Parametric localized patterns and breathers in dispersive quadratic cavities
Pedro Parra‐Rivas, Carlos Mas Arabí, François Léo
Abstract
We study the formation of localized patterns arising in doubly resonant dispersive optical parametric oscillators. They form through the locking of fronts connecting a continuous-wave and a Turing pattern state. This type of localized state can be seen as a slug of the pattern embedded in a homogeneous surrounding. They are organized in terms of a homoclinic snaking bifurcation structure, which is preserved under the modification of the control parameters of the system. We show that, in the presence of phase mismatch, localized patterns can undergo oscillatory instabilities which make them breathe in a complex manner.
Topics & Concepts
BreatherHomoclinic orbitParametric statisticsBifurcationHomogeneousQuadratic equationPattern formationPhysicsType (biology)Homoclinic bifurcationClassical mechanicsMathematical analysisMathematicsGeometryStatistical physicsQuantum mechanicsNonlinear systemGeologyGeneticsBiologyStatisticsPaleontologyNonlinear Dynamics and Pattern FormationAdvanced Fiber Laser TechnologiesNonlinear Photonic Systems