A moment-equation-copula-closure method for nonlinear vibrational systems subjected to correlated noise

Abstract: We develop a moment-equation-copula-closure method for the inexpensive approximation of the steady state statistical structure of strongly nonlinear systems which are subjected to correlated excitations. Our approach relies on the derivation of moment equations that describe the dynamics governing the two-time statistics. These are combined with a non-Gaussian pdf representation for the joint response-excitation statistics, based on copula functions that has i) single time statistical structure consistent with… Show more

“…The most accurate uses Monte Carlo analysis of direct numerical computation of the oscillator response, however, this method is very time consuming since a large amount of simulation must be done on a sufficient time period. For efficiency reasons, we decide to propose a less accurate but faster method for a first analysis: the Moment Equation Copula Closure (MECC) method introduced by Joo et al [28]. This method is pratically described below.…”

“…However, this last method completely fails to capture the behavior of the bi-stable VEH when the equilibrium positions are too far from another; in these conditions, the excitation is not sufficient to enable intra-well are more frequent than inter-well movement and minimization of the MECC cost function doesnt adequately satisfyneither equations (14) nor (18). This weak point of the MECC method has been pointed out by Joo et al [28]. Once again, one note that the MECC method is much faster than Monte Carlo simulations.…”

“…First, the vibration random source is presented. Thereafter, the nonlinear vibration energy harvester model with base excitation is presented together with a semianalytical method [28] to approximate the statistical moments of interest. This method is then compared to direct Monte Carlo simulation while analyzing the behavior of the nonlinear VEH under vibrations iduced by the truck.…”

Robustness of Nonlinear Electromagnetic Vibration Energy Harvester Subjected to Random Excitation

“…The most accurate uses Monte Carlo analysis of direct numerical computation of the oscillator response, however, this method is very time consuming since a large amount of simulation must be done on a sufficient time period. For efficiency reasons, we decide to propose a less accurate but faster method for a first analysis: the Moment Equation Copula Closure (MECC) method introduced by Joo et al [28]. This method is pratically described below.…”

“…However, this last method completely fails to capture the behavior of the bi-stable VEH when the equilibrium positions are too far from another; in these conditions, the excitation is not sufficient to enable intra-well are more frequent than inter-well movement and minimization of the MECC cost function doesnt adequately satisfyneither equations (14) nor (18). This weak point of the MECC method has been pointed out by Joo et al [28]. Once again, one note that the MECC method is much faster than Monte Carlo simulations.…”

“…First, the vibration random source is presented. Thereafter, the nonlinear vibration energy harvester model with base excitation is presented together with a semianalytical method [28] to approximate the statistical moments of interest. This method is then compared to direct Monte Carlo simulation while analyzing the behavior of the nonlinear VEH under vibrations iduced by the truck.…”

Robustness of Nonlinear Electromagnetic Vibration Energy Harvester Subjected to Random Excitation

“…The statistical response of the background dynamics for the velocity response was obtained in Eq. (17). Noting that from Eq.…”

“…Systems with forcing having these characteristics pose significant challenges for traditional uncertainty quantification schemes. While there is a large class of methods that can accurately resolve the statistics associated with random excitations (e.g., the Fokker-Planck (FP) equation [13,14] for systems excited by white-noise and the joint response-excitation method [15][16][17][18] for arbitrary stochastic excitation), these have important limitations for high dimensional systems. In addition, even for lowdimensional systems determining the part of the probability density function (pdf) associated with extreme events poses important numerical challenges.…”

Heavy-Tailed Response of Structural Systems Subjected to Stochastic Excitation Containing Extreme Forcing Events

Efficient Numerical Implementation Strategies via Sparse Representations and Compressive Sampling