In this study, an efficient framework provided to handle nonlinear partial differential equations by implementing perturbation iteration method. This method is recovered and amended to solve the Burgers' and regularized long wave equations. Comparing our new solutions with the exact solutions reveals that this technique is extremely accurate and effective in solving nonlinear models. Convergence analysis and error estimate are also supplied using some critical theorems
There are various linear and nonlinear one-dimensional partial differential equations that are the f...
In this article, a framework is developed to get more approximate solutions to nonlinear partial dif...
The description of many interesting phenomena in science and engineering leads to infinite-dimension...
In this study, an efficient framework is provided to handle nonlinear partial differential equations...
In this paper, the new optimal perturbation iteration method has been applied to solve the generaliz...
In this paper, the new optimal perturbation iteration method has been applied to solve the generaliz...
AbstractA new technique for solving partial differential equations has been developed and tested. Th...
In this article, a framework is developed to get more approximate solutions to nonlinear partial dif...
The paper presents the optimal homotopy perturbation method, which is a new method to find approxima...
The previously developed new perturbation-iteration algorithm has been applied to differential equat...
License, which permits unrestricted use, distribution, and reproduction in any medium, provided the ...
The previously developed new perturbation-iteration algorithm has been applied to differential equat...
A large number of problems in physics and engineering leads to boundary value or initial boundary va...
The regularized long wave (RLW) equation is solved by a Petrov-Galerkin method using quadratic B-spl...
The main goal of the current work is to develop numerical approaches that use the Yang transform, th...
There are various linear and nonlinear one-dimensional partial differential equations that are the f...
In this article, a framework is developed to get more approximate solutions to nonlinear partial dif...
The description of many interesting phenomena in science and engineering leads to infinite-dimension...
In this study, an efficient framework is provided to handle nonlinear partial differential equations...
In this paper, the new optimal perturbation iteration method has been applied to solve the generaliz...
In this paper, the new optimal perturbation iteration method has been applied to solve the generaliz...
AbstractA new technique for solving partial differential equations has been developed and tested. Th...
In this article, a framework is developed to get more approximate solutions to nonlinear partial dif...
The paper presents the optimal homotopy perturbation method, which is a new method to find approxima...
The previously developed new perturbation-iteration algorithm has been applied to differential equat...
License, which permits unrestricted use, distribution, and reproduction in any medium, provided the ...
The previously developed new perturbation-iteration algorithm has been applied to differential equat...
A large number of problems in physics and engineering leads to boundary value or initial boundary va...
The regularized long wave (RLW) equation is solved by a Petrov-Galerkin method using quadratic B-spl...
The main goal of the current work is to develop numerical approaches that use the Yang transform, th...
There are various linear and nonlinear one-dimensional partial differential equations that are the f...
In this article, a framework is developed to get more approximate solutions to nonlinear partial dif...
The description of many interesting phenomena in science and engineering leads to infinite-dimension...