The Whitham equation is a non-local model for nonlinear dispersive water waves. Since this equation is both nonlinear and non-local, exact or analytical solutions are rare except for in a few special cases. As such, an analytical method which results in minimal error is highly desirable for general forms of the Whitham equation. We obtain approximate analytical solutions to the non-local Whitham equation for general initial data by way of the optimal homotopy analysis method, through the use of a partial differential auxiliary linear operator. A method to control the residual error of these approximate solutions, through the use of the embedded convergence control parameter, is discussed in the context of optimal homotopy analysis. We obtai...
We obtain approximate solutions to the Dym equation, and associated initial value problem, for gener...
In recent work on the area of approximation methods for the solution of nonlinear differential equat...
The homotopy method for the solution of nonlinear equations is revisited in the present study. An an...
The Whitham equation is a non-local model for nonlinear dispersive water waves. Since this equation ...
In the present paper, we have considered three methods with which to control the error in the homoto...
International audienceWe derive the Whitham equations from the water waves equations in the shallow ...
The two-dimensional nonlinear wave equations are considered. Solution to the problem is approximated...
In the present paper, we have considered three methods with which to control the error in the homoto...
AbstractThe homotopy perturbation method (HPM) is employed to find the explicit and numerical travel...
Implicitly defined fully nonlinear differential equations can admit solutions which have only finite...
The paper presents the optimal homotopy perturbation method, which is a new method to find approxima...
We consider wave solutions to nonlinear sigma models in n dimensions. First, we reduce the system of...
We consider wave solutions to nonlinear sigma models in n dimensions. First, we reduce the system of...
This article solves the well-known Korteweg-de Vries equation by the homotopy analysis method, an an...
We obtain approximate solutions to the Dym equation, and associated initial value problem, for gener...
We obtain approximate solutions to the Dym equation, and associated initial value problem, for gener...
In recent work on the area of approximation methods for the solution of nonlinear differential equat...
The homotopy method for the solution of nonlinear equations is revisited in the present study. An an...
The Whitham equation is a non-local model for nonlinear dispersive water waves. Since this equation ...
In the present paper, we have considered three methods with which to control the error in the homoto...
International audienceWe derive the Whitham equations from the water waves equations in the shallow ...
The two-dimensional nonlinear wave equations are considered. Solution to the problem is approximated...
In the present paper, we have considered three methods with which to control the error in the homoto...
AbstractThe homotopy perturbation method (HPM) is employed to find the explicit and numerical travel...
Implicitly defined fully nonlinear differential equations can admit solutions which have only finite...
The paper presents the optimal homotopy perturbation method, which is a new method to find approxima...
We consider wave solutions to nonlinear sigma models in n dimensions. First, we reduce the system of...
We consider wave solutions to nonlinear sigma models in n dimensions. First, we reduce the system of...
This article solves the well-known Korteweg-de Vries equation by the homotopy analysis method, an an...
We obtain approximate solutions to the Dym equation, and associated initial value problem, for gener...
We obtain approximate solutions to the Dym equation, and associated initial value problem, for gener...
In recent work on the area of approximation methods for the solution of nonlinear differential equat...
The homotopy method for the solution of nonlinear equations is revisited in the present study. An an...