A Comparative Study on Polynomial Expansion Method and Polynomial Method of Particular Solutions
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Publication:5077110
DOI10.4208/aamm.OA-2020-0385zbMath1499.35167OpenAlexW4214663539MaRDI QIDQ5077110
Chia-Cheng Tsai, Jen-Yi Chang, Ru-yun Chen
Publication date: 17 May 2022
Published in: Advances in Applied Mathematics and Mechanics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.4208/aamm.oa-2020-0385
collocation methodpolynomial expansion methodmultiple-scale techniquePascal polynomialpolynomial method of particular solutions
Spectral, collocation and related methods for boundary value problems involving PDEs (65N35) Polynomial solutions to PDEs (35C11)
Cites Work
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- Recent advances on radial basis function collocation methods
- The method of particular solutions for solving axisymmetric polyharmonic and poly-Helmholtz equations
- A modified collocation Trefftz method for the inverse Cauchy problem of Laplace equation
- Localized method of fundamental solutions for solving two-dimensional Laplace and biharmonic equations
- A multiple-scale Pascal polynomial for 2D Stokes and inverse Cauchy-Stokes problems
- Meshfree explicit local radial basis function collocation method for diffusion problems
- Smoothed particle hydrodynamics (SPH): an overview and recent developments
- Generalizing the finite element method: Diffuse approximation and diffuse elements
- A new meshless local Petrov-Galerkin (MLPG) approach in computational mechanics
- A boundary point interpolation method for stress analysis of solids.
- Meshless methods: An overview and recent developments
- Reproducing kernel particle methods for large deformation analysis of nonlinear structures
- Numerical investigation on convergence of boundary knot method in the analysis of homogeneous Helmholtz, modified Helmholtz, and convection-diffusion problems.
- The meshless local Petrov-Galerkin (MLPG) approach for solving problems in elasto-statics
- A multiple-scale Pascal polynomial triangle solving elliptic equations and inverse Cauchy problems
- A new meshless method for solving steady-state nonlinear heat conduction problems in arbitrary plane domain
- A high accurate simulation of thin plate problems by using the method of approximate particular solutions with high order polynomial basis
- Solving fourth order differential equations using particular solutions of Helmholtz-type equations
- The method of fundamental solutions for the numerical solution of the biharmonic equation
- A new implementation of the element free Galerkin method
- Recent developments in the numerical evaluation of particular solutions in the boundary element method
- Numerical solution to the deflection of thin plates using the two-dimensional Berger equation with a meshless method based on multiple-scale Pascal polynomials
- Polynomial particular solutions for solving elliptic partial differential equations
- Localized boundary knot method and its application to large-scale acoustic problems
- Symmetric method of approximate particular solutions for solving certain partial differential equations
- An overview of the method of fundamental solutions -- solvability, uniqueness, convergence, and stability
- An efficient method of approximate particular solutions using polynomial basis functions
- Method of particular solutions using polynomial basis functions for the simulation of plate bending vibration problems
- A multiple-scale higher order polynomial collocation method for 2D and 3D elliptic partial differential equations with variable coefficients
- A wave based method for the axisymmetric dynamic analysis of acoustic and poroelastic problems
- Novel meshless method for solving the potential problems with arbitrary domain
- An Efficient Trefftz-Based Method for Three-Dimensional Helmholtz Problems in Unbounded Domains
- A Modified Trefftz Method for Two-Dimensional Laplace Equation Considering the Domain's Characteristic Length
- Particular Solutions of Chebyshev Polynomials for Polyharmonic and Poly-Helmholtz Equations
- A Highly Accurate Technique for Interpolations Using Very High-Order Polynomials, and Its Applications to Some Ill-Posed Linear Problems
- Meshless local radial basis function collocation method for convective‐diffusive solid‐liquid phase change problems
- Element‐free Galerkin methods
- New Insights in Boundary-only and Domain-type RBF Methods
- Polynomial particular solutions for certain partial differential operators
- Reproducing kernel particle methods
- A Meshfree Computational Approach Based on Multiple-Scale Pascal Polynomials for Numerical Solution of a 2D Elliptic Problem with Nonlocal Boundary Conditions
- A local point interpolation method for static and dynamic analysis of thin beams
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