Topics
homotopy perturbation methodTopical concept
polynomialOrganisation
A new analytical method called the local fractional natural homotopy perturbation method (LFNHPM) for solving partial differential equations with local fractional derivative is introduced. The proposed analytical method is a combination of the local fractional homotopy perturbation method (LFHPM) and the local fractional natural transform (LFNTM). In this analytical method, the fractional derivative operators are computed in local fractional sense, and the nonlinear terms are calculated using He’s polynomial. Some applications are given to illustrate the simplicity, efficiency, and high accuracy of the proposed method
The aim of the present study is to extend the local fractionalSumudu decomposition method (LFSDM) to...
In this paper, we propose an efficient modification of the homotopy perturbation method for solvi...
The present study introduces a new version of homotopy perturbation method for the solution of syst...
In this paper, a combined form of natural transform with homotopy analysis method is proposed to sol...
WOS: 000288056400013In this study, we used the homotopy perturbation method (HPM) for solving fracti...
In the present paper, the explicit solutions of some local fractional partial differential equations...
In the present paper, the explicit solutions of some local fractional partial differential equations...
In present work, nonlinear fractional partial differential equations namely transport equation and F...
In this paper, we are concerned with finding approximate solutions to local fractional Poisson equat...
The homotopy perturbation method (HPM) is applied to solve nonlinear partial differential equations ...
The idea proposed in this work is to extend the ZZ transform method to resolve the nonlinear fractio...
We apply the homotopy perturbation method to obtain the solution of partial differential equations o...
In this study, we present a framework to obtain analytical solutions to nonlinear fractional Schrödi...
WOS: 000266090400003In this study, we present a framework to obtain analytical solutions to nonlinea...
We apply the local fractional Fourier series method for solving nonlinear equation with local fracti...
The aim of the present study is to extend the local fractionalSumudu decomposition method (LFSDM) to...
In this paper, we propose an efficient modification of the homotopy perturbation method for solvi...
The present study introduces a new version of homotopy perturbation method for the solution of syst...
In this paper, a combined form of natural transform with homotopy analysis method is proposed to sol...
WOS: 000288056400013In this study, we used the homotopy perturbation method (HPM) for solving fracti...
In the present paper, the explicit solutions of some local fractional partial differential equations...
In the present paper, the explicit solutions of some local fractional partial differential equations...
In present work, nonlinear fractional partial differential equations namely transport equation and F...
In this paper, we are concerned with finding approximate solutions to local fractional Poisson equat...
The homotopy perturbation method (HPM) is applied to solve nonlinear partial differential equations ...
The idea proposed in this work is to extend the ZZ transform method to resolve the nonlinear fractio...
We apply the homotopy perturbation method to obtain the solution of partial differential equations o...
In this study, we present a framework to obtain analytical solutions to nonlinear fractional Schrödi...
WOS: 000266090400003In this study, we present a framework to obtain analytical solutions to nonlinea...
We apply the local fractional Fourier series method for solving nonlinear equation with local fracti...
The aim of the present study is to extend the local fractionalSumudu decomposition method (LFSDM) to...
In this paper, we propose an efficient modification of the homotopy perturbation method for solvi...
The present study introduces a new version of homotopy perturbation method for the solution of syst...
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