Search results for "GINZBURG-LANDAU EQUATION"

showing 7 items of 7 documents

Roadmap on optical rogue waves and extreme events

2016

Nail Akhmediev et al. ; 38 págs.; 28 figs.

:Ciències de la visió::Òptica física [Àrees temàtiques de la UPC]extreme eventsNonlinear opticsFreak-wavesProcess (engineering)Subject (philosophy)Supercontinuum generationPeregrine soliton01 natural sciences010309 opticsOptics0103 physical sciencesZero-dispersion wavelength[NLIN]Nonlinear Sciences [physics]Rogue wave010306 general physicsModulation instabilityComputingMilieux_MISCELLANEOUSPhysicsÒptica no lineal:Física [Àrees temàtiques de la UPC]Nonlinear schrodinger-equationbusiness.industryGinzburg-Landau equationnonlinear opticsRogue wavesOptical rogue wavesrogue wavesextreme events; nonlinear optics; rogue wavesExtreme eventsValue statisticsAtomic and Molecular Physics and OpticsElectronic Optical and Magnetic MaterialsVariety (cybernetics)Photonic crystal fibersWork (electrical)Noise-like pulsesPeregrine solitonbusinessScientific terminology
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Dissipative solitons for mode-locked lasers

2012

International audience; Dissipative solitons are localized formations of an electromagnetic field that are balanced through an energy exchange with the environment in presence of nonlinearity, dispersion and/or diffraction. Their growing use in the area of passively mode-locked lasers is remarkable: the concept of a dissipative soliton provides an excellent framework for understanding complex pulse dynamics and stimulates innovative cavity designs. Reciprocally, the field of mode-locked lasers serves as an ideal playground for testing the concept of dissipative solitons and revealing their unusual dynamics. This Review provides basic definitions of dissipative solitons, summarizes their imp…

Field (physics)NORMAL-DISPERSIONOPTICAL SOLITONSBOUND-STATES01 natural sciencesSIMILARITON FIBER LASERlaw.invention010309 opticsDissipative solitonOpticslawFiber laser0103 physical sciencesGINZBURG-LANDAU EQUATION010306 general physicsNonlinear Sciences::Pattern Formation and SolitonsCAVITY SOLITONSQuantum opticsPhysicsLOCALIZED STRUCTURESbusiness.industrySaturable absorptionLaserAtomic and Molecular Physics and OpticsSATURABLE-ABSORBERElectronic Optical and Magnetic MaterialsBiophotonicsNonlinear Sciences::Exactly Solvable and Integrable SystemsQuantum electrodynamicsDissipative systembusinessTI-SAPPHIRE LASERPULSE ENERGYNature Photonics
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WAVE PROPAGATION AND PATTERN FORMATION FOR A REACTION-DIFFUSION SYSTEM WITH NONLINEAR DIFFUSION

2008

We investigate the formation of macroscopic spatio-temporal structures (patterns) for a reaction-diffusion system with nonlinear diffusion. We show that cross-diffusion effects are responsible of pattern initiation. Through a weakly nonlinear analysis we are able to predict the shape and the amplitude of the pattern. In the weakly nonlinear regime we derive the Ginzburg-Landau equation which captures the envelope evolution and the progressing of the pattern as a wave. Numerical simulations, performed using both a particle and a spectral method, are in good agreement with the analytical results.

Pattern Ginzburg-Landau equation
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Three-Dimensional Superconducting Nanohelices Grown by He+-Focused-Ion-Beam Direct Writing

2019

Novel schemes based on the design of complex three-dimensional (3D) nanoscale architectures are required for the development of the next generation of advanced electronic components. He+ focused-ion-beam (FIB) microscopy in combination with a precursor gas allows one to fabricate 3D nanostructures with an extreme resolution and a considerably higher aspect ratio than FIB-based methods, such as Ga+ FIB-induced deposition, or other additive manufacturing technologies. In this work, we report the fabrication of 3D tungsten carbide nanohelices with on-demand geometries via controlling key deposition parameters. Our results show the smallest and highest-densely packed nanohelix ever fabricated s…

Research programFocused-ion-beam-induced depositionLibrary scienceBioengineeringGinzburg−Landau equation02 engineering and technologyEuropean Social FundPhase slipsHelium ion microscopePolitical scienceSemiconductors and NanostructuresGeneral Materials ScienceCost action[PHYS.COND]Physics [physics]/Condensed Matter [cond-mat]ComputingMilieux_MISCELLANEOUSGinzburg-Landau equationNanosuperconductorsMechanical EngineeringGinzburg landau equationFísicaQuímicaGeneral ChemistryDirect writing021001 nanoscience & nanotechnologyCondensed Matter PhysicsWork (electrical)Christian ministryHigh field0210 nano-technologyThree-dimensional nanoprinting
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Propagation of spatiotemporal solitons in dissipative media

2010

This thesis presents a semi-analytical approach for the search of (3+1)D spatio-temporal soliton solutions of the complex cubic-quintic Ginzburg-Landau equation (GL3D).We use a semi-analytical method called collective coordinate approach, to obtain an approximate profile of the unknown pulse field. This ansatz function is chosen to be a function of a finite number of parameters describing the light pulse.By applying this collective corrdinate procedure to the GL3D equation, we obtain a system of variational equations which give the evolution of the light bullet parameters as a function of the propagation distance. We show that the collective coordinate approach is uncomparably faster than t…

Soliton dissipatifBalle de lumière[PHYS.COND.CM-GEN] Physics [physics]/Condensed Matter [cond-mat]/Other [cond-mat.other]Dissipative solitonGinzburg-Landau equation[PHYS.COND.CM-GEN]Physics [physics]/Condensed Matter [cond-mat]/Other [cond-mat.other]Soliton spatio-temporelEquation de Ginzburg-LandauSpatio-temporal soliton[ PHYS.COND.CM-GEN ] Physics [physics]/Condensed Matter [cond-mat]/Other [cond-mat.other]Ligt buller
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Cross-Diffusion Driven Instability in a Predator-Prey System with Cross-Diffusion

2013

In this work we investigate the process of pattern formation induced by nonlinear diffusion in a reaction-diffusion system with Lotka-Volterra predator-prey kinetics. We show that the cross-diffusion term is responsible of the destabilizing mechanism that leads to the emergence of spatial patterns. Near marginal stability we perform a weakly nonlinear analysis to predict the amplitude and the form of the pattern, deriving the Stuart-Landau amplitude equations. Moreover, in a large portion of the subcritical zone, numerical simulations show the emergence of oscillating patterns, which cannot be predicted by the weakly nonlinear analysis. Finally when the pattern invades the domain as a trave…

WavefrontWork (thermodynamics)Partial differential equationGinzburg-Landau equationApplied MathematicsNonlinear diffusionTuring instabilityMathematical analysisFOS: Physical sciencesPattern formationPattern Formation and Solitons (nlin.PS)MechanicsNonlinear Sciences - Pattern Formation and SolitonsInstabilityNonlinear systemAmplitudeQuintic Stuart-Landau equationQuantitative Biology::Populations and EvolutionAmplitude equationSettore MAT/07 - Fisica MatematicaMarginal stabilityMathematics
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Oscillatory periodic pattern dynamics in hyperbolic reaction-advection-diffusion models

2022

In this work we consider a quite general class of two-species hyperbolic reaction-advection-diffusion system with the main aim of elucidating the role played by inertial effects in the dynamics of oscillatory periodic patterns. To this aim, first, we use linear stability analysis techniques to deduce the conditions under which wave (or oscillatory Turing) instability takes place. Then, we apply multiple-scale weakly nonlinear analysis to determine the equation which rules the spatiotemporal evolution of pattern amplitude close to criticality. This investigation leads to a cubic complex Ginzburg-Landau (CCGL) equation which, owing to the functional dependence of the coefficients here involve…

weakly nonlinear analysihyperbolic modelwave instabilityinertial effects cubic complex Ginzburg-Landau equation.Settore MAT/07 - Fisica Matematica
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