Abstract
The delay-differential equation of the passive ring cavity with two-level atoms is solved numerically for three different values of the empty-cavity detuning δ and the delay time as the bifurcation parameter. We find pure intermittency for δ=0 and period doubling for δ= π. At δ= 3 2 π , there exist quasi-periodic regimes, one with mode-locked states, reaching chaos via period doubling, and another with a third appearing frequency, referring to a three-torus.
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