Exact explicit solutions, which describe new multisoliton dynamics, have been identified for some KdV type equations using direct methods devised for this purpose. It is found that the equations, having multi-soliton solutions in terms of the KdV-type solitons, possess also an alternative set of multi-soliton solutions which include localized static structures that behave like (static) solitons when they collide with moving solitons. An alternative set of multisoliton solutions consists of the steady-state solution describing the static soliton itself and a sequence of unsteady solutions describing mutual interactions in the system (static soliton + N moving solitons) for N = 1, N = 2 and so on As distinct from common multisoliton solutions those solutions represent combinations of algebraic and hyperbolic functions and cannot be obtained using the traditional methods of soliton theory.
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26 September 2012
NUMERICAL ANALYSIS AND APPLIED MATHEMATICS ICNAAM 2012: International Conference of Numerical Analysis and Applied Mathematics
19–25 September 2012
Kos, Greece
Research Article|
September 26 2012
Alternative sets of multisoliton solutions of some integrable KdV type equations via direct methods
Georgy I. Burde
Georgy I. Burde
The Jacob Blaustein Institutes for Desert Research, Ben-Gurion University of the Negev, Sede Boqer Campus, 84990,
Israel
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AIP Conf. Proc. 1479, 1369–1372 (2012)
Citation
Georgy I. Burde; Alternative sets of multisoliton solutions of some integrable KdV type equations via direct methods. AIP Conf. Proc. 26 September 2012; 1479 (1): 1369–1372. https://doi.org/10.1063/1.4756411
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