The paper introduces an extreme value model based on statistical moments to predict modal and vibration response bounds for stochastic structures. The approach is applied to a thin beam having two input uncertain parameters: elasticity modulus and specific volume (inverse of the mass density). The input parameters are controllably generated with random shifted normal distributions that have positive statistics. Then the first two statistical moments, mean and standard deviation of natural frequency, and bending vibration displacement are predicted by solving stochastic differential equation of bending vibration of thin beams. Here, the differential equation is solved by utilizing a powerful numerical technique, discrete singular convolution...
A modified extreme-value-based methodology is discussed for computing statistical bounds associated ...
Abstract A typical uncertain vibration analysis is the determination of the statistics of the natura...
Stochastic flexural vibrations of small-scale Bernoulli–Euler beams with external damping are invest...
The paper introduces an extreme value model based on statistical moments to predict modal and vibrat...
Statistical Moment (SM) based modelling is a quite straightforward approach in stochastic modelling ...
Abstract. The consideration of uncertainties in numerical models to obtain the probabilistic descrip...
This paper deal with the stochastic finite element method for investigating the eigenvalues of free ...
The paper deals with the construction of a stochastic reduced-order model for beam-like dynamical st...
This paper presents a framework to assess the random vibration response of single-span beams. The be...
This article enhances the discrete singular convolution method for free vibration analysis of non-un...
The problem of statistically bounding the response of an engineering structure with random boundary ...
The consideration of uncertainty becomes increasingly necessary for complex engineering structures. ...
The local response of built-up structural and acoustic systems, consisting of stiff components with ...
International audienceThe paper deals with the construction of a stochastic reduced-order model for ...
The problem of statistically bounding the response of an engineering structure with random boundary ...
A modified extreme-value-based methodology is discussed for computing statistical bounds associated ...
Abstract A typical uncertain vibration analysis is the determination of the statistics of the natura...
Stochastic flexural vibrations of small-scale Bernoulli–Euler beams with external damping are invest...
The paper introduces an extreme value model based on statistical moments to predict modal and vibrat...
Statistical Moment (SM) based modelling is a quite straightforward approach in stochastic modelling ...
Abstract. The consideration of uncertainties in numerical models to obtain the probabilistic descrip...
This paper deal with the stochastic finite element method for investigating the eigenvalues of free ...
The paper deals with the construction of a stochastic reduced-order model for beam-like dynamical st...
This paper presents a framework to assess the random vibration response of single-span beams. The be...
This article enhances the discrete singular convolution method for free vibration analysis of non-un...
The problem of statistically bounding the response of an engineering structure with random boundary ...
The consideration of uncertainty becomes increasingly necessary for complex engineering structures. ...
The local response of built-up structural and acoustic systems, consisting of stiff components with ...
International audienceThe paper deals with the construction of a stochastic reduced-order model for ...
The problem of statistically bounding the response of an engineering structure with random boundary ...
A modified extreme-value-based methodology is discussed for computing statistical bounds associated ...
Abstract A typical uncertain vibration analysis is the determination of the statistics of the natura...
Stochastic flexural vibrations of small-scale Bernoulli–Euler beams with external damping are invest...