Wiener chaos expansions for estimating rain-flow fatigue damage in randomly vibrating structures with uncertain parameters
Artikel i vetenskaplig tidskrift, 2011

The problem of estimating the fatigue damage in randomly vibrating structures with uncertain parameters is considered. The loadings are assumed to be stationary and Gaussian. The corresponding accumulated fatigue damage is described through the rain-flow cycle counting algorithm. For stationary and ergodic loads, the accumulated rain-flow fatigue damage can be estimated if the system and the load spectrum are known. However, these estimates would be erroneous if the structure properties and/or the spectrum parameters of the loading are significantly uncertain. Corrections to account for the parameter uncertainties is usually obtained using the Gauss error propagation formula, and is accurate for small parameter variations. An alternative approach based on Wiener chaos expansions is employed to estimate the rain-flow fatigue damage in linear/nonlinear structural systems with parameter uncertainties. The performance of the proposed approach is compared with the Gauss error propagation formula. The proposed method is illustrated through fatigue damage estimation of three simplified examples involving a moving vehicle on a rough road, Morison's force due to random sea waves and the blade of a wind turbine.

stall

spectrum

life prediction

responses

gaussian loads

bifurcation

Fluid-structure interaction

Wind

Morison's force

vibrations

Random fatigue

Damage rate

Gaussian loads

airfoils

turbines

Wiener chaos

Rain-flow damage

Vehicular

Författare

S. Sarkar

IIT Madras

S. Gupta

IIT Madras

Igor Rychlik

Chalmers, Matematiska vetenskaper, Matematisk statistik

Göteborgs universitet

Probabilistic Engineering Mechanics

0266-8920 (ISSN) 18784275 (eISSN)

Vol. 26 2 387-398

Ämneskategorier

Beräkningsmatematik

DOI

10.1016/j.probengmech.2010.09.002

Mer information

Skapat

2017-10-08