In this paper, a negative stiffness oscillator is modelled and tested to exploit its nonlinear dynamical characteristics. The oscillator is part of a device designed to improve the current collection quality in railway overhead contact lines, and it acts like an asymmetric double-well Duffing system. Thus, it exhibits two stable equilibrium positions plus an unstable one, and the oscillations can either be bounded around one stable point (small oscillations) or include all the three positions (large oscillations). Depending on the input amplitude, the oscillator can exhibit linear and nonlinear dynamics and chaotic motion as well. Furthermore, its design is asymmetrical, and this plays a key role in its dynamic response, as the two natural ...
Regularity has always been attributed to periodicity. However, there has been a spurt of interest in...
Mechanical systems with inherent chaotic behavior are of notable practical interest due to their app...
High dimensional dynamical systems has intricate behavior either on temporal or on spatial evolution...
In this paper, a negative stiffness oscillator is modelled and tested to exploit its nonlinear dynam...
Systems exhibiting a negative stiffness region are often used as vibration isolators, due to their e...
Nonlinear dissipative phenomena are common features of many dynamical systems and engineering applic...
The primary resonance response of a non-linear oscillatory system that is excited by both a constant...
Duffing resonators are typical dynamic systems, which can exhibit chaotic oscillations, subject to c...
This paper presents a quantitative investigation on the level of vibration force and power flow tran...
ABSTRACT The Duffing oscillator is well-known models of nonlinear system, with applications in many ...
International audienceThis paper describes the dynamic behaviour of a coupled system which includes ...
The harmonic oscillations of a Duffing oscillator driven by a limited power supply are investigated ...
This paper investigates the control of a forced nonlinear-oscillator which is composed of a series-c...
The coupling of two non-linear oscillators is investigated, each with opposing non-linear overhang c...
This paper discusses the dynamic behaviour of a nonlinear two degree-of-freedom system consisting of...
Regularity has always been attributed to periodicity. However, there has been a spurt of interest in...
Mechanical systems with inherent chaotic behavior are of notable practical interest due to their app...
High dimensional dynamical systems has intricate behavior either on temporal or on spatial evolution...
In this paper, a negative stiffness oscillator is modelled and tested to exploit its nonlinear dynam...
Systems exhibiting a negative stiffness region are often used as vibration isolators, due to their e...
Nonlinear dissipative phenomena are common features of many dynamical systems and engineering applic...
The primary resonance response of a non-linear oscillatory system that is excited by both a constant...
Duffing resonators are typical dynamic systems, which can exhibit chaotic oscillations, subject to c...
This paper presents a quantitative investigation on the level of vibration force and power flow tran...
ABSTRACT The Duffing oscillator is well-known models of nonlinear system, with applications in many ...
International audienceThis paper describes the dynamic behaviour of a coupled system which includes ...
The harmonic oscillations of a Duffing oscillator driven by a limited power supply are investigated ...
This paper investigates the control of a forced nonlinear-oscillator which is composed of a series-c...
The coupling of two non-linear oscillators is investigated, each with opposing non-linear overhang c...
This paper discusses the dynamic behaviour of a nonlinear two degree-of-freedom system consisting of...
Regularity has always been attributed to periodicity. However, there has been a spurt of interest in...
Mechanical systems with inherent chaotic behavior are of notable practical interest due to their app...
High dimensional dynamical systems has intricate behavior either on temporal or on spatial evolution...