© 2019 Elsevier Ltd In this paper, we apply the method of approximate particular solutions (MAPS) based on the trigonometric functions to solve the fourth order partial differential equations (PDEs) through the use of particular solutions of two second order differential equations. The derivation of the closed-form particular solutions for higher order PDEs is a challenge and could be tedious. Such task can be achieved by a simple algebraic procedure to alleviate the difficulty of the derivation of particular solutions for fourth order PDEs. Since the closed-form particular solutions for the second order PDEs with constant coefficients are known, the proposed solution procedure is simple and direct. Five numerical examples are illustrated t...
In this paper, the method of particular solutions (MPS) using trigonometric functions as the basis f...
A new numerical method for solving fourth order ordinary differential equations directly is proposed...
Some ordinary differential equations do not have exact solutions. Their solutions can be approximate...
© 2019 Elsevier Ltd In this paper, we apply the method of approximate particular solutions (MAPS) ba...
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) was first proposed by Chen et al. in Chen, Fan...
In this paper we apply the newly developed method of particular solutions (MPS) and one-stage method...
© 2019 Elsevier Ltd The most challenging task of the method of approximate particular solutions (MAP...
In the past, dealing with fourth-order partial differential equations using the Local Method was not...
In this paper, we classified a class of fourth-order partial differential equations (PDEs) to be fou...
This paper reports a method to solve ordinary fourth-order differential equations in the form of ord...
This paper reports a method to solve ordinary fourth-order differential equations in the form of ord...
AbstractWe develop a method of second order for the continuous approximation of the solution of a tw...
A four point block method based on Adams type formulae is proposed for solving general fourth order...
In this paper, the method of particular solutions (MPS) using trigonometric functions as the basis f...
A new numerical method for solving fourth order ordinary differential equations directly is proposed...
Some ordinary differential equations do not have exact solutions. Their solutions can be approximate...
© 2019 Elsevier Ltd In this paper, we apply the method of approximate particular solutions (MAPS) ba...
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) was first proposed by Chen et al. in Chen, Fan...
In this paper we apply the newly developed method of particular solutions (MPS) and one-stage method...
© 2019 Elsevier Ltd The most challenging task of the method of approximate particular solutions (MAP...
In the past, dealing with fourth-order partial differential equations using the Local Method was not...
In this paper, we classified a class of fourth-order partial differential equations (PDEs) to be fou...
This paper reports a method to solve ordinary fourth-order differential equations in the form of ord...
This paper reports a method to solve ordinary fourth-order differential equations in the form of ord...
AbstractWe develop a method of second order for the continuous approximation of the solution of a tw...
A four point block method based on Adams type formulae is proposed for solving general fourth order...
In this paper, the method of particular solutions (MPS) using trigonometric functions as the basis f...
A new numerical method for solving fourth order ordinary differential equations directly is proposed...
Some ordinary differential equations do not have exact solutions. Their solutions can be approximate...