Quantum Three Wave Interaction Models
スポンサーリンク
概要
- 論文の詳細を見る
The quantum three wave interaction models are introduced for three choicesof statistics. The general Bethe states are constructed, and the existence of boundstates is discussed for each model. It is concluded that the quantum tlu'ee waveinteraction models are completely integrable.
- 社団法人日本物理学会の論文
- 1984-09-15
著者
-
Wadati Miki
Institute Of Applied Physics University Of Tsukuba
-
Wadati Miki
Institue Of Applied Physics Tsukuba University
-
Wadati Miki
Institute Of Physics College Of Arts And Sciences University Of Tokyo
-
OHKUMA Kenji
Institute of Physics,College of Arts and Sciences,University of Tokyo
-
Ohkuma K
Univ. Tokyo
-
Ohkuma Kenji
Institute Of Physics College Of Aris And Scienees University Of Tokyo
関連論文
- Spiky Soliton in Circular Polarized Alfven Wave
- Relationships among Inverse Method, Backlund Transformation and an Infinite Number of Conservation Laws
- On a New Series of Integrable Nonlinear Evolution Equations
- Nonlinear Transverse Vibrations of Elastic Beams under Tension
- Envelope Solition in a New Nonlinear Transmission Line
- Experimental and Theoretical Study of the Recurrence Phenomena in Nonlinear Transmission Line
- A Loop Soliton Propagating along a Stretched Rope
- Classification of Exactly Solvable Two-Component Models
- Nonrelativistic Theory of Factorized S-Matrix
- Knot Theory and Conformal Field Theory : Reduction Relations for Braid Generators
- Bethe States for the Quantum Three Wave Interaction Equation
- Nonlinear Transverse Oscillation of Elastic Beams under Tension
- The Kadomtsev-Petviashvili Equation:the Trace Method and the Soliton Resonances
- Thermodynamics of the Quantum Three Wave Interaction Model
- Quantum Three Wave Interaction Models
- Multiple-Pole Solutions of the Modified Korteweg-de Vries Equation
- Classical Soliton as a Limit of the Quantum Field Theory
- Link Polynomials Constructed from Solvable Models in Statistical Mechanics
- Reply to Comments on "Exactly Solvable Models and New Link Polynomials"
- Exactly Solvable Models and New Link Polynomials.V.Yang-Baxter Operator and Braid-Monoid Algebra
- Exactly Solvable Models and New Link Polynomials.IV.IRF Models
- Exactly Solvable Models and New Link Polynomials.III.Two-Variable Topological Invariants
- Exactly Solvable Models and New Link Polynomials.II.Link Polynomials for Closed 3-Braids
- Yang-Baxter Relations for Spin Models and Fermion Models
- Lax Pair for the One-Dimensional Hubbard Model
- The Gordon-Generalization Hierarchy of Exactly Solvable IRF Models
- Virasoro Algebra,von Neumann Algebra and Critical Eight-Vertex SOS Models
- Soliton Solution and Its Property of Unstable Nonlinear Schrodinger Equation
- Hydrogen Coverage on W(001)Surface as a Dynamical System
- New Representations of the Soliton Solution for the Korteweg-de Vries Equation
- Application of the Trace Method to the Modified Korteweg-de Vries Equation
- Interrelation of Alternative Sets of Lax-Pairs for a Generalized Nonlinear Schrodinger Equation
- The Quantum Nonlinear Schrodinger Model;Gelfand-Levitan Equation and Classical Soliton
- Resonant Breakup of Quantum Soliton by External Force
- Inhomogeneous Eight-Vertex SOS Model and Solvable IRF Hierarchies
- Exactly Solvable IRF Models.V.A Further New Hierarchy
- Exactly Solvable IRF Models.IV.Generalized Rogers-Remanujan Identities and a Solvable Hierarchy
- Exactly Sovable IRF Models.III.A New Hierarchy of Solvable Models
- Exactly Solvable IRF Models.II.S_N-Generalizations
- Exactly Solvable IRF Models.I.A Three-State Model
- Wave Propagation in Nonlinear Lattice. III
- A Canonical Transformation for the Sine-Gordon Equation
- Backlund Transformation for the Exponential Lattice
- Exactly Solvable Models and New Link Polynomials.I.N-State Vertex Models
- Knot Invariants and the Critical Statistical Systems
- New Integrable Nonlinear Evolution Equations
- On the Extension of Inverse Scattering Method
- Gauge Transformations in Soliton Theory
- From Solitons to Knots and Links
- The Quantum Nonlinear Schrodinger Model;Conserved Quantities
- Phase Transition in a One-Dimensional Gas with a Long-Range Linear Attractive Potential
- Conserved Quantities for Spin Models and Fermion Models
- The Macroscopic Surface Phenomena and Topological Singularities in the Superconductivity
- Bosonic Formulation of the Bethe Ansatz Method
- A Soliton and Two Solitons in an Exponential Lattice and Related Equations
- A Generalization of Inverse Scattering Method
- Determination of the One-Kink Curve of an Elastic Wire through the Inverse Method
- Theory of Structure Transition of Colloid
- A Canonical Transformation for the Exponential Lattice
- Quantum Inverse Scattering Method and Yang-Baxter Relation for Integrable Spin Systems
- Boost Operator and Its Application to Quantum Gelfand-Levitan Equation for Heisenberg-Ising Chain with Spin One-Half
- Conservation Laws of a Volterra System and Nonlinear Self-Dual Network Equation
- The Multiple Pole Solutions of the Sine-Gordon Equation
- Cusp Soliton of a New Integrable Nonlinear Evolution Equation
- A New Integrable Nonlinear Evolution Equation
- A Functional Integral Representation of the Soliton Solution
- Stochastic Korteweg-de Vries Equation
- General Solution and Lax Pair for 1-D Classical Massless Thirring Model
- The Modified Korteweg-de Vries Equation
- Wave Propagation in Nonlinear Lattice. I
- The Exact Solution of the Modified Korteweg-de Vries Equation
- Transformation Theories for Nonlinear Discrete Systems
- Simple Derivation of Backlund Transformation from Riccati Form of Inverse Method
- The Backlund Transformations and the Inverse Scattering Method of the Ernst Equation
- Theory of Canonical Transformations for Non linear Evolution Equations. I
- Solitons in an Unstable Medium
- An Evidence for the Existence of Kirkwood-Alder Transition
- Stochastic Korteweg-de Vries Equation with and Without Damping
- Backlund Transformation for Solutions of the Modified Korteweg-de Vries Equation
- Wave Propagation in Nonlinear Lattice. II
- The Exact N-Soliton Solution of the Korteweg-de Vries Equation
- Stochastic Property of K-dV Solitons Perturbed by Random Forces