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Hamiltonian structure of Thirring x Liouville model. Singular solutions

Journal Article · · Theor. Math. Phys.; (United States)
DOI:https://doi.org/10.1007/BF01017091· OSTI ID:5273732
The author consider a generalization to the singular case of an essentially nonlinear model of classical field theory. In two-dimensional space-time, interacting scalar and spinor fields possessing definite singularities in the (t, x) plane are considered. A Hamiltonian description in terms of regular canonical variables is proposed.
Research Organization:
State University, Kuibyshev (USSR)
OSTI ID:
5273732
Journal Information:
Theor. Math. Phys.; (United States), Journal Name: Theor. Math. Phys.; (United States) Vol. 71:3; ISSN TMPHA
Country of Publication:
United States
Language:
English

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Related Subjects

645400* -- High Energy Physics-- Field Theory
72 PHYSICS OF ELEMENTARY PARTICLES AND FIELDS
CAUCHY PROBLEM
DIFFERENTIAL EQUATIONS
EQUATIONS
FIELD THEORIES
HAMILTONIANS
LIOUVILLE THEOREM
MATHEMATICAL OPERATORS
NONLINEAR PROBLEMS
PARTIAL DIFFERENTIAL EQUATIONS
QUANTUM FIELD THEORY
QUANTUM OPERATORS
SCALAR FIELDS
SCHROEDINGER EQUATION
SINGULARITY
SPACE-TIME
SPINOR FIELDS
THIRRING MODEL
TWO-DIMENSIONAL CALCULATIONS
WAVE EQUATIONS