Add to ORKGIn the past, dealing with fourth-order partial differential equations using the Local Method was not reliable due to difficulties in solving them directly. An approach such as splitting these equations into two Poisson differential equations was adopted to alleviate such challenges. However, this has a limitation since it is only applicable to Dirichlet and Laplace boundary conditions. In this paper, we solve fourth-order PDEs directly using the LMAPS. The improvement on the accuracy of this method was as a result of the proposed distribution of boundary conditions to alternating boundary points. And, also the use of suitable shape parameter; calculated using LOOCV(Leave-One-Out-Cross-Validation) Algorithm. The effectiveness of this Method ...
We describe a new approach to derive numerical approximations of boundary conditions for high-order ...
Partial differential equation (PDE) based geometric modelling has a number of advantages such as few...
In this paper, the localized method of approximate particular solutions (LMAPS) using radial basis f...
To overcome the difficulty for solving fourth order partial differential equations (PDEs) using loca...
© 2020 International Association for Mathematics and Computers in Simulation (IMACS) Due to certain ...
The method of approximate particular solutions (MAPS) has been recently developed to solve various t...
AbstractThe method of approximate particular solutions (MAPS) has been recently developed to solve v...
In this thesis, the method of approximate particular solutions(MAPS) and localized method of approxi...
Meshless methods are relatively new numerical methods which have gained popularity in computational ...
© 2019 Elsevier Ltd In this paper, we apply the method of approximate particular solutions (MAPS) ba...
Polynomial particular solutions have been obtained for certain types of partial differential operato...
In this paper we apply the newly developed method of particular solutions (MPS) and one-stage method...
Method of particular solutions (MPS) has been implemented in many science and engineering problems b...
In this paper, we present a fourth-order algorithm to solve Poisson's equation in two and three dime...
The method of approximate particular solutions (MAPS) was first proposed by Chen et al. in Chen, Fan...
We describe a new approach to derive numerical approximations of boundary conditions for high-order ...
Partial differential equation (PDE) based geometric modelling has a number of advantages such as few...
In this paper, the localized method of approximate particular solutions (LMAPS) using radial basis f...
To overcome the difficulty for solving fourth order partial differential equations (PDEs) using loca...
© 2020 International Association for Mathematics and Computers in Simulation (IMACS) Due to certain ...
The method of approximate particular solutions (MAPS) has been recently developed to solve various t...
AbstractThe method of approximate particular solutions (MAPS) has been recently developed to solve v...
In this thesis, the method of approximate particular solutions(MAPS) and localized method of approxi...
Meshless methods are relatively new numerical methods which have gained popularity in computational ...
© 2019 Elsevier Ltd In this paper, we apply the method of approximate particular solutions (MAPS) ba...
Polynomial particular solutions have been obtained for certain types of partial differential operato...
In this paper we apply the newly developed method of particular solutions (MPS) and one-stage method...
Method of particular solutions (MPS) has been implemented in many science and engineering problems b...
In this paper, we present a fourth-order algorithm to solve Poisson's equation in two and three dime...
The method of approximate particular solutions (MAPS) was first proposed by Chen et al. in Chen, Fan...
We describe a new approach to derive numerical approximations of boundary conditions for high-order ...
Partial differential equation (PDE) based geometric modelling has a number of advantages such as few...
In this paper, the localized method of approximate particular solutions (LMAPS) using radial basis f...