Operator norm-based determination of failure probability of nonlinear oscillators with fractional derivative elements subject to imprecise stationary Gaussian loads

• Published in: Mechanical systems and signal processing Vol. 208; p. 111043
• Main Authors: Jerez, D.J., Fragkoulis, V.C., Ni, P., Mitseas, I.P., Valdebenito, M.A., Faes, M.G.R., Beer, M.
• Format: Journal Article
• Language: English
• Published: Elsevier Ltd 15.02.2024
• Subjects: First-passage probability; Fractional derivative; Imprecise probabilities; Statistical linearization; Stochastic averaging; Uncertainty quantification; Uncertainty quantification; Imprecise probabilities; First-passage probability; Stochastic averaging; Statistical linearization; Fractional derivative
• ISSN: 0888-3270; 1096-1216
• DOI: 10.1016/j.ymssp.2023.111043

An approximate analytical technique is developed for bounding the first-passage probability of lightly damped nonlinear and hysteretic oscillators endowed with fractional derivative elements and subjected to imprecise stationary Gaussian loads. In particular, the statistical linearization and stochastic averaging methodologies are integrated with an operator norm-based approach to formulate a numerically efficient proxy for the first-passage probability. This proxy is employed to determine the realizations of the interval-valued parameters of the excitation model that yield the extrema of the failure probability function. Ultimately, each failure probability bound is determined in a fully decoupled manner by solving a standard optimization problem followed by a single evaluation of the first-passage probability. The proposed approximate technique can be construed as an extension of a recently developed operator norm scheme to account for oscillators with fractional derivative elements. In addition, it can readily treat a wide range of nonlinear and hysteretic behaviors. To illustrate the applicability and effectiveness of the proposed technique, a hardening Duffing and a bilinear hysteretic nonlinear oscillators with fractional derivative elements subject to imprecise stationary Gaussian loads are considered as numerical examples.