This article addresses three classes of fractional oscillators named Class I, II and III. It is known that the solutions to fractional oscillators of Class I type are represented by the Mittag-Leffler functions. However, closed form solutions to fractional oscillators in Classes II and III are unknown. In this article, we present a theory of equivalent systems with respect to three classes of fractional oscillators. In methodology, we first transform fractional oscillators with constant coefficients to be linear 2-order oscillators with variable coefficients (variable mass and damping). Then, we derive the closed form solutions to three classes of fractional oscillators using elementary functions. The present theory of equivalent oscillator...
Copyright © 2013 H. Qin and B. Zheng.This is an open access article distributed under theCreative Co...
In this paper, we use three operators called K-, A-, and B-operators to define the equation of motio...
In this work, the study of the fractional behavior of the Bateman–Feshbach–Tikochinsky and Caldirola...
This article addresses three classes of fractional oscillators named Class I, II and III. It is know...
The prediction of oscillators is usually employed in various industrial and technological problems; ...
The fractional oscillator equation with the sinusoidal excitation mx″(t)+bDtαx(t)+kx(t)=Fsin(ωt), m,...
In this research, we generalize a family of electronic parametric oscillators in the fractional doma...
In this work, a new fractional-order sinusoidal oscillator is proposed. The proposed oscillator cons...
In this paper, we present a framework to obtain analytical solutions to a fractional oscillator by t...
Although the Van der Pol oscillator, which was originally proposed as a model of vacuum tube circuit...
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...
In this paper, we applied the Riemann-Liouville approach and the fractional Euler-Lagrange equations...
Into this paper, the amplitude-frequency and phase-frequency characteristics of the Van der Polar fr...
This paper illustrates a class of mechanical systems exhibiting a damping mechanism based on fractio...
Copyright © 2013 H. Qin and B. Zheng.This is an open access article distributed under theCreative Co...
In this paper, we use three operators called K-, A-, and B-operators to define the equation of motio...
In this work, the study of the fractional behavior of the Bateman–Feshbach–Tikochinsky and Caldirola...
This article addresses three classes of fractional oscillators named Class I, II and III. It is know...
The prediction of oscillators is usually employed in various industrial and technological problems; ...
The fractional oscillator equation with the sinusoidal excitation mx″(t)+bDtαx(t)+kx(t)=Fsin(ωt), m,...
In this research, we generalize a family of electronic parametric oscillators in the fractional doma...
In this work, a new fractional-order sinusoidal oscillator is proposed. The proposed oscillator cons...
In this paper, we present a framework to obtain analytical solutions to a fractional oscillator by t...
Although the Van der Pol oscillator, which was originally proposed as a model of vacuum tube circuit...
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...
In this paper, we applied the Riemann-Liouville approach and the fractional Euler-Lagrange equations...
Into this paper, the amplitude-frequency and phase-frequency characteristics of the Van der Polar fr...
This paper illustrates a class of mechanical systems exhibiting a damping mechanism based on fractio...
Copyright © 2013 H. Qin and B. Zheng.This is an open access article distributed under theCreative Co...
In this paper, we use three operators called K-, A-, and B-operators to define the equation of motio...
In this work, the study of the fractional behavior of the Bateman–Feshbach–Tikochinsky and Caldirola...