Quartic Kerr cavity combs: bright and dark solitons
Pedro Parra‐Rivas, Sabrina Hetzel, Yaroslav V. Kartashov, Pedro Fernández de Córdoba, J. Alberto Conejero, Alejandro B. Aceves, Carles Milián
Abstract
We theoretically investigate the dynamics, bifurcation structure, and stability of localized states in Kerr cavities driven at the pure fourth-order dispersion point. Both the normal and anomalous group velocity dispersion regimes are analyzed, highlighting the main differences from the standard second-order dispersion case. In the anomalous regime, single and multi-peak localized states exist and are stable over a much wider region of the parameter space. In the normal dispersion regime, stable narrow bright solitons exist. Some of our findings can be understood using a new, to the best of our knowledge, scenario reported here for the spatial eigenvalues, which imposes oscillatory tails to all localized states.