 10.1002/Nme.2230 |
0.5 |
|
2007 |
Chen CS, Lee S, Huang C-. Derivation of Particular Solutions Using Chebyshev Polynomial Based Functions International Journal of Computational Methods. 4: 15-32. DOI: 10.1142/S0219876207001096 |
0.502 |
|
2007 |
Glushkov EV, Glushkova NV, Chen CS. SemiAnalytical Solution to Heat Transfer Problems Using Fourier Transform Technique, Radial Basis Functions, and the Method of Fundamental Solutions Numerical Heat Transfer Part B-Fundamentals. 52: 409-427. DOI: 10.1080/10407790701443859 |
0.463 |
|
2007 |
Gospavić R, Popov V, Srecković M, Chen CS. DRM-MD approach for modeling laser–material interaction with axial symmetry Engineering Analysis With Boundary Elements. 31: 200-208. DOI: 10.1016/J.Enganabound.2006.09.006 |
0.42 |
|
2007 |
Karageorghis A, Chen CS, Smyrlis Y. A matrix decomposition RBF algorithm: Approximation of functions and their derivatives Applied Numerical Mathematics. 57: 304-319. DOI: 10.1016/J.Apnum.2006.03.028 |
0.355 |
|
2006 |
Chen CS, Cho HA, Golberg MA. Some comments on the ill-conditioning of the method of fundamental solutions Engineering Analysis With Boundary Elements. 30: 405-410. DOI: 10.1016/J.Enganabound.2006.01.001 |
0.461 |
|
2006 |
Huang CS, Wang S, Chen CS, Li ZC. A radial basis collocation method for Hamilton-Jacobi-Bellman equations Automatica. 42: 2201-2207. DOI: 10.1016/J.Automatica.2006.07.013 |
0.435 |
|
2006 |
Reutskiy SY, Chen CS. Approximation of multivariate functions and evaluation of particular solutions using Chebyshev polynomial and trigonometric basis functions International Journal For Numerical Methods in Engineering. 67: 1811-1829. DOI: 10.1002/Nme.1679 |
0.483 |
|
2005 |
Muleshkov AS, Golberg MA, Chen CS. Particular solutions for axisymmetric Helmholtz-type operators Engineering Analysis With Boundary Elements. 29: 1066-1076. DOI: 10.1016/J.Enganabound.2005.07.008 |
0.507 |
|
2005 |
Alves CJS, Chen CS. A new method of fundamental solutions applied to nonhomogeneous elliptic problems Advances in Computational Mathematics. 23: 125-142. DOI: 10.1007/S10444-004-1833-5 |
0.531 |
|
2005 |
Chen CS, Muleshkov AS, Golberg MA, Mattheij RMM. A mesh‐free approach to solving the axisymmetric Poisson's equation Numerical Methods For Partial Differential Equations. 21: 349-367. DOI: 10.1002/Num.20040 |
0.522 |
|
2004 |
Šarler B, Perko J, Chen C. Radial basis function collocation method solution of natural convection in porous media International Journal of Numerical Methods For Heat & Fluid Flow. 14: 187-212. DOI: 10.1108/09615530410513809 |
0.474 |
|
2004 |
Young D, Chen C, Cheng AH‐, Hong H, Chen J. Special issue: Meshless methods Journal of the Chinese Institute of Engineers. 27: 1-1. DOI: 10.1080/02533839.2004.9670894 |
0.315 |
|
2004 |
Li X, Chen CS. A mesh free method using hyperinterpolation and fast Fourier transform for solving differential equations Engineering Analysis With Boundary Elements. 28: 1253-1260. DOI: 10.1016/J.Enganabound.2003.05.001 |
0.529 |
|
2004 |
Ingber MS, Chen CS, Tanski JA. A mesh free approach using radial basis functions and parallel domain decomposition for solving three-dimensional diffusion equations International Journal For Numerical Methods in Engineering. 60: 2183-2201. DOI: 10.1002/Nme.1043 |
0.528 |
|
2003 |
Li J, Cheng AH-, Chen C. A comparison of efficiency and error convergence of multiquadric collocation method and finite element method Engineering Analysis With Boundary Elements. 27: 251-257. DOI: 10.1016/S0955-7997(02)00081-4 |
0.371 |
|
2003 |
Golberg MA, Muleshkov AS, Chen CS, Cheng AH-. Polynomial particular solutions for certain partial differential operators Numerical Methods For Partial Differential Equations. 19: 112-133. DOI: 10.1002/Num.10033 |
0.54 |
|
2003 |
Li J, Chen CS. Some observations on unsymmetric radial basis function collocation methods for convection–diffusion problems International Journal For Numerical Methods in Engineering. 57: 1085-1094. DOI: 10.1002/Nme.722 |
0.321 |
|
2003 |
Chen CS, Kuhn G, Li J, Mishuris G. Radial basis functions for solving near singular Poisson problems Communications in Numerical Methods in Engineering. 19: 333-347. DOI: 10.1002/Cnm.593 |
0.45 |
|
2002 |
Li J, Hon YC, Chen CS. Numerical comparisons of two meshless methods using radial basis functions Engineering Analysis With Boundary Elements. 26: 205-225. DOI: 10.1016/S0955-7997(01)00101-1 |
0.5 |
|
2002 |
Chen CS, Ganesh M, Golberg MA, Cheng AHD. Multilevel compact radial functions based computational schemes for some elliptic problems Computers and Mathematics With Applications. 43: 359-378. DOI: 10.1016/S0898-1221(01)00292-9 |
0.361 |
|
2001 |
Cheng AH-, Chen CS, Golberg MA, Rashed YF. BEM for theomoelasticity and elasticity with body force : a revisit Engineering Analysis With Boundary Elements. 25: 377-387. DOI: 10.1016/S0955-7997(01)00032-7 |
0.325 |
|
2001 |
Rashed YF, Chen CS, Golberg MA. Efficient evaluation of plate–half space interaction using contour integrals Applied Mathematical Modelling. 25: 967-978. DOI: 10.1016/S0307-904X(01)00025-7 |
0.341 |
|
2001 |
Marcozzi MD, Choi S, Chen CS. On the use of boundary conditions for variational formulations arising in financial mathematics Applied Mathematics and Computation. 124: 197-214. DOI: 10.1016/S0096-3003(00)00087-4 |
0.375 |
|
2000 |
Golberg MA, Chen CS, Ganesh M. Particular solutions of 3D Helmholtz-type equations using compactly supported radial basis functions Engineering Analysis With Boundary Elements. 24: 539-547. DOI: 10.1016/S0955-7997(00)00034-5 |
0.527 |
|
1999 |
Golberg MA, Chen CS, Bowman H. Some recent results and proposals for the use of radial basis functions in the BEM Engineering Analysis With Boundary Elements. 23: 285-296. DOI: 10.1016/S0955-7997(98)00087-3 |
0.502 |
|
1999 |
Golberg MA, Chen CS, Rashed YF. The annihilator method for computing particular solutions to partial differential equations Engineering Analysis With Boundary Elements. 23: 275-279. DOI: 10.1016/S0955-7997(98)00081-2 |
0.5 |
|
1999 |
Muleshkov AS, Golberg MA, Chen CS. Particular solutions of Helmholtz-type operators using higher order polyhrmonic splines Computational Mechanics. 23: 411-419. DOI: 10.1007/S004660050420 |
0.44 |
|
1999 |
Chen CS, Brebbia CA, Power H. Dual reciprocity method using compactly supported radial basis functions Communications in Numerical Methods in Engineering. 15: 137-150. DOI: 10.1002/(Sici)1099-0887(199902)15:2<137::Aid-Cnm233>3.0.Co;2-9 |
0.377 |
|
1998 |
Chen CS, Rashed YF, Golberg MA. A Mesh-Free Method For Linear Diffusion Equations Numerical Heat Transfer Part B-Fundamentals. 33: 469-486. DOI: 10.1080/10407799808915044 |
0.458 |
|
1998 |
Chen CS, Golberg MA, Hon YC. Numerical justification of fundamental solutions and the quasi-Monte Carlo method for Poisson-type equations Engineering Analysis With Boundary Elements. 22: 61-69. DOI: 10.1016/S0955-7997(98)00036-8 |
0.453 |
|
1998 |
Chen CS, Rashed YF. Evaluation of thin plate spline based particular solutions for Helmholtz-type operators for the DRM Mechanics Research Communications. 25: 195-201. DOI: 10.1016/S0093-6413(98)00025-1 |
0.33 |
|
1998 |
Golberg MA, Chen CS, Bowman H, Power H. Some comments on the use of radial basis functions in the dual reciprocity method Computational Mechanics. 22: 61-69. DOI: 10.1007/S004660050339 |
0.397 |
|
1998 |
Chen CS, Golberg MA, Hon YC. The method of fundamental solutions and quasi‐Monte‐Carlo method for diffusion equations International Journal For Numerical Methods in Engineering. 43: 1421-1435. DOI: 10.1002/(Sici)1097-0207(19981230)43:8<1421::Aid-Nme476>3.0.Co;2-V |
0.504 |
|
1998 |
Zerroukat M, Power H, Chen CS. A numerical method for heat transfer problems using collocation and radial basis functions International Journal For Numerical Methods in Engineering. 42: 1263-1278. DOI: 10.1002/(Sici)1097-0207(19980815)42:7<1263::Aid-Nme431>3.0.Co;2-I |
0.347 |
|
1996 |
Golberg MA, Chen CS, Karur SR. Improved multiquadric approximation for partial differential equations Engineering Analysis With Boundary Elements. 18: 9-17. DOI: 10.1016/S0955-7997(96)00033-1 |
0.513 |
|
1995 |
Chen CS. The method of fundamental solutions for non-linear thermal explosions Communications in Numerical Methods in Engineering. 11: 675-681. DOI: 10.1002/Cnm.1640110806 |
0.483 |
|
1994 |
Golberg MA, Chen CS. On a method of Atkinson for evaluating domain integrals in the boundary element method Applied Mathematics and Computation. 60: 125-138. DOI: 10.1016/0096-3003(94)90099-X |
0.475 |
|
1987 |
Chen C. The propagation of nonstationary filtration with absorption Acta Mathematicae Applicatae Sinica. 3: 342-350. DOI: 10.1007/BF02008372 |
0.303 |
|
Show low-probability matches. |