In this paper, a new analytical solution to the undamped Helmholtz oscillator equation in terms of the Weierstrass elliptic function is reported. The solution is given for any arbitrary initial conditions. A comparison between our new solution and the numerical approximate solution using the Range Kutta approach is performed. We think that the methodology employed here may be useful in the study of several nonlinear problems described by a differential equation of the form z″=Fz in the sense that z=zt. In this context, our solutions are applied to some physical applications such as the signal that can propagate in the LC series circuits. Also, these solutions were used to describe and investigate some oscillations in plasma physics such as ...
This work is a study of approximations to solutions to a class of problem for the Helmholtz (reduced...
In this article, first we present a new approach based on Green’s formula, to describe the uniquenes...
The Cauchy problem for the Helmholtz equation appears in applications related to acoustic or electro...
This paper presents some novel solutions to the family of the Helmholtz equations (including the con...
AbstractIn this paper, we derive a class of analytical solution of the damped Helmholtz–Duffing osci...
In this study, a novel analytical solution to the integrable undamping Duffing equation with constan...
en este trabajo se obtiene una solución exacta a la ecuación de Helmholtz con condiciones iniciales ...
Oscillators are omnipresent; most of them are inherently nonlinear. Though a nonlinear equation most...
AbstractApproximate periodic solutions for the Helmholtz–Duffing oscillator are obtained in this pap...
In this work we obtain an exact solution to the Helmholtz equation with initial conditions and bound...
The exact and explicit homoclinic solution of the undamped Helmholtz-Duffing oscillator is derived b...
The anharmonic-oscillator equation with dissipation has been widely used in various areas of science...
WOS: 000297140300022Approximate periodic solutions for the Helmholtz-Duffing oscillator are obtained...
In this article, an analytical technique has been developed to determine approximate solutions of n...
A rational elliptic balance method is introduced to obtain exact and approximate solutions of nonlin...
This work is a study of approximations to solutions to a class of problem for the Helmholtz (reduced...
In this article, first we present a new approach based on Green’s formula, to describe the uniquenes...
The Cauchy problem for the Helmholtz equation appears in applications related to acoustic or electro...
This paper presents some novel solutions to the family of the Helmholtz equations (including the con...
AbstractIn this paper, we derive a class of analytical solution of the damped Helmholtz–Duffing osci...
In this study, a novel analytical solution to the integrable undamping Duffing equation with constan...
en este trabajo se obtiene una solución exacta a la ecuación de Helmholtz con condiciones iniciales ...
Oscillators are omnipresent; most of them are inherently nonlinear. Though a nonlinear equation most...
AbstractApproximate periodic solutions for the Helmholtz–Duffing oscillator are obtained in this pap...
In this work we obtain an exact solution to the Helmholtz equation with initial conditions and bound...
The exact and explicit homoclinic solution of the undamped Helmholtz-Duffing oscillator is derived b...
The anharmonic-oscillator equation with dissipation has been widely used in various areas of science...
WOS: 000297140300022Approximate periodic solutions for the Helmholtz-Duffing oscillator are obtained...
In this article, an analytical technique has been developed to determine approximate solutions of n...
A rational elliptic balance method is introduced to obtain exact and approximate solutions of nonlin...
This work is a study of approximations to solutions to a class of problem for the Helmholtz (reduced...
In this article, first we present a new approach based on Green’s formula, to describe the uniquenes...
The Cauchy problem for the Helmholtz equation appears in applications related to acoustic or electro...