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Hamiltonian description of singular solutions of the Liouville equation

Journal Article · · Theor. Math. Phys.; (United States)
OSTI ID:6990441
This paper uses Backlund and Crum transformations to give a Hamiltonian description of solutions of the Liouville equation. Regular canonical variables are introduced and Poisson brackets correctly defined. Singular solutions of the d'Alembert equations are presented.
Research Organization:
Mathematics Institute, Georgian SSR Academy of Sciences
OSTI ID:
6990441
Journal Information:
Theor. Math. Phys.; (United States), Journal Name: Theor. Math. Phys.; (United States) Vol. 65:3; ISSN TMPHA
Country of Publication:
United States
Language:
English

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Related Subjects

657002* -- Theoretical & Mathematical Physics-- Classical & Quantum Mechanics
71 CLASSICAL AND QUANTUM MECHANICS
GENERAL PHYSICS
BAECKLUND TRANSFORMATION
BOLTZMANN-VLASOV EQUATION
CANONICAL TRANSFORMATIONS
DIFFERENTIAL EQUATIONS
EQUATIONS
FIELD THEORIES
FUNCTIONS
HAMILTONIANS
INTERACTIONS
INVERSE SCATTERING PROBLEM
JOST FUNCTION
MATHEMATICAL MODELS
MATHEMATICAL OPERATORS
PARTIAL DIFFERENTIAL EQUATIONS
PARTICLE INTERACTIONS
PARTICLE MODELS
POISSON EQUATION
QUANTUM FIELD THEORY
QUANTUM OPERATORS
QUASI PARTICLES
SCHROEDINGER EQUATION
SINGULARITY
SOLITONS
TRANSFORMATIONS
WAVE EQUATIONS