Mathematical transform of traveling-wave equations and phase aspects of quantum interaction

Abstract

The traveling wave equation is an essential tool in the study of vibrations and oscillating systems. This paper introduces an important extension to the Fourier/Laplace transform that is needed for the analysis of signals that are represented by traveling wave equations. Another objective of the paper is to present a mathematical technique for the simulation of the behavior of large systems of optical oscillators. © E. G. Bakhoum and C. Toma 2010.