Starting from the observation that classical asymptotic methods fail to correctly describe the resonance peak of the frequency response curve of a nonlinear oscillator under moderate and large excitation amplitudes, an alternative approach is proposed to overcome this problem. The differences between the multiple time scale method (one of the most performant classical methods) and numerical simulations are initially shown with reference to on the paradigmatic Duffing equation. They are also shown some characteristics of the near peak behavior. Then, the proposed asymptotic approach is illustrated. The basic idea is that of having the zero-order problem nonlinear, while in classical methods it is linear. Thanks to the energy conservation, th...
Many nonlinear systems in industry including oscillators can be simulated as a mass-spring system. I...
This paper investigates the dynamic behavior of a Van der Pol oscillator (used as an archetypal self...
This paper deals with an approximate method of analysis of strongly non-linear autonomous vibrating ...
Starting from the observation that classical asymptotic methods fail to correctly describe the reson...
In the present paper, a novel analytical approximation technique has been proposed based on the ener...
This work is the second in a series of articles that deal with analytical solutions of nonlinear dyn...
Abstract—This paper presents a new approach for solving accurate approximate analytical solution for...
In this paper, an analytical approximation technique has been presented of obtaining higher-order a...
Abstract Due to the growing concentration in the field of the nonlinear oscillators (NOSs), the pres...
AbstractIn the present paper, a novel analytical approximation technique has been proposed based on ...
This thesis involves the study of four problems in the area of nonlinear vibrations, using the asymp...
We applied an approach to obtain the natural frequency of the generalized Duffing oscillator u¨ + u...
The primary resonance response of a non-linear oscillatory system that is excited by both a constant...
The present study considers the nonlinear dynamics of a Duffing oscillator under a symmetric potenti...
Many nonlinear systems in industry including oscillators can be simulated as a mass-spring system. I...
Many nonlinear systems in industry including oscillators can be simulated as a mass-spring system. I...
This paper investigates the dynamic behavior of a Van der Pol oscillator (used as an archetypal self...
This paper deals with an approximate method of analysis of strongly non-linear autonomous vibrating ...
Starting from the observation that classical asymptotic methods fail to correctly describe the reson...
In the present paper, a novel analytical approximation technique has been proposed based on the ener...
This work is the second in a series of articles that deal with analytical solutions of nonlinear dyn...
Abstract—This paper presents a new approach for solving accurate approximate analytical solution for...
In this paper, an analytical approximation technique has been presented of obtaining higher-order a...
Abstract Due to the growing concentration in the field of the nonlinear oscillators (NOSs), the pres...
AbstractIn the present paper, a novel analytical approximation technique has been proposed based on ...
This thesis involves the study of four problems in the area of nonlinear vibrations, using the asymp...
We applied an approach to obtain the natural frequency of the generalized Duffing oscillator u¨ + u...
The primary resonance response of a non-linear oscillatory system that is excited by both a constant...
The present study considers the nonlinear dynamics of a Duffing oscillator under a symmetric potenti...
Many nonlinear systems in industry including oscillators can be simulated as a mass-spring system. I...
Many nonlinear systems in industry including oscillators can be simulated as a mass-spring system. I...
This paper investigates the dynamic behavior of a Van der Pol oscillator (used as an archetypal self...
This paper deals with an approximate method of analysis of strongly non-linear autonomous vibrating ...