References
- X. W. Gao and J. Wang Interface Integral BEM for Solving Multi-medium Heat Conduction Problems, Eng. Anal. Boundary Elem., vol. 33, pp. 539–546, 2009.
- X. W. Gao, L. Guo, and C. Zhang Three-step Multi-domain BEM Solver for Nonhomogeneous Material Problems, Eng. Anal. Boundary Elem., vol. 31, pp. 965–973, 2007.
- M. A. Atalay, E. D. Aydin, and M. Aydin Multi-region Heat Conduction Problems by Boundary Element Method, Int. J. Heat Mass Transfer, vol. 47, pp. 1549–1553, 2004.
- H. F. Peng, Y. G. Bai, K. Yang, and X. W. Gao Three-step Multi-domain BEM for Solving Transient Multi-media Heat Conduction Problems, Eng. Anal. Boundary Elem., vol. 37, pp. 1545–1555, 2013.
- G. Burgess and E. A. Mahajerin A Comparison of the Boundary Element and Superposition Methods, Comput. Struct., vol. 19, pp. 697–705, 1984.
- H. C. Sun, X. H. Li, and L. Z. Zhang Virtual Boundary Element-collocation Method for Solving Problems of Elasticity, Chin. J. Comput. Mech., vol. 8, pp. 15–23, 1991 (in Chinese).
- H. C. Sun, L. Z. Zhang, Q. Xu, and Y. M. Zhang Nonsingularity Boundary Element Methods, Dalian University of Technology Press, Dalian, 1999 (in Chinese).
- X. H. Zhang and P. Zhang Heterogeneous Heat Conduction Problems by an Improved Element-free Galerkin Method, Numer. Heat Transfer B Fund., vol. 65, pp. 359–375, 2014.
- X. T. Pham Two-dimensional Rosenthal Moving Heat Source Analysis Using the Meshless Element Free Galerkin Method, Numer. Heat Transfer A Appl., vol. 63, pp. 807–823, 2013.
- Y. Q. He, H. T. Yang, and A. J. Deeks An Element-free Galerkin Scaled Boundary Method for Steady-state Heat Transfer Problems, Numer. Heat Transfer B Fund., vol. 64, pp. 199–217, 2013.
- A. N. Kalarakis, G. C. Bourantas, E. D. Skouras, V. C. Loukopoulos, and V. N. Burganos Lattice–Boltzmann and Meshless Point Collocation Solvers for Fluid Flow and Conjugate Heat Transfer, Int. J. Numer. Meth. Fluids, vol. 70, pp. 1428–1442, 2012.
- H. Thakur, K. M. Singh, and P. K. Sahoo MLPG Analysis of Nonlinear Heat Conduction in Irregular Domains, CMES, vol. 68, pp. 117–149, 2010.
- L. X. Gu and A. V. Kumar Solution Structures for Imposing Boundary Conditions in Mesh Free Analysis of Heat Conduction Problems, Heat Transfer Div. ASME, vol. 376–1, pp. 157–165, 2005.
- J. Ling and D. S. Yang Virtual Boundary Meshless with Trefftz Method for the Steady-state Heat Conduction Crack Problem, Numer. Heat Transfer B Fund., vol. 68, pp. 141–157, 2015.
- H. Xiang and X. H. Zhang Variational Multiscale Element-free Galerkin Method and Precise Time Step Integration Method for Convection–Diffusion Problems, Numer. Heat Transfer A Appl., vol. 67, pp. 210–223, 2015.
- M. Fahs and A. Younes A high-accurate Fourier-Galerkin Solution for Buoyancy-driven Flow in a Square Cavity, Numer. Heat Transfer B Fund., vol. 65, pp. 495–517, 2014.
- X. H. Zhang and P. Zhang Heterogeneous Heat Conduction Problems by an Improved Element-free Galerkin Method, Numer. Heat Transfer B Fund., vol. 65, pp. 359–375, 2014.
- D. X. Han, B. Yu, and X. Y. Zhang Study on a BFC-based Pod-galerkin Reduced-Order Model for the Unsteady-state Variable-property Heat Transfer Problem, Numer. Heat Transfer B Fund., vol. 65, pp. 256–281, 2014.
- B. Yu, G. J. Yu, Z. Z. Cao, D. X. Han, and Q. Q. Shao Fast Calculation of the Soil Temperature Field Around a Buried Oil Pipeline Using a Body-fitted Coordinates-based Pod-Galerkin Reduced-order Model, Numer. Heat Transfer A Appl., vol. 63, pp. 776–794, 2013.
- E. C. Romao and L. F. M. de Moura Galerkin and Least Squares Methods to Solve a 3d Convection–Diffusion-reaction Equation with Variable Coefficients, Numer. Heat Transfer A Appl., vol. 61, pp. 669–698, 2012.
- J. Sun, H. L. Yi, and H. P. Tan The Improved Direct Collocation Meshless Approach for Radiative Heat Transfer in Participating Media, Numer. Heat Transfer B Fund., vol. 68, pp. 533–553, 2015.
- N. D. Monnig, B. Fornberg, and F. G. Meyer Inverting Nonlinear Dimensionality Reduction with Scale-free Radial Basis Function Interpolation, Appl. Comput. Harmon. A, vol. 37, pp. 162–170, 2014.
- R. T. L. Chan and S. Hubbert Options Pricing Under the One-dimensional Jump-diffusion Model Using the Radial Basis Function Interpolation Scheme, Rev. Deriv. Res., vol. 17, pp. 161–189, 2014.
- F. Toja-Silva, J. Favier, and A. Pinelli Radial Basis Function (RBF)-based Interpolation, and Spreading for the Immersed Boundary Method, Comput. Fluids, vol. 105, pp. 66–75, 2014.