ON THE VIBRATIONS OF AN N -STRING

A relatively simple mathematical model involving an idealized rotating string constrained at one point is used to develop an understanding of the basic physical mechanisms that govern the development of unstable lateral vibration response. Equations de"ning the relationship between the interactive i

In 1996, E. Formanek classified all the irreducible complex representations of B n of dimension at most n y 1, where B is the Artin braid group on n strings. In this n paper we extend this classification to the representations of dimension n, for n G 9. We prove that all such representations are equ

The vibration of an axially moving string is studied when the string has geometric non-linearity and translating acceleration. Based upon the von Karman strain theory, the equations of motion are derived considering the longitudinal and transverse de#ections. The equation for the longitudinal vibrat

## Abstract Under very general assumptions, the authors prove that smooth solutions of quasilinear wave equations with small‐amplitude periodic initial data always develop singularities in the second derivatives in finite time. One consequence of these results is the fact that all solutions of the