NATURAL FREQUENCY AND MODE SHAPE SENSITIVITIES OF DAMPED SYSTEMS: PART II, MULTIPLE NATURAL FREQUENCIES

A procedure for determining the sensitivities of the eigenvalues and eigenvectors of damped vibratory systems with distinct eigenvalues is presented. The eigenpair derivatives of the structural and mechanical damped systems can be obtained consistently by solving algebraic equations with a symmetric

For a beam carrying n spring}mass systems, if the left side and right side of each attaching point and each end of the beam are regarded as nodes, then considering the compatibility of deformations and the equilibrium of forces between the two adjacent beam segments at each attaching point and incor

Frequency responses and their sensitivities have been broadly applied to "nite element model updating, structural damage detection, dynamic optimization, vibration control and so on. In this paper, the modal acceleration method for the frequency responses and the double-modal acceleration method for

The natural frequency and vibration mode sensitivities to system parameters are rigorously investigated for both tuned (cyclically symmetric) and mistuned planetary gears. Parameters under consideration include support and mesh sti!nesses, component masses, and moments of inertia. Using the well-de"