The prediction of oscillators is usually employed in various industrial and technological problems; such as car shock absorbers, bungee jumping, earthquake-proof buildings, musical instruments, metronome and the process of hearing. This manuscript investigates the effects of newly presented fractional operators on free and forced linear oscillators. The second order nonlinear classical governing differential equation of Duffing oscillator is reduced into second order linear classical governing differential equation of free and forced linear oscillators by invoking non-integer order differential operators namely Atangana-Baleanu and Caputo-Fabrizio. The fractionalized differential equation is solved by invoking Laplace transform method for f...
In this paper, we applied the Riemann-Liouville approach and the fractional Euler-Lagrange equations...
The fractional oscillator equation with the sinusoidal excitation mx″(t)+bDtαx(t)+kx(t)=Fsin(ωt), m,...
Physical Phenomena’s located around us are primarily nonlinear in nature and their solutions are of ...
The dynamic behavior of linear and nonlinear mechanical oscillators with constitutive equations invo...
The impulse response of the fractional oscillation equation was investigated, where the damping term...
WOS: 000487075500027Although the significance of the vibration equation has recently attracted the r...
This article addresses three classes of fractional oscillators named Class I, II and III. It is know...
Fluid viscoelastic dampers are of great interest in different fields of engineering. Examples of the...
An analytical approach to determine the approximate solution for the periodic motion of non-conserva...
In this paper, we present a framework to obtain analytical solutions to a fractional oscillator by t...
In this paper conservative single-degree-of-freedom oscillators with a fractional-order restoring fo...
In this paper we initiate the oscillation theory for fractional differential equations. Oscillation ...
Abstract Bifurcation characteristics of a fractional non-smooth oscillator containing clearance cons...
In this work, the fractional calculus methods are used to solve essential problems in conservative ...
A dynamical analysis of a Mathieu-van der Pol-Duffing nonlinear system with fractional-order derivat...
In this paper, we applied the Riemann-Liouville approach and the fractional Euler-Lagrange equations...
The fractional oscillator equation with the sinusoidal excitation mx″(t)+bDtαx(t)+kx(t)=Fsin(ωt), m,...
Physical Phenomena’s located around us are primarily nonlinear in nature and their solutions are of ...
The dynamic behavior of linear and nonlinear mechanical oscillators with constitutive equations invo...
The impulse response of the fractional oscillation equation was investigated, where the damping term...
WOS: 000487075500027Although the significance of the vibration equation has recently attracted the r...
This article addresses three classes of fractional oscillators named Class I, II and III. It is know...
Fluid viscoelastic dampers are of great interest in different fields of engineering. Examples of the...
An analytical approach to determine the approximate solution for the periodic motion of non-conserva...
In this paper, we present a framework to obtain analytical solutions to a fractional oscillator by t...
In this paper conservative single-degree-of-freedom oscillators with a fractional-order restoring fo...
In this paper we initiate the oscillation theory for fractional differential equations. Oscillation ...
Abstract Bifurcation characteristics of a fractional non-smooth oscillator containing clearance cons...
In this work, the fractional calculus methods are used to solve essential problems in conservative ...
A dynamical analysis of a Mathieu-van der Pol-Duffing nonlinear system with fractional-order derivat...
In this paper, we applied the Riemann-Liouville approach and the fractional Euler-Lagrange equations...
The fractional oscillator equation with the sinusoidal excitation mx″(t)+bDtαx(t)+kx(t)=Fsin(ωt), m,...
Physical Phenomena’s located around us are primarily nonlinear in nature and their solutions are of ...