Add to ORKGIn this article, we introduce a fractional order of rational Bessel functions collocation method (FRBC) for solving the Thomas-Fermi equation. The problem is defined in the semi-infinite domain and has a singularity at $x = 0$ and its boundary condition occurs at infinity. We solve the problem on the semi-infinite domain without any domain truncation or transformation of the domain of the problem to a finite domain. This approach at first, obtains a sequence of linear differential equations by using the quasilinearization method (QLM), then at each iteration the equation is solves by FRBC method. To illustrate the reliability of this work, we compare the numerical results of the present method with some well-known results, to sho...
We report on an original method, due to Majorana, that leads to a semi-analytical series solution of...
Fractional calculus and fractional differential equations (FDE) have many applications in different ...
The finite integration method using Chebyshev polynomial (FIM-CBS) has been proposed in order to ove...
In this paper, the nonlinear Thomas-Fermi equation for neutral atoms by using the fractional order o...
In this paper, we propose Hermite collocation method for solving Thomas-Fermi equation that is nonli...
We propose a pseudospectral method for solving the Thomas-Fermi equation which is a nonlinear ordina...
We propose a pseudospectral method for solving the Thomas-Fermi equation which is a nonlinear ordina...
Given the Thomas–Fermi equation sqrt(x)ϕ''=ϕ**(3/2), this paper changes first the dependent variab...
In this paper, a novel method based on Bessel functions (BF), generalized Bessel functions (GBF), th...
We present an efficient spectral methods solver for the Thomas-Fermi equation for neutral atoms in a...
The ultimate goal of this study is to develop a numerically effective approximation technique to acq...
n this paper, we examined a wide class of the variable order fractional problems such as linear and ...
In this paper, we propose a pseudospectral method for solving the Thomas–Fermi equation which is a n...
We propose an approximate solution of T-F equation, obtained by using the nonlinearities distributio...
By the semi-inverse method, a variational principle is obtained for the Thomas– Fermi equation, then...
We report on an original method, due to Majorana, that leads to a semi-analytical series solution of...
Fractional calculus and fractional differential equations (FDE) have many applications in different ...
The finite integration method using Chebyshev polynomial (FIM-CBS) has been proposed in order to ove...
In this paper, the nonlinear Thomas-Fermi equation for neutral atoms by using the fractional order o...
In this paper, we propose Hermite collocation method for solving Thomas-Fermi equation that is nonli...
We propose a pseudospectral method for solving the Thomas-Fermi equation which is a nonlinear ordina...
We propose a pseudospectral method for solving the Thomas-Fermi equation which is a nonlinear ordina...
Given the Thomas–Fermi equation sqrt(x)ϕ''=ϕ**(3/2), this paper changes first the dependent variab...
In this paper, a novel method based on Bessel functions (BF), generalized Bessel functions (GBF), th...
We present an efficient spectral methods solver for the Thomas-Fermi equation for neutral atoms in a...
The ultimate goal of this study is to develop a numerically effective approximation technique to acq...
n this paper, we examined a wide class of the variable order fractional problems such as linear and ...
In this paper, we propose a pseudospectral method for solving the Thomas–Fermi equation which is a n...
We propose an approximate solution of T-F equation, obtained by using the nonlinearities distributio...
By the semi-inverse method, a variational principle is obtained for the Thomas– Fermi equation, then...
We report on an original method, due to Majorana, that leads to a semi-analytical series solution of...
Fractional calculus and fractional differential equations (FDE) have many applications in different ...
The finite integration method using Chebyshev polynomial (FIM-CBS) has been proposed in order to ove...