Toda lattice
The Toda lattice, introduced by Morikazu Toda (1967), is a simple model for a one-dimensional crystal in solid state physics. It is given by a chain of particles with nearest neighbor interaction described by the equations of motion
where is the displacement of the -th particle from its equilibrium position, and is its momentum (mass ).
The Toda lattice is a prototypical example of a completely integrable system with soliton solutions. To see this one uses Flaschka's variables
such that the Toda lattice reads
Then one can verify that the Toda lattice is equivalent to the Lax equation
where [L, P] = LP - PL is the commutator of two operators. The operators L and P, the Lax pair, are linear operators in the Hilbert space of square summable sequences given by
The matrix has the property that its eigenvalues are invariant in time. These eigenvalues constitute independent integrals of motion, therefore the Toda lattice is completely integrable. In particular, the Toda lattice can be solved by virtue of the inverse scattering transform for the Jacobi operator L. The main result implies that arbitrary (sufficiently fast) decaying initial conditions asymptotically for large t split into a sum of solitons and a decaying dispersive part.
References
- Krüger, Helge; Teschl, Gerald (2009), "Long-time asymptotics of the Toda lattice for decaying initial data revisited", Rev. Math. Phys., 21 (1): 61–109, Bibcode:2009RvMaP..21...61K, MR 2493113, arXiv:0804.4693 , doi:10.1142/S0129055X0900358X
- Teschl, Gerald (2000), Jacobi Operators and Completely Integrable Nonlinear Lattices, Providence: Amer. Math. Soc., ISBN 0-8218-1940-2, MR 1711536
- Teschl, Gerald (2001), "Almost everything you always wanted to know about the Toda equation", Jahresbericht der Deutschen Mathematiker-Vereinigung, 103 (4): 149–162, MR 1879178
- Integrable Hamiltonians with Exponential Potential, Eugene Gutkin, Physica 16D (1985) 398-404.
- Toda, Morikazu (1967), "Vibration of a chain with a non-linear interaction", J. Phys. Soc. Japan, 22: 431–436, doi:10.1143/JPSJ.22.431
- Toda, Morikazu (1989), Theory of Nonlinear Lattices (2 ed.), Berlin: Springer, ISBN 978-0-387-10224-5, MR 0971987, doi:10.1007/978-3-642-83219-2
External links
- E. W. Weisstein, Toda Lattice at ScienceWorld
- G. Teschl, The Toda Lattice