A local meshless collocation method for solving certain inverse problems
DOI10.1016/j.enganabound.2014.11.034zbMath1403.65120OpenAlexW2014584408MaRDI QIDQ1654713
Guangming Yao, Wen Li, Xiao Yan Liu
Publication date: 9 August 2018
Published in: Engineering Analysis with Boundary Elements (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.enganabound.2014.11.034
inverse problemTikhonov regularizationcompactly supported radial basis functionsL-curvelocal meshless method
Spectral, collocation and related methods for boundary value problems involving PDEs (65N35) Numerical methods for inverse problems for initial value and initial-boundary value problems involving PDEs (65M32) Numerical methods for inverse problems for boundary value problems involving PDEs (65N21)
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Cites Work
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- A meshless method based on RBFs method for nonhomogeneous backward heat conduction problem
- An inverse boundary problem for one-dimensional heat equation with a multilayer domain
- Multiquadrics - a scattered data approximation scheme with applications to computational fluid-dynamics. I: Surface approximations and partial derivative estimates
- Numerical method for the inverse heat transfer problem in composite materials with Stefan-Boltzmann conditions
- A new investigation into regularization techniques for the method of fundamental solutions
- An alternating iterative MFS algorithm for the Cauchy problem for the modified Helmholtz equation
- The method of fundamental solutions for elliptic boundary value problems
- Regularization tools: A Matlab package for analysis and solution of discrete ill-posed problems
- Particular solutions of 3D Helmholtz-type equations using compactly supported radial basis functions
- Solution of Poisson's equation by iterative DRBEM using compactly supported, positive definite radial basis function
- A numerical computation for inverse boundary determination problem
- Solution of Stokes flow using an iterative DRBEM based on compactly-supported, positive-definite radial basis function.
- Compactly supported radial basis functions for shallow water equations.
- Compactly supported positive definite radial functions
- Piecewise polynomial, positive definite and compactly supported radial functions of minimal degree
- A meshless method for solving nonhomogeneous Cauchy problems
- Method of fundamental solutions with regularization techniques for Cauchy problems of elliptic operators
- A fundamental solution method for inverse heat conduction problem
- Inverse identification of thermal parameters using reduced-basis method
- Rapid inverse parameter estimation using reduced-basis approximation with asymptotic error estimation
- THE METHOD OF FUNDAMENTAL SOLUTIONS FOR AN INVERSE INTERNAL BOUNDARY VALUE PROBLEM FOR THE BIHARMONIC EQUATION
- METHOD OF FUNDAMENTAL SOLUTION FOR AN INVERSE HEAT CONDUCTION PROBLEM WITH VARIABLE COEFFICIENTS
- Boundary control for inverse Cauchy problems of the Laplace equations
- Inverse identification of elastic modulus of dental implant–bone interfacial tissue using neural network and FEA model
- Dual reciprocity method using compactly supported radial basis functions
- The Use of the L-Curve in the Regularization of Discrete Ill-Posed Problems
- A radial basis meshless method for solving inverse boundary value problems
- A new class of radial basis functions with compact support
- Radial basis functions for solving near singular Poisson problems
- Direct solution of ill-posed boundary value problems by radial basis function collocation method
- Some comments on the use of radial basis functions in the dual reciprocity method
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