Parallel analysis of rotationally periodic structures

The purpose of this paper is to determine eigensolutions of a rotationally periodic structure \(P\) of period \(N\) in terms of those of the \(i\) th substructure \(S^{(i)}\) of \(P\). Let \(\mathbf{y}^{(i)}\) be the generalized displacement vector and \(\mathbf{f}^{(i)}\) be the generalized force v

## STANDING WAVES IN ROTATIONALLY PERIODIC STRUCTURES A rotationally periodic structure consists of a finite number of identical sub-structures forming a closed ring. By considering normal modes of vibration as standing waves, for which there are only certain allowed values of the propagation cons

## Abstract By considering the characteristics of deformation of rotationally periodic structures subjected to rotationally periodic loads, the periodic structure is divided into several identical substructures in this paper. If the structure is really periodic but not axisymmetric, the number of t