Short-Time Nonlinear Effects in the Exciton-Polariton System

Abstract

In the exciton-polariton system, a linear dispersive photon field is coupled to a nonlinear exciton field. Short-time analysis of the lossless system shows that, when the photon field is excited, the time required for that field to exhibit nonlinear effects is longer than the time required for the nonlinear Schr\"odinger equation, in which the photon field itself is nonlinear. When the initial condition is scaled by εα, it is found that the relative error committed by omitting the nonlinear term in the exciton-polariton system remains within ε for all times up to t=Cεβ, where β=(1-α(p-1))/(p+2). This is in contrast to β=1-α(p-1) for the nonlinear Schr\"odinger equation.