On the analytic representation of the correlation function of linear random vibration systems

Gruner, J., Scheidt, J. vom, Wunderlich, R.

30 October 1998

This paper is devoted to the computation of statistical characteristics of the response of discrete vibration systems with a random external excitation. The excitation can act at multiple points and is modeled by a time-shifted random process and its derivatives up to the second order. Statistical characteristics of the response are given by expansions as to the correlation length of a weakly correlated random process which is used in the excitation model. As the main result analytic expressions of some integrals involved in the expansion terms are derived.

random vibrations

correlation function

asymptotic expansion

weakly correlated random function

MSC 70L05

MSC 60G10

ddc:510

On the analytic representation of the correlation function of linear random vibration systems

Gruner, J., Scheidt, J. vom, Wunderlich, R.

30 October 1998

This paper is devoted to the computation of statistical characteristics of the response of discrete vibration systems with a random external excitation. The excitation can act at multiple points and is modeled by a time-shifted random process and its derivatives up to the second order. Statistical characteristics of the response are given by expansions as to the correlation length of a weakly correlated random process which is used in the excitation model. As the main result analytic expressions of some integrals involved in the expansion terms are derived.

info:eu-repo/classification/ddc/510

ddc:510

random vibrations

correlation function

asymptotic expansion

weakly correlated random function

MSC 70L05

MSC 60G10