Applied Mathematics Letters, ISSN 0893-9659, 07/2019, Volume 93, pp. 117 - 123

In this paper, we mainly study the (2+1)-dimensional Schrödinger–Maxwell–Blochequation (SMBE). We have constructed the generalized N-fold Darboux...

The (2+1)-dimensional Schrödinger–Maxwell–Bloch equation | Rogue wave solutions | Breather solutions | Generalized Darboux transformation | TRANSFORMATION | MATHEMATICS, APPLIED | The (2+1)-dimensional | Schrodinger-Maxwell-Bloch equation

The (2+1)-dimensional Schrödinger–Maxwell–Bloch equation | Rogue wave solutions | Breather solutions | Generalized Darboux transformation | TRANSFORMATION | MATHEMATICS, APPLIED | The (2+1)-dimensional | Schrodinger-Maxwell-Bloch equation

Journal Article

Physics Reports, ISSN 0370-1573, 02/2013, Volume 523, Issue 2, pp. 61 - 126

In the past years there was a huge interest in experimental and theoretical studies in the area of few-optical-cycle pulses and in the broader fast growing...

Few-cycle dissipative solitons | Generalized Kadomtsev–Petviashvili equation | Two-level atoms | Circular polarization | Maxwell–Bloch equations | Few-optical-cycle solitons | Modified Korteweg–de Vries equation | Density matrix | Long-wave approximation | Few-cycle pulses | Reductive perturbation method | Half-cycle optical solitons | Short-wave approximation | Unipolar pulses | Few-cycle light bullets | Linear polarization | Sine–Gordon equation | Complex modified Korteweg–de Vries equation | Modified Korteweg-de Vries equation | Generalized Kadomtsev-Petviashvili equation | Complex modified Korteweg-de Vries equation | Sine-Gordon equation | Maxwell-Bloch equations | ULTRA-SHORT PULSES | GINZBURG-LANDAU | PERTURBATION METHOD | SELF-INDUCED TRANSPARENCY | LIGHT BULLETS | SOLITARY-WAVE SOLUTIONS | PHYSICS, MULTIDISCIPLINARY | DISSIPATIVE SOLITONS | DE-VRIES EQUATION | SHORT ELECTROMAGNETIC PULSES | FEW-CYCLE | Analysis | Models | Wave propagation

Few-cycle dissipative solitons | Generalized Kadomtsev–Petviashvili equation | Two-level atoms | Circular polarization | Maxwell–Bloch equations | Few-optical-cycle solitons | Modified Korteweg–de Vries equation | Density matrix | Long-wave approximation | Few-cycle pulses | Reductive perturbation method | Half-cycle optical solitons | Short-wave approximation | Unipolar pulses | Few-cycle light bullets | Linear polarization | Sine–Gordon equation | Complex modified Korteweg–de Vries equation | Modified Korteweg-de Vries equation | Generalized Kadomtsev-Petviashvili equation | Complex modified Korteweg-de Vries equation | Sine-Gordon equation | Maxwell-Bloch equations | ULTRA-SHORT PULSES | GINZBURG-LANDAU | PERTURBATION METHOD | SELF-INDUCED TRANSPARENCY | LIGHT BULLETS | SOLITARY-WAVE SOLUTIONS | PHYSICS, MULTIDISCIPLINARY | DISSIPATIVE SOLITONS | DE-VRIES EQUATION | SHORT ELECTROMAGNETIC PULSES | FEW-CYCLE | Analysis | Models | Wave propagation

Journal Article

Applied Mathematics Letters, ISSN 0893-9659, 02/2015, Volume 40, pp. 78 - 83

In this letter, a generalized nonlinear Schrödinger–Maxwell–Bloch system is investigated, which can be used to describe the solitons in optical fibers. By...

Rogue-wave solutions | Generalized nonlinear Schrödinger–Maxwell–Bloch system | Optical-fiber communication | Generalized Darboux transformation | Schrödinger-Maxwell-Bloch system | Generalized nonlinear | TRANSFORMATION | MATHEMATICS, APPLIED | SYMBOLIC COMPUTATION | EQUATIONS | DYNAMICS | Generalized nonlinear Schrodinger-Maxwell-Bloch system | SOLITON | Water waves | Equipment and supplies | Analysis | Fiber optics | Optical fibers | Communication systems | Wave propagation | Transformations (mathematics) | Mathematical analysis | Nonlinearity | Inhomogeneity | Gain

Rogue-wave solutions | Generalized nonlinear Schrödinger–Maxwell–Bloch system | Optical-fiber communication | Generalized Darboux transformation | Schrödinger-Maxwell-Bloch system | Generalized nonlinear | TRANSFORMATION | MATHEMATICS, APPLIED | SYMBOLIC COMPUTATION | EQUATIONS | DYNAMICS | Generalized nonlinear Schrodinger-Maxwell-Bloch system | SOLITON | Water waves | Equipment and supplies | Analysis | Fiber optics | Optical fibers | Communication systems | Wave propagation | Transformations (mathematics) | Mathematical analysis | Nonlinearity | Inhomogeneity | Gain

Journal Article

Journal of Computational Physics, ISSN 0021-9991, 07/2016, Volume 317, pp. 257 - 275

In this paper, we consider the numerical solution of the one-dimensional Schrödinger equation with a periodic lattice potential and a random external...

Generalized polynomial chaos | Uncertainty quantification | Time-splitting | Bloch decomposition | Schrödinger equation | ELECTRONS | SCHRODINGER-EQUATION | PHYSICS, MATHEMATICAL | DENSITY | MULTIPHASE SEMICLASSICAL APPROXIMATION | TRANSPORT | COMPUTER SCIENCE, INTERDISCIPLINARY APPLICATIONS | Schrodinger equation | DIMENSIONAL CRYSTALLINE LATTICE | DISORDER | MAGNETIC-FIELD | DIFFUSION | OPERATORS | Analysis | Quantum theory | Methods | Computation | Solid state physics | Mathematical models | Polynomials | Schroedinger equation | Decomposition | Stochasticity | Galerkin methods | Mathematics - Numerical Analysis | RANDOMNESS | DISPERSIONS | NUMERICAL SOLUTION | STOCHASTIC PROCESSES | SCHROEDINGER EQUATION | CLASSICAL AND QUANTUM MECHANICS, GENERAL PHYSICS | ONE-DIMENSIONAL CALCULATIONS | POTENTIALS | PERIODICITY | CHAOS THEORY | SOLID STATE PHYSICS | POLYNOMIALS | SOLIDS

Generalized polynomial chaos | Uncertainty quantification | Time-splitting | Bloch decomposition | Schrödinger equation | ELECTRONS | SCHRODINGER-EQUATION | PHYSICS, MATHEMATICAL | DENSITY | MULTIPHASE SEMICLASSICAL APPROXIMATION | TRANSPORT | COMPUTER SCIENCE, INTERDISCIPLINARY APPLICATIONS | Schrodinger equation | DIMENSIONAL CRYSTALLINE LATTICE | DISORDER | MAGNETIC-FIELD | DIFFUSION | OPERATORS | Analysis | Quantum theory | Methods | Computation | Solid state physics | Mathematical models | Polynomials | Schroedinger equation | Decomposition | Stochasticity | Galerkin methods | Mathematics - Numerical Analysis | RANDOMNESS | DISPERSIONS | NUMERICAL SOLUTION | STOCHASTIC PROCESSES | SCHROEDINGER EQUATION | CLASSICAL AND QUANTUM MECHANICS, GENERAL PHYSICS | ONE-DIMENSIONAL CALCULATIONS | POTENTIALS | PERIODICITY | CHAOS THEORY | SOLID STATE PHYSICS | POLYNOMIALS | SOLIDS

Journal Article

Journal of Physics A: Mathematical and Theoretical, ISSN 1751-8113, 03/2016, Volume 49, Issue 16, p. 165203

The geometry of the generalized Bloch sphere Omega(3), the state space of a qutrit, is studied. Closed form expressions for Omega(3), its boundary. Omega(3),...

quantum state space | generalized Bloch sphere | quantum geometry | PHASES | STATES | PHYSICS, MULTIDISCIPLINARY | GAUSSIAN-WIGNER DISTRIBUTIONS | REPRESENTATION | EQUATIONS | LINEAR POSITIVE MAPS | CLASSIFICATION | PHYSICS, MATHEMATICAL | VECTOR | SYSTEMS | DENSITY-MATRICES

quantum state space | generalized Bloch sphere | quantum geometry | PHASES | STATES | PHYSICS, MULTIDISCIPLINARY | GAUSSIAN-WIGNER DISTRIBUTIONS | REPRESENTATION | EQUATIONS | LINEAR POSITIVE MAPS | CLASSIFICATION | PHYSICS, MATHEMATICAL | VECTOR | SYSTEMS | DENSITY-MATRICES

Journal Article

Physica D: Nonlinear Phenomena, ISSN 0167-2789, 2010, Volume 239, Issue 23, pp. 2057 - 2065

In this paper, we consider the relation between Evans-function-based approaches to the stability of periodic travelling waves and other theories based on...

Modulational instability | Generalized Korteweg–de Vries equation | Periodic waves | Whitham equations | MATHEMATICS, APPLIED | PHYSICS, MULTIDISCIPLINARY | PHYSICS, FLUIDS & PLASMAS | PHYSICS, MATHEMATICAL | Generalized Korteweg-de Vries equation | VISCOUS CONSERVATION-LAWS | Stability | Bloch waves | Perturbation methods | Asymptotic properties | Mathematical analysis | Modulation | Mathematical models | Spectra

Modulational instability | Generalized Korteweg–de Vries equation | Periodic waves | Whitham equations | MATHEMATICS, APPLIED | PHYSICS, MULTIDISCIPLINARY | PHYSICS, FLUIDS & PLASMAS | PHYSICS, MATHEMATICAL | Generalized Korteweg-de Vries equation | VISCOUS CONSERVATION-LAWS | Stability | Bloch waves | Perturbation methods | Asymptotic properties | Mathematical analysis | Modulation | Mathematical models | Spectra

Journal Article

Zeitschrift für Naturforschung A, ISSN 0932-0784, 10/2015, Volume 70, Issue 11, pp. 935 - 948

Under investigation in this article is a higher-order nonlinear Schrödinger–Maxwell–Bloch (HNLS-MB) system for the optical pulse propagation in an erbium-doped...

Generalised Darboux Transformation | 04.30.Nk | Spatial-Temporal Structure | 05.45.Yv | Higher-Order Nonlinear Schrödinger–Maxwell–Bloch System | Rogue Waves | Solitons | Erbium-Doped Fiber | 42.81.Dp | Rogue waves | Generalised darboux transformation | Erbium-doped fiber | Higher-order nonlinear Schrödinger-Maxwell-Bloch System | Spatial-temporal structure | PHYSICS, MULTIDISCIPLINARY | GENERALIZED DARBOUX TRANSFORMATION | EQUATIONS | CHEMISTRY, PHYSICAL | Higher-Order Nonlinear Schrodinger-Maxwell-Bloch System | Usage | Schrodinger equation | Wave propagation | Semiconductors | Analysis | Properties | Lax pairs

Generalised Darboux Transformation | 04.30.Nk | Spatial-Temporal Structure | 05.45.Yv | Higher-Order Nonlinear Schrödinger–Maxwell–Bloch System | Rogue Waves | Solitons | Erbium-Doped Fiber | 42.81.Dp | Rogue waves | Generalised darboux transformation | Erbium-doped fiber | Higher-order nonlinear Schrödinger-Maxwell-Bloch System | Spatial-temporal structure | PHYSICS, MULTIDISCIPLINARY | GENERALIZED DARBOUX TRANSFORMATION | EQUATIONS | CHEMISTRY, PHYSICAL | Higher-Order Nonlinear Schrodinger-Maxwell-Bloch System | Usage | Schrodinger equation | Wave propagation | Semiconductors | Analysis | Properties | Lax pairs

Journal Article

Zeitschrift für Naturforschung A, ISSN 0932-0784, 03/2016, Volume 71, Issue 3, pp. 241 - 247

In this article, the generalised nonlinear Schrödinger–Maxwell–Bloch system is investigated, which describes the propagation of the optical solitons in an...

Generalised Nonlinear Schrödinger–Maxwell–Bloch System | Erbium-Doped Optical Fibre | Soliton Interaction | Soliton Solutions | Symbolic Computation | Generalised Nonlinear Schrödinger-Maxwell-Bloch System | FERROMAGNETIC SPIN CHAIN | INTEGRABILITY | PHYSICS, MULTIDISCIPLINARY | BILINEAR-FORMS | CHEMISTRY, PHYSICAL | Generalised Nonlinear Schrodinger-Maxwell-Bloch System | EQUATION | Analysis | Solitons | Fiber optics

Generalised Nonlinear Schrödinger–Maxwell–Bloch System | Erbium-Doped Optical Fibre | Soliton Interaction | Soliton Solutions | Symbolic Computation | Generalised Nonlinear Schrödinger-Maxwell-Bloch System | FERROMAGNETIC SPIN CHAIN | INTEGRABILITY | PHYSICS, MULTIDISCIPLINARY | BILINEAR-FORMS | CHEMISTRY, PHYSICAL | Generalised Nonlinear Schrodinger-Maxwell-Bloch System | EQUATION | Analysis | Solitons | Fiber optics

Journal Article

Advances in Difference Equations, ISSN 1687-1839, 12/2015, Volume 2015, Issue 1, pp. 1 - 12

Let D ${\mathbb{D}}$ be the open unit disk in the complex plane C ${\mathbb{C}}$ , φ an analytic self-map of D ${\mathbb{D}}$ and H ( D ) $H({\mathbb{D}})$ the...

Zygmund space | Bloch-Orlicz space | compactness | 47B33 | Mathematics | 47B38 | Ordinary Differential Equations | Functional Analysis | 47B37 | Analysis | Difference and Functional Equations | Mathematics, general | Stević-Sharma operator | boundedness | Partial Differential Equations | INTEGRAL-TYPE OPERATORS | MATHEMATICS, APPLIED | MULTIPLICATION | MIXED-NORM SPACES | Stevic-Sharma operator | UNIT BALL | NEVANLINNA | MATHEMATICS | WEIGHTED-TYPE SPACES | DIFFERENTIATION OPERATORS | PRODUCTS | GENERALIZED COMPOSITION OPERATORS | BERGMAN | Operators | Planes | Difference equations | Analytic functions | Mathematical analysis | Texts | Disks | Differentiation

Zygmund space | Bloch-Orlicz space | compactness | 47B33 | Mathematics | 47B38 | Ordinary Differential Equations | Functional Analysis | 47B37 | Analysis | Difference and Functional Equations | Mathematics, general | Stević-Sharma operator | boundedness | Partial Differential Equations | INTEGRAL-TYPE OPERATORS | MATHEMATICS, APPLIED | MULTIPLICATION | MIXED-NORM SPACES | Stevic-Sharma operator | UNIT BALL | NEVANLINNA | MATHEMATICS | WEIGHTED-TYPE SPACES | DIFFERENTIATION OPERATORS | PRODUCTS | GENERALIZED COMPOSITION OPERATORS | BERGMAN | Operators | Planes | Difference equations | Analytic functions | Mathematical analysis | Texts | Disks | Differentiation

Journal Article

Physica D: Nonlinear Phenomena, ISSN 0167-2789, 11/2010, Volume 239, Issue 23-24, pp. 2057 - 2065

In this paper, we consider the relation between Evans-function-based approaches to the stability of periodic travelling waves and other theories based on...

Modulational instability | Periodic waves | Generalized Kortewegde Vries equation | Whitham equations

Modulational instability | Periodic waves | Generalized Kortewegde Vries equation | Whitham equations

Journal Article

Modern Physics Letters B, ISSN 0217-9849, 07/2013, Volume 27, Issue 17, p. 1350130

The generalized coupled nonlinear Schrödinger–Maxwell–Bloch system can be used to describe the propagation of optical solitons in a nonlinear light guide doped...

breathers | bound soliton | Generalized coupled nonlinear Schrödinger-Maxwell-Bloch system | Darboux transformation | PHYSICS, CONDENSED MATTER | PHYSICS, APPLIED | BIREFRINGENT FIBERS | DISPERSION | WELL | PERTURBATION | Generalized coupled nonlinear Schrodinger-Maxwell-Bloch system | PHYSICS, MATHEMATICAL | COEFFICIENTS | MEDIA | EQUATION | BRIGHT

breathers | bound soliton | Generalized coupled nonlinear Schrödinger-Maxwell-Bloch system | Darboux transformation | PHYSICS, CONDENSED MATTER | PHYSICS, APPLIED | BIREFRINGENT FIBERS | DISPERSION | WELL | PERTURBATION | Generalized coupled nonlinear Schrodinger-Maxwell-Bloch system | PHYSICS, MATHEMATICAL | COEFFICIENTS | MEDIA | EQUATION | BRIGHT

Journal Article

12.
Full Text
Soliton interactions in a generalized inhomogeneous coupled Hirota–Maxwell–Bloch system

Nonlinear Dynamics, ISSN 0924-090X, 3/2012, Volume 67, Issue 4, pp. 2799 - 2806

In this paper, via the Darboux transformation, with symbolic computation, the bright one- and two-soliton solutions for a generalized inhomogeneous coupled...

Elastic and inelastic collisions | Conservation laws | Engineering | Vibration, Dynamical Systems, Control | Optical solitons | Mechanics | Generalized inhomogeneous coupled Hirota–Maxwell–Bloch system | Dispersive fiber | Automotive Engineering | Mechanical Engineering | Symbolic computation | Darboux transformation | Generalized inhomogeneous coupled Hirota-Maxwell-Bloch system | TRANSFORMATION | DISPERSION | NONLINEAR SCHRODINGER-EQUATION | ENGINEERING, MECHANICAL | FIBERS | MECHANICS | PULSE-PROPAGATION | CONSERVATION-LAWS | Environmental law | Analysis | Solitary waves | Energy transfer | Nonlinear dynamics | Asymptotic properties | Solitons | Transformations | Dynamical systems | Collision dynamics

Elastic and inelastic collisions | Conservation laws | Engineering | Vibration, Dynamical Systems, Control | Optical solitons | Mechanics | Generalized inhomogeneous coupled Hirota–Maxwell–Bloch system | Dispersive fiber | Automotive Engineering | Mechanical Engineering | Symbolic computation | Darboux transformation | Generalized inhomogeneous coupled Hirota-Maxwell-Bloch system | TRANSFORMATION | DISPERSION | NONLINEAR SCHRODINGER-EQUATION | ENGINEERING, MECHANICAL | FIBERS | MECHANICS | PULSE-PROPAGATION | CONSERVATION-LAWS | Environmental law | Analysis | Solitary waves | Energy transfer | Nonlinear dynamics | Asymptotic properties | Solitons | Transformations | Dynamical systems | Collision dynamics

Journal Article

Zeitschrift für Naturforschung A, ISSN 0932-0784, 01/2016, Volume 71, Issue 1, pp. 9 - 20

Under investigation in this article is a generalised nonlinear Schrödinger-Maxwell-Bloch system for the picosecond optical pulse propagation in an...

02.70.Wz | Conservation Laws | Darboux Transformation | 05.45.Yv | Rogue Waves | Solitons | 42.65.Tg | Generalised Nonlinear Schrödinger–Maxwell–Bloch System | Inhomogeneous Erbium-Doped Silica Fibre | Nonlinear Tunnelling Effect | Generalised Nonlinear Schrodinger-Maxwell-Bloch System | INTEGRABILITY | PHYSICS, MULTIDISCIPLINARY | CHEMISTRY, PHYSICAL | OPTICAL SOLITONS | SELF-INDUCED TRANSPARENCY | PHASE MODULATION | SYMBOLIC COMPUTATION | MEDIA | SPATIAL SOLITONS | EQUATION | PROPAGATION | COUPLED SYSTEM

02.70.Wz | Conservation Laws | Darboux Transformation | 05.45.Yv | Rogue Waves | Solitons | 42.65.Tg | Generalised Nonlinear Schrödinger–Maxwell–Bloch System | Inhomogeneous Erbium-Doped Silica Fibre | Nonlinear Tunnelling Effect | Generalised Nonlinear Schrodinger-Maxwell-Bloch System | INTEGRABILITY | PHYSICS, MULTIDISCIPLINARY | CHEMISTRY, PHYSICAL | OPTICAL SOLITONS | SELF-INDUCED TRANSPARENCY | PHASE MODULATION | SYMBOLIC COMPUTATION | MEDIA | SPATIAL SOLITONS | EQUATION | PROPAGATION | COUPLED SYSTEM

Journal Article

Optics and Laser Technology, ISSN 0030-3992, 06/2013, Volume 48, pp. 153 - 159

In this paper, with symbolic computation, a generalized variable-coefficient coupled Hirota–Maxwell–Bloch system is studied, which can describe the ultrashort...

Dispersive fiber | Generalized variable-coefficient coupled Hirota–Maxwell–Bloch system | Optical solitons | Generalized variable-coefficient coupled Hirota-Maxwell-Bloch system | PHYSICS, APPLIED | Hirota-Maxwell-Bloch system | DISPERSION | LIGHT | MODEL | NONLINEAR SCHRODINGER-EQUATION | GUIDE | SELF-INDUCED TRANSPARENCY | PAINLEVE ANALYSIS | Generalized variable-coefficient coupled | SOLITARY WAVES | PULSE-PROPAGATION | OPTICS | BRIGHT | Analysis | Equipment and supplies | Fiber optics

Dispersive fiber | Generalized variable-coefficient coupled Hirota–Maxwell–Bloch system | Optical solitons | Generalized variable-coefficient coupled Hirota-Maxwell-Bloch system | PHYSICS, APPLIED | Hirota-Maxwell-Bloch system | DISPERSION | LIGHT | MODEL | NONLINEAR SCHRODINGER-EQUATION | GUIDE | SELF-INDUCED TRANSPARENCY | PAINLEVE ANALYSIS | Generalized variable-coefficient coupled | SOLITARY WAVES | PULSE-PROPAGATION | OPTICS | BRIGHT | Analysis | Equipment and supplies | Fiber optics

Journal Article

Computational Mathematics and Mathematical Physics, ISSN 0965-5425, 4/2012, Volume 52, Issue 4, pp. 565 - 577

In an inhomogeneous nonlinear light guide doped with two-level resonant atoms, the generalized coupled variable-coefficient nonlinear Schrödinger-Maxwell-Bloch...

the generalized coupled variable-coefficient nonlinear Schrödinger-Maxwell-Bloch system | Computational Mathematics and Numerical Analysis | conservation laws | Lax pair | soliton solution | symbolic computation | Mathematics | Darboux transformation | MATHEMATICS, APPLIED | the generalized coupled variable-coefficient nonlinear Schrodinger-Maxwell-Bloch system | DISPERSION | ION-ACOUSTIC-WAVES | EQUATIONS | NEBULONS | MODEL | PHYSICS, MATHEMATICAL | BACKLUND TRANSFORMATION | OPTICAL-FIBERS | PROPAGATION | Environmental law | Studies | Schrodinger equation | Mathematical analysis | Physics | Conservation laws | Attraction | Computation | Dynamics | Solitons | Nonlinearity | Mathematical models | Transformations

the generalized coupled variable-coefficient nonlinear Schrödinger-Maxwell-Bloch system | Computational Mathematics and Numerical Analysis | conservation laws | Lax pair | soliton solution | symbolic computation | Mathematics | Darboux transformation | MATHEMATICS, APPLIED | the generalized coupled variable-coefficient nonlinear Schrodinger-Maxwell-Bloch system | DISPERSION | ION-ACOUSTIC-WAVES | EQUATIONS | NEBULONS | MODEL | PHYSICS, MATHEMATICAL | BACKLUND TRANSFORMATION | OPTICAL-FIBERS | PROPAGATION | Environmental law | Studies | Schrodinger equation | Mathematical analysis | Physics | Conservation laws | Attraction | Computation | Dynamics | Solitons | Nonlinearity | Mathematical models | Transformations

Journal Article

16.
Full Text
Chaos Synchronization of Nonlinear Bloch Equations Based on Input-to-State Stable Control

理论物理通讯：英文版, ISSN 0253-6102, 2010, Volume 53, Issue 2, pp. 308 - 312

In this paper, we propose a new input-to-state stable （ISS） synchronization method for chaotic behavior in nonlinear Bloch equations with external disturbance....

混沌同步 | 同步控制器 | 稳定控制 | 非线性方程组 | 国际空间站 | 输入到状态稳定 | Lyapunov理论 | 线性矩阵不等式 | Input-to-state stable (ISS) control | Lyapunov theory | Nonlinear Bloch equations | Chaos synchronization | Linear ma- trix inequality (LMI) | nonlinear Bloch equations | ACTIVE CONTROL | PHYSICS, MULTIDISCIPLINARY | GENERALIZED SYNCHRONIZATION | STABILIZATION | STABILITY | linear matrix inequality (LMI) | UNCERTAIN PARAMETER | ADAPTIVE SYNCHRONIZATION | input-to-state stable (ISS) control | SMALL-GAIN THEOREM | ANTI-SYNCHRONIZATION | SYSTEMS | chaos synchronization | PARAMETER-IDENTIFICATION

混沌同步 | 同步控制器 | 稳定控制 | 非线性方程组 | 国际空间站 | 输入到状态稳定 | Lyapunov理论 | 线性矩阵不等式 | Input-to-state stable (ISS) control | Lyapunov theory | Nonlinear Bloch equations | Chaos synchronization | Linear ma- trix inequality (LMI) | nonlinear Bloch equations | ACTIVE CONTROL | PHYSICS, MULTIDISCIPLINARY | GENERALIZED SYNCHRONIZATION | STABILIZATION | STABILITY | linear matrix inequality (LMI) | UNCERTAIN PARAMETER | ADAPTIVE SYNCHRONIZATION | input-to-state stable (ISS) control | SMALL-GAIN THEOREM | ANTI-SYNCHRONIZATION | SYSTEMS | chaos synchronization | PARAMETER-IDENTIFICATION

Journal Article

Optik, ISSN 0030-4026, 03/2019, Volume 181, pp. 440 - 448

Under investigation in this paper is an inhomogeneous Hirota-Maxwell Bloch equation, which describes the propagation of optical soliton inhomogeneous fiber....

Lax pair | Soliton management | Nonlinear tunneling | Periodic oscillation | Erbium fiber | Third order dispersion | Darboux transformation | DISPERSION | SCHRODINGER-EQUATION | OPTICAL SOLITONS | NONAUTONOMOUS SOLITONS | MAXWELL-BLOCH SYSTEM | OPTICS | GENERALIZED EXTERNAL POTENTIALS

Lax pair | Soliton management | Nonlinear tunneling | Periodic oscillation | Erbium fiber | Third order dispersion | Darboux transformation | DISPERSION | SCHRODINGER-EQUATION | OPTICAL SOLITONS | NONAUTONOMOUS SOLITONS | MAXWELL-BLOCH SYSTEM | OPTICS | GENERALIZED EXTERNAL POTENTIALS

Journal Article