The Lugiato-Lefever equation with nonlinear damping caused by two photon absorption

Abstract

In this paper we investigate the effect of nonlinear damping on the Lugiato-Lefever equation ∂t a = -(-ζ) a - daxx -(1+)|a|2a + f on the torus or the real line. For the case of the torus it is shown that for small nonlinear damping >0 stationary spatially periodic solutions exist on branches that bifurcate from constant solutions whereas all nonconstant solutions disappear when the damping parameter exceeds a critical value. These results apply both for normal (d<0) and anomalous (d>0) dispersion. For the case of the real line we show by the Implicit Function Theorem that for small nonlinear damping >0 and large detuning ζ 1 and large forcing f 1 strongly localized, bright solitary stationary solutions exists in the case of anomalous dispersion d>0. These results are achieved by using techniques from bifurcation and continuation theory and by proving a convergence result for solutions of the time-dependent Lugiato-Lefever equation.