We report on an original method, due to Majorana, that leads to a semi-analytical series solution of the Thomas-Fermi equation with appropriate boundary conditions in terms of only one quadrature. We also deduce a general formula for such a solution that avoids numerical integration, but is expressed in terms of the roots of a polynomial equation. (C) 2002 American Association of Physics Teachers
AbstractThe Thomas-Fermi model is studied in the light of multiple scales. The governing equation fo...
Nous présentons quelques résultats obtenus dans un calcul Thomas-Fermi effectué sans resteindre l'es...
We obtain highly accurate solutions to the Thomas-Fermi equations for atoms and atoms in very strong...
We report on an original method, due to Majorana, that leads to a semi-analytical series solution of...
Given the Thomas–Fermi equation sqrt(x)ϕ''=ϕ**(3/2), this paper changes first the dependent variab...
By the semi-inverse method, a variational principle is obtained for the Thomas– Fermi equation, then...
In this paper, we give an analytic approximation to the solution of the Thomas-Fermi equation using ...
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...
In this article, we introduce a fractional order of rational Bessel functions collocation method (...
An approximate analytical solution of the Thomas-Fermi equation for neutral atoms is obtained, using...
We present a method for reducing the order of ordinary differential equations satisfying a given sca...
We propose a pseudospectral method for solving the Thomas-Fermi equation which is a nonlinear ordina...
We present an efficient spectral methods solver for the Thomas-Fermi equation for neutral atoms in a...
We propose a pseudospectral method for solving the Thomas-Fermi equation which is a nonlinear ordina...
AbstractThe Thomas-Fermi model is studied in the light of multiple scales. The governing equation fo...
Nous présentons quelques résultats obtenus dans un calcul Thomas-Fermi effectué sans resteindre l'es...
We obtain highly accurate solutions to the Thomas-Fermi equations for atoms and atoms in very strong...
We report on an original method, due to Majorana, that leads to a semi-analytical series solution of...
Given the Thomas–Fermi equation sqrt(x)ϕ''=ϕ**(3/2), this paper changes first the dependent variab...
By the semi-inverse method, a variational principle is obtained for the Thomas– Fermi equation, then...
In this paper, we give an analytic approximation to the solution of the Thomas-Fermi equation using ...
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...
In this article, we introduce a fractional order of rational Bessel functions collocation method (...
An approximate analytical solution of the Thomas-Fermi equation for neutral atoms is obtained, using...
We present a method for reducing the order of ordinary differential equations satisfying a given sca...
We propose a pseudospectral method for solving the Thomas-Fermi equation which is a nonlinear ordina...
We present an efficient spectral methods solver for the Thomas-Fermi equation for neutral atoms in a...
We propose a pseudospectral method for solving the Thomas-Fermi equation which is a nonlinear ordina...
AbstractThe Thomas-Fermi model is studied in the light of multiple scales. The governing equation fo...
Nous présentons quelques résultats obtenus dans un calcul Thomas-Fermi effectué sans resteindre l'es...
We obtain highly accurate solutions to the Thomas-Fermi equations for atoms and atoms in very strong...
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