Litcius/Paper detail

Pure-quartic solitons and their generalizations—Theory and experiments

C. Martijn de Sterke, Antoine F. J. Runge, Darren D. Hudson, Andrea Blanco‐Redondo

2021APL Photonics96 citationsDOIOpen Access PDF

Abstract

Solitons are wave packets that can propagate without changing shape by balancing nonlinear effects with the effects of dispersion. In photonics, they have underpinned numerous applications, ranging from telecommunications and spectroscopy to ultrashort pulse generation. Although traditionally the dominant dispersion type has been quadratic dispersion, experimental and theoretical research in recent years has shown that high-order, even dispersion enriches the phenomenon and may lead to novel applications. In this Tutorial, which is aimed both at soliton novices and at experienced researchers, we review the exciting developments in this burgeoning area, which includes pure-quartic solitons and their generalizations. We include theory, numerics, and experimental results, covering both fundamental aspects and applications. The theory covers the relevant equations and the intuition to make sense of the results. We discuss experiments in silicon photonic crystal waveguides and in a fiber laser and assess the promises in additional platforms. We hope that this Tutorial will encourage our colleagues to join in the investigation of this exciting and promising field.

Topics & Concepts

Quartic functionDispersion (optics)PhotonicsNonlinear systemComputer scienceSolitonIntuitionPhysicsTelecommunicationsOpticsQuantum mechanicsMathematicsPure mathematicsPhilosophyEpistemologyAdvanced Fiber Laser TechnologiesOptical Network TechnologiesPhotonic Crystal and Fiber Optics
Pure-quartic solitons and their generalizations—Theory and experiments | Litcius