We obtain approximate solutions to the Dym equation, and associated initial value problem, for general initial data by way of an optimal homotopy analysis method. By varying the auxiliary linear operator, thereby varying the time evolution of approximate solutions, we perform two independent homotopy analyses for the Dym equation. We obtain two separate approximate solutions, each dependent on the respective convergence control parameter. A method to control the residual error of each of these approximate solutions, through the use of the embedded convergence control parameter, is discussed. Treating each approximate solution individually, we select the value of the convergence control parameter which minimizes a sum of squared residual err...
The Whitham equation is a non-local model for nonlinear dispersive water waves. Since this equation ...
International audienceIn this work, approximate analytic solutions for different types of KdV equati...
A simple and effective procedure is employed to propose a new analytic approximate solution for nonl...
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...
We apply the method of homotopy analysis to the Zakharov system with dissipation in order to obtain ...
We apply the method of homotopy analysis to the Zakharov system with dissipation in order to obtain ...
We consider the stability of the homotopy analysis method under the choice of both linear operator a...
The Homotopy Analysis Method of Liao [Liao SJ. Beyond perturbation: introduction to the Homotopy Ana...
We consider two numerical solution approaches for the Dym initial value problem using the reproducin...
In this paper, a new approximate analytical algorithm namely multistage optimal homotopy asymptotic ...
Abstract: Aim of the paper is to investigate approximate analytical solution of time-dependent parti...
In this paper we applied a new analytic approximate technique Optimal Homotopy Asymp-totic Method (O...
Implicitly defined fully nonlinear differential equations can admit solutions which have only finite...
The homotopy analysis method (HAM) is applied to obtain the analytic approximate solution of the wel...
The Whitham equation is a non-local model for nonlinear dispersive water waves. Since this equation ...
International audienceIn this work, approximate analytic solutions for different types of KdV equati...
A simple and effective procedure is employed to propose a new analytic approximate solution for nonl...
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...
We apply the method of homotopy analysis to the Zakharov system with dissipation in order to obtain ...
We apply the method of homotopy analysis to the Zakharov system with dissipation in order to obtain ...
We consider the stability of the homotopy analysis method under the choice of both linear operator a...
The Homotopy Analysis Method of Liao [Liao SJ. Beyond perturbation: introduction to the Homotopy Ana...
We consider two numerical solution approaches for the Dym initial value problem using the reproducin...
In this paper, a new approximate analytical algorithm namely multistage optimal homotopy asymptotic ...
Abstract: Aim of the paper is to investigate approximate analytical solution of time-dependent parti...
In this paper we applied a new analytic approximate technique Optimal Homotopy Asymp-totic Method (O...
Implicitly defined fully nonlinear differential equations can admit solutions which have only finite...
The homotopy analysis method (HAM) is applied to obtain the analytic approximate solution of the wel...
The Whitham equation is a non-local model for nonlinear dispersive water waves. Since this equation ...
International audienceIn this work, approximate analytic solutions for different types of KdV equati...
A simple and effective procedure is employed to propose a new analytic approximate solution for nonl...