In this paper, the method of particular solutions (MPS) using trigonometric functions as the basis functions is proposed to solve two-dimensional elliptic partial differential equations. The inhomogeneous term of the governing equation is approximated by Fourier series and the closed-form particular solutions of trigonometric functions are derived using the method of undetermined coefficients. Once the particular solutions for the trigonometric basis functions are derived, the standard MPS can be applied for solving partial differential equations. In comparing with the use of radial basis functions and polynomials in the MPS, our proposed approach provides another simple approach to effectively solving two-dimensional elliptic partial diffe...
A standard approach for solving linear partial differential equations is to split the solution into ...
Based on the radial basis functions (RBF) and T-Trefftz solution, this paper presents a new meshless...
In this paper we apply the newly developed method of particular solutions (MPS) and one-stage method...
In this paper, the method of particular solutions (MPS) using trigonometric functions as the basis f...
A new version of the method of approximate particular solutions (MAPSs) using radial basis functions...
In the past, polynomial particular solutions have been obtained for certain types of partial differe...
Polynomial particular solutions have been obtained for certain types of partial differential operato...
Method of particular solutions (MPS) has been implemented in many science and engineering problems b...
© 2020 The method of fundamental solutions (MFS) is a simple and efficient numerical technique for s...
© 2019 Elsevier Ltd The most challenging task of the method of approximate particular solutions (MAP...
A meshless method for solving partial differential equations (PDEs) which combines the method of fun...
The method of approximate particular solutions (MAPS) was first proposed by Chen et al. in Chen, Fan...
The fictitious boundary surrounding the domain is required in the implementation of the method of fu...
The method of approximate particular solutions is extended for solving initial-boundary-value proble...
The localized method is one of the popular approaches in solving large-scale problems in science and...
A standard approach for solving linear partial differential equations is to split the solution into ...
Based on the radial basis functions (RBF) and T-Trefftz solution, this paper presents a new meshless...
In this paper we apply the newly developed method of particular solutions (MPS) and one-stage method...
In this paper, the method of particular solutions (MPS) using trigonometric functions as the basis f...
A new version of the method of approximate particular solutions (MAPSs) using radial basis functions...
In the past, polynomial particular solutions have been obtained for certain types of partial differe...
Polynomial particular solutions have been obtained for certain types of partial differential operato...
Method of particular solutions (MPS) has been implemented in many science and engineering problems b...
© 2020 The method of fundamental solutions (MFS) is a simple and efficient numerical technique for s...
© 2019 Elsevier Ltd The most challenging task of the method of approximate particular solutions (MAP...
A meshless method for solving partial differential equations (PDEs) which combines the method of fun...
The method of approximate particular solutions (MAPS) was first proposed by Chen et al. in Chen, Fan...
The fictitious boundary surrounding the domain is required in the implementation of the method of fu...
The method of approximate particular solutions is extended for solving initial-boundary-value proble...
The localized method is one of the popular approaches in solving large-scale problems in science and...
A standard approach for solving linear partial differential equations is to split the solution into ...
Based on the radial basis functions (RBF) and T-Trefftz solution, this paper presents a new meshless...
In this paper we apply the newly developed method of particular solutions (MPS) and one-stage method...