An efficient accurate local method of approximate particular solutions for solving convection-diffusion problems
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Publication:463593
DOI10.1016/J.ENGANABOUND.2014.06.004zbMath1297.65193OpenAlexW2053192890MaRDI QIDQ463593
C. A. Bustamante, Whady F. Flórez, Henry Power
Publication date: 16 October 2014
Published in: Engineering Analysis with Boundary Elements (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.enganabound.2014.06.004
Related Items (4)
The extended method of approximate particular solutions to simulate two-dimensional electromagnetic scattering from arbitrary shaped anisotropic objects ⋮ Numerical examination of the effect of different boundary conditions on the method of approximate particular solutions for scalar and vector problems ⋮ The Modified Localized Method of Approximated Particular Solutions for Linear and Nonlinear Convection-Diffusion-Reaction PDEs ⋮ A local collocation method with radial basis functions for an electrospinning problem
Cites Work
- Unnamed Item
- A truly boundary-only meshfree method for inhomogeneous problems based on recursive composite multiple reciprocity technique
- An order-\(N\) complexity meshless algorithm for transport-type PDEs, based on local Hermitian interpolation
- Localized method of approximate particular solutions with Cole-Hopf transformation for multi-dimensional Burgers equations
- Multiquadrics - a scattered data approximation scheme with applications to computational fluid-dynamics. I: Surface approximations and partial derivative estimates
- A localized approach for the method of approximate particular solutions
- The use of PDE centres in the local RBF Hermitian method for 3D convective-diffusion problems
- Local multiquadric approximation for solving boundary value problems
- Meshfree boundary particle method applied to Helmholtz problems
- A comparison of three explicit local meshless methods using radial basis functions
- The method of approximate particular solutions for solving certain partial differential equations
- THE METHOD OF APPROXIMATE PARTICULAR SOLUTIONS FOR SOLVING ELLIPTIC PROBLEMS WITH VARIABLE COEFFICIENTS
- Improving Volume Element Methods by Meshless Radial Basis Function Techniques
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