Extremes of Gaussian Processes with Bimodal Spectra

Abstract

An approximate solution is developed for the extreme‐value distribution of a stationary Gaussian process with a spectral density function that exhibits two well‐separated modes. Processes of this type arise in the analysis of the combined dynamic response to two loads or to one load that excites two of a structure's modes of vibration. Spectral moments of each of the modes taken separately are used to characterize the process; two envelope processes are then used to approximate the extreme value distribution. The proposed distribution is compared with other approximations and with results from Monte Carlo simulations.

Keywords

This publication has 11 references indexed in Scilit:

Bounds on the Probability of Failure in Random Vibration
Journal of Structural Mechanics, 1982
Envelopes of Vector Random Processes and Their Crossing Rates
The Annals of Probability, 1979
On the Distribution of the First-Passage Time for Normal Stationary Random Processes
Journal of Applied Mechanics, 1975
On the First Excursion Probability in Stationary Narrow-Band Random Vibration
Journal of Applied Mechanics, 1971
First-crossing probabilities of the linear oscillator
Journal of Sound and Vibration, 1970
Probability of Structural Failure Under Random Loading
Journal of the Engineering Mechanics Division, 1964
Zero Crossings, Peaks, and Other Statistical Measures of Random Responses
The Journal of the Acoustical Society of America, 1963
On the Vibration Statistics of a Randomly Excited Hard-Spring Oscillator. II
The Journal of the Acoustical Society of America, 1961
Reliability of Aircraft Structures in Resisting Chance Failure
Operations Research, 1959
Mathematical Analysis of Random Noise - and Appendixes
Published by Defense Technical Information Center (DTIC) ,1952