Numerical study of linear and nonlinear string vibrations by means of physical discretization

O'Reilly and Holmes [1] performed experiments and analysis of non-linear motion of a string subjected to vertical oscillation of one end. Their analysis suggested that differences between theoretical and experimental results were mainly due to uncertainty in the assumed form for the forcing function

## Abstract In this work, accurate solutions to linear and nonlinear diffusion equations were introduced. A polynomial‐based differential quadrature scheme in space and a strong stability preserving Runge–Kutta scheme in time have been combined for solving these equations. This scheme needs less st

An asymptotic analysis based on the homogenization technique in the framework of linear dynamics for an arbitrary range of frequencies has been applied to an infinite one-dimensional (1D) system which consists of elastically supported discrete masses, linked by beams. Three scale regions of eigenfre