ON THE VIBRATION OF ONE-DIMENSIONAL 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

A cracked rotor on #exible bearings is studied in this paper. The vibration of such a system has many complexities because of the crack and bearing #exibility. However, if the properties of the bearings are known, the system can be simpli"ed by supposing that, the vibration due to weight is dominant

Complex built-up structures often consist of structural elements of a periodic nature. Examples of these include plate or shell elements reinforced by stiffeners at regular intervals. This paper describes a theoretical method for evaluating the coupling loss factor (CLF) of a coupled periodic struct

## Abstract In this paper, we analyze finite one‐dimensional photonic crystals in which the layers in the primitive cell follow a pseudonoise sequence pattern. In this analysis, the layers are composed of two different materials, but the organization of the layers in the primitive cell is varied. T