Add to ORKGIn this article, the analytical method, Homotopy perturbation method (HPM) has been successfully implemented for solving nonlinear logistic model of fractional order. The fractional derivatives are described in the Caputo sense. Using initial value, the explicit solutions of population size for different particular cases have been derived. Numerical results show that the method is extremely efficient to solve this complicated biological model
Purpose - The purpose of this paper is to propose an approximate method for solving a fractional pop...
In this paper, we model the growths of populations by means of local fractional calculus. We formula...
AbstractIn this paper, we study a fractional differential equation model of the single species multi...
AbstractThis paper presents an efficient numerical algorithm for approximate solutions of a fraction...
In this paper, the population dynamics model including the predator-prey problem and the logistic eq...
This article is concerned with the prediction of population growth using the logistic growth model i...
In this paper, optimal homotopy asymptotic method has been extended to seek out the exact solution o...
summary:This paper considers a Volterra's population system of fractional order and describes a bi-p...
In this article, a well-known analytical approximation method, so-called the Homotopy perturbation m...
In this paper, we present approximate analytical solution of the time-fractional biological populati...
Recently, in the direction of developing realistic mathematical models, there are a number of works...
This paper considers the approximation of solution for a fractional order biological population mode...
The goal of this work is to show, based on concrete data, that fractional differential equations wit...
AbstractIn this article, a mathematical model has been developed for the generalized time fractional...
WOS: 000310411700006Purpose - The purpose of this paper is to propose an approximate method for solv...
Purpose - The purpose of this paper is to propose an approximate method for solving a fractional pop...
In this paper, we model the growths of populations by means of local fractional calculus. We formula...
AbstractIn this paper, we study a fractional differential equation model of the single species multi...
AbstractThis paper presents an efficient numerical algorithm for approximate solutions of a fraction...
In this paper, the population dynamics model including the predator-prey problem and the logistic eq...
This article is concerned with the prediction of population growth using the logistic growth model i...
In this paper, optimal homotopy asymptotic method has been extended to seek out the exact solution o...
summary:This paper considers a Volterra's population system of fractional order and describes a bi-p...
In this article, a well-known analytical approximation method, so-called the Homotopy perturbation m...
In this paper, we present approximate analytical solution of the time-fractional biological populati...
Recently, in the direction of developing realistic mathematical models, there are a number of works...
This paper considers the approximation of solution for a fractional order biological population mode...
The goal of this work is to show, based on concrete data, that fractional differential equations wit...
AbstractIn this article, a mathematical model has been developed for the generalized time fractional...
WOS: 000310411700006Purpose - The purpose of this paper is to propose an approximate method for solv...
Purpose - The purpose of this paper is to propose an approximate method for solving a fractional pop...
In this paper, we model the growths of populations by means of local fractional calculus. We formula...
AbstractIn this paper, we study a fractional differential equation model of the single species multi...