Global continua of solutions to the Lugiato-Lefever model for frequency combs obtained by two-mode pumping

Abstract

We consider Kerr frequency combs in a dual-pumped microresonator as time-periodic and spatially 2π-periodic traveling wave solutions of a variant of the Lugiato-Lefever equation, which is a damped, detuned and driven nonlinear Schr\"odinger equation given by iaτ =(ζ-i)a - d ax x-|a|2a+if0+if1ei(k1 x-1 τ). The main new feature of the problem is the specific form of the source term f0+f1ei(k1 x-1 τ) which describes the simultaneous pumping of two different modes with mode indices k0=0 and k1∈ N. We prove existence and uniqueness theorems for these traveling waves based on a-priori bounds and fixed point theorems. Moreover, by using the implicit function theorem and bifurcation theory, we show how non-degenerate solutions from the 1-mode case, i.e. f1=0, can be continued into the range f1 =0. Our analytical findings apply both for anomalous (d>0) and normal (d<0) dispersion, and they are illustrated by numerical simulations.