posted on 2006-02-06, 17:25authored byRoger Grimshaw, E.A. Kuznetsov, E.G. Shapiro
For a system of interacting fundamental and second harmonics the soliton family
is characterized by two independent parameters, a soliton potential and a soliton
velocity. It is shown that this system, in the general situation, is not Galilean
invariant. As a result, the family of movable solitons cannot be obtained from the rest
soliton solution by applying the corresponding Galilean transformation. The region
of soliton parameters is found analytically and con rmed by numerical integration of
the steady equations. On the boundary of the region the solitons bifurcate. For this
system there exist two kinds of bifurcation: supercritical and subcritical. In the rst
case the soliton amplitudes vanish smoothly as the boundary is approached. Near
the bifurcation point the soliton form is universal, determined from the nonlinear
Schrodinger equation. For the second type of bifurcations the wave amplitudes
remain nite at the boundary. In this case the Manley-Rowe integral increases
inde nitely as the boundary is approached, and therefore according to the VK-type
stability criterion, the solitons are unstable.
History
School
Science
Department
Mathematical Sciences
Pages
187786 bytes
Publication date
2000
Notes
This is a pre-print. The definitive version: GRIMSHAW, KUZNETSOV and SHAPIRO, 2001. The two-parameter soliton family for the interaction of a fundamental and its second harmonic. Physica D, 152, pp. 325-339