Ishimori equation
Appearance
The Ishimori equation (IE) is a partial differential equation proposed by the Japanese mathematician Ishimori (1984). Its interest is as the first example of a nonlinear spin-one field model in the plane that is integrable Sattinger, Tracy & Venakides (1991, p. 78).
Equation
The Ishimori Equation has the form
Lax representation
of the equation is given by
Here
the are the Pauli matrices and is the identity matrix.
Reductions
IE admits an important reduction: in 1+1 dimensions it reduces to the continuous classical Heisenberg ferromagnet equation (CCHFE). The CCHFE is integrable.
Equivalent counterpart
The equivalent counterpart of the IE is the Davey-Stewartson equation.
See also
- Nonlinear Schrödinger equation
- Heisenberg model (classical)
- Spin wave
- Landau–Lifshitz model
- Soliton
- Vortex
- Nonlinear systems
- Davey–Stewartson equation
References
- Gutshabash, E.Sh. (2003), "Generalized Darboux transform in the Ishimori magnet model on the background of spiral structures", JETP Letters, 78 (11): 740–744, doi:10.1134/1.1648299
- Ishimori, Yuji (1984), "Multi-vortex solutions of a two-dimensional nonlinear wave equation", Prog. Theor. Phys., 72: 33–37, doi:10.1143/PTP.72.33, MR 0760959
- Konopelchenko, B.G. (1993), Solitons in multidimensions, World Scientific, ISBN 978-981-02-1348-0
- Martina, L.; Profilo, G.; Soliani, G.; Solombrino, L. (1994), "Nonlinear excitations in a Hamiltonian spin-field model in 2+1 dimensions", Phys. Rev. B, 49 (18): 12915–12922, doi:10.1103/PhysRevB.49.12915
- Sattinger, David H.; Tracy, C. A.; Venakides, S., eds. (1991), Inverse Scattering and Applications, Contemporary Mathematics, vol. 122, Providence, RI: American Mathematical Society, ISBN 0-8218-5129-2, MR 1135850
- Sung, Li-yeng (1996), "The Cauchy problem for the Ishimori equation", Journal of Functional Analysis, 139: 29–67, doi:10.1006/jfan.1996.0078
External links
- Ishimori_system at the dispersive equations wiki