Add to ORKGThe study presents numerical and approximate analytical approximations to a model of population dynamics with unbounded mortality function. The mathematical model involves a nonlocal boundary condion. A finite difierence method is implemented for the numerical solution while the homotopy analysis method (HAM) is applied to obtain the approximate series solution. The HAM solution contains an auxiliary parameter which provides a convenient way of controlling the convergence region of series solution. Results are presented for typical test problem provided in literature. Comparison of the results of both methods show validity and eficiency of the methods
International audienceWe deeply researched into the asymptotic behaviour of a numerical method adapt...
In this paper, we have implement an analytic approximate method based on power series method (PSM) t...
.In the present work, a new approach is proposed for finding the analytical solution of population b...
The study presents numerical and approximate analytical approximations to a model of population dyna...
We examine possible approximate solutions of both integer and noninteger systems of nonlinear differ...
AbstractIn this paper, we used an efficient algorithm to obtain an analytic approximation for Volter...
In this paper, we used an efficient algorithm to obtain an analytic approximation for Volterra's mod...
In this Letter, the homotopy-perturbation method (HPM) is employed to derive approximate series solu...
AbstractIn this article, we investigate the accuracy of the homotopy analysis method (HAM) for solvi...
AbstractHe’s homotopy perturbation method is applied for obtaining approximate analytical solutions ...
Volterra’s model for population growth in a closed system consists in an integral term to indicate a...
WOS: 000303624600006Purpose - The aim of this paper is to present the numerical simulation of the po...
Abstract. We consider a model of population dynamics whose mortality function is unbounded. We note ...
Purpose - The aim of this paper is to present the numerical simulation of the population dynamics mo...
AbstractContinuous Galerkin finite element methods in the age-time domain are proposed to approximat...
International audienceWe deeply researched into the asymptotic behaviour of a numerical method adapt...
In this paper, we have implement an analytic approximate method based on power series method (PSM) t...
.In the present work, a new approach is proposed for finding the analytical solution of population b...
The study presents numerical and approximate analytical approximations to a model of population dyna...
We examine possible approximate solutions of both integer and noninteger systems of nonlinear differ...
AbstractIn this paper, we used an efficient algorithm to obtain an analytic approximation for Volter...
In this paper, we used an efficient algorithm to obtain an analytic approximation for Volterra's mod...
In this Letter, the homotopy-perturbation method (HPM) is employed to derive approximate series solu...
AbstractIn this article, we investigate the accuracy of the homotopy analysis method (HAM) for solvi...
AbstractHe’s homotopy perturbation method is applied for obtaining approximate analytical solutions ...
Volterra’s model for population growth in a closed system consists in an integral term to indicate a...
WOS: 000303624600006Purpose - The aim of this paper is to present the numerical simulation of the po...
Abstract. We consider a model of population dynamics whose mortality function is unbounded. We note ...
Purpose - The aim of this paper is to present the numerical simulation of the population dynamics mo...
AbstractContinuous Galerkin finite element methods in the age-time domain are proposed to approximat...
International audienceWe deeply researched into the asymptotic behaviour of a numerical method adapt...
In this paper, we have implement an analytic approximate method based on power series method (PSM) t...
.In the present work, a new approach is proposed for finding the analytical solution of population b...