Solution of the initial value problem for the sine-Gordon equation using a Kac-Moody algebra
- 1 December 1985
- journal article
- research article
- Published by Springer Nature in Communications in Mathematical Physics
- Vol. 98 (4) , 525-537
- https://doi.org/10.1007/bf01209328
Abstract
No abstract availableKeywords
This publication has 13 references indexed in Scilit:
- Graded algebras of the second rank and integration of nonlinear equations Y zz =exp (2Y)?2Y, Y zz =2 exp (Y)?exp (?2Y)Letters in Mathematical Physics, 1981
- Representation of zero curvature for the system of nonlinear partial differential equations $$x_{\alpha ,z\bar z} = \exp (kx)_\alpha $$ and its integrabilityLetters in Mathematical Physics, 1979
- Integration of nonlinear equations of mathematical physics by the method of inverse scattering. IIFunctional Analysis and Its Applications, 1979
- An identity for T-ordered exponentials with applications to quantum mechanicsAnnals of Physics, 1976
- Soliton operators for the quantized sine-Gordon equationPhysical Review D, 1975
- Quantum sine-Gordon equation as the massive Thirring modelPhysical Review D, 1975
- Method for Solving the Sine-Gordon EquationPhysical Review Letters, 1973
- Theory and applications of the sine-gordon equationLa Rivista del Nuovo Cimento, 1971
- Propagation of magnetic flux on a long Josephson tunnel junctionIl Nuovo Cimento B (1971-1996), 1970
- Sine-Gordon EquationJournal of Mathematical Physics, 1970