On the robustness of phase locking in Kerr optical frequency combs.

We theoretically investigate the phase locking phenomena between the spectral components of Kerr optical frequency combs in the dynamical regime of Turing patterns. We show that these Turing patterns display a particularly strong and robust phase locking, originating from a cascade of phase locked triplets which asymptotically lead to a global phase locking between the modes. The local and global phase locking relationships defining the shape of the comb are analytically determined. Our analysis also shows that solitons display a much weaker phase locking that can be destroyed more easily than in the Turing pattern regime. Our results indicate that Turing patterns are generally the most suitable for applications requiring the highest stability. Experimental generation of such combs is also discussed in detail, and is in excellent agreement with the numerical simulations.

[1]  Hansuek Lee,et al.  Low-pump-power, low-phase-noise, and microwave to millimeter-wave repetition rate operation in microcombs. , 2012, Physical review letters.

[2]  Laurent Larger,et al.  Azimuthal Turing Patterns, Bright and Dark Cavity Solitons in Kerr Combs Generated With Whispering-Gallery-Mode Resonators , 2013, IEEE Photonics Journal.

[3]  Pascal Del'Haye,et al.  Hybrid electro-optically modulated microcombs. , 2012, Physical review letters.

[4]  A. Matsko,et al.  Optical hyperparametric oscillations in a whispering-gallery-mode resonator: Threshold and phase diffusion , 2005 .

[5]  N. Yu,et al.  Modal expansion approach to optical-frequency-comb generation with monolithic whispering-gallery-mode resonators , 2010 .

[6]  Yanne K Chembo,et al.  Spectrum and dynamics of optical frequency combs generated with monolithic whispering gallery mode resonators. , 2010, Physical review letters.

[7]  Yoshitomo Okawachi,et al.  Route to stabilized ultrabroadband microresonator-based frequency combs. , 2013, Optics letters.

[8]  K. Vahala,et al.  Kerr-nonlinearity optical parametric oscillation in an ultrahigh-Q toroid microcavity. , 2004, Physical review letters.

[9]  T. Kippenberg,et al.  Microresonator-Based Optical Frequency Combs , 2011, Science.

[10]  Lute Maleki,et al.  On timing jitter of mode locked Kerr frequency combs. , 2013, Optics express.

[11]  Lute Maleki,et al.  Tunable optical frequency comb with a crystalline whispering gallery mode resonator. , 2008, Physical review letters.

[12]  T. Hansson,et al.  Dynamics of the modulational instability in microresonator frequency combs , 2013, 2013 Conference on Lasers & Electro-Optics Europe & International Quantum Electronics Conference CLEO EUROPE/IQEC.

[13]  C. Menyuk,et al.  Spatiotemporal Lugiato-Lefever formalism for Kerr-comb generation in whispering-gallery-mode resonators , 2012, 1210.8210.

[14]  T. Sylvestre,et al.  Modeling of octave-spanning Kerr frequency combs using a generalized mean-field Lugiato-Lefever model. , 2012, Optics letters.

[15]  A. Matsko,et al.  Mode-locked Kerr frequency combs. , 2011, Optics letters.