Response of secondary systems in structures subjected to transient excitation

Consider a SDOF system, excited by a transient force f (t), which is a pulse of "nite duration t \* . The equation of motion may be written as

Volterra series provides a strong platform for non-linear analysis and higher order frequency response functions. However, limited convergence is an inherent di$culty associated with the series and needs to be addressed rigorously, prior to its application to a physical system. The power series repr

A practical method for the determination of the dynamic random response of an indeterministic structure excited by a random stationary dynamic load is described. Random processes and random fields are approximated by random variables, under some simplifying assumptions justified by practical enginee

A formulation has been proposed for the transfer function of a secondary system response while the primary system is supported on a compliant soil and the excitation comprises of translational ground motion at its base. For this purpose, the earlier formulation of the authors for the fixed-base case

A new approximate technique developed by Mansour and Hussein [1] has been used to solve a non-linear differential equation model that describes the underdamped and the overdamped motion of systems subjected to step function excitation. The analytical results obtained in this work have been compared