This paper aims at introducing the governing equation of motion of a continuous fractionally damped system under generic input loads, no matter the order of the fractional derivative. Moreover, particularizing the excitation as a random noise, the evaluation of the power spectral density performed in frequency domain highlights relevant features of such a system. Numerical results have been carried out considering a cantilever beam under stochastic loads. The influence of the fractional derivative order on the power spectral density response has been investigated, underscoring the damping effect in reducing the power spectral density amplitude for higher values of the fractional derivative order. Finally, the fractional derivative term i...
Stochastic flexural vibrations of small-scale Bernoulli–Euler beams with external damping are invest...
Random flexural vibrations of small-scale Bernoulli–Euler beams with internal and external damping a...
This contribution deals with the vibrational response of Euler-Bernoulli beams equipped with tuned m...
This paper aims at introducing the governing equation of motion of a continuous fractionally damped ...
In this paper an original method is presented to compute the stochastic response of singledegree- of...
Fractional-order derivatives appear in various engineering applications including models for viscoel...
A method is presented to compute the non-stationary response of single-degree-of-freedom structural ...
The paper proposes a method to investigate the stochastic dynamics of a vibroimpact single-degree-of...
In this paper vibrating continuous linear systems with generalized damping distributions defined acc...
Fractional power-law nonlinear drift arises in many applications of engineering interest, as in stru...
Non-local viscoelasticity is a subject of great interest in the context of non-local theories. In a ...
Fractional power-law nonlinear drift arises in many applications of engineering interest, as in stru...
Recently, a displacement-based non-local beam model has been developed and the relative finite eleme...
Stochastic flexural vibrations of small-scale Bernoulli–Euler beams with external damping are invest...
Random flexural vibrations of small-scale Bernoulli–Euler beams with internal and external damping a...
This contribution deals with the vibrational response of Euler-Bernoulli beams equipped with tuned m...
This paper aims at introducing the governing equation of motion of a continuous fractionally damped ...
In this paper an original method is presented to compute the stochastic response of singledegree- of...
Fractional-order derivatives appear in various engineering applications including models for viscoel...
A method is presented to compute the non-stationary response of single-degree-of-freedom structural ...
The paper proposes a method to investigate the stochastic dynamics of a vibroimpact single-degree-of...
In this paper vibrating continuous linear systems with generalized damping distributions defined acc...
Fractional power-law nonlinear drift arises in many applications of engineering interest, as in stru...
Non-local viscoelasticity is a subject of great interest in the context of non-local theories. In a ...
Fractional power-law nonlinear drift arises in many applications of engineering interest, as in stru...
Recently, a displacement-based non-local beam model has been developed and the relative finite eleme...
Stochastic flexural vibrations of small-scale Bernoulli–Euler beams with external damping are invest...
Random flexural vibrations of small-scale Bernoulli–Euler beams with internal and external damping a...
This contribution deals with the vibrational response of Euler-Bernoulli beams equipped with tuned m...