Such lattice supports soliton solutions. For a single soliton the
deviation of the *n*th
particle from its equilibrium position can be written as

,

where the lattice constant is chosen as the unit of length, and
.

The soliton is a pulslike wave with the speed
.
It always moves faster than plane waves. (The speed of sound is
.)
The smaller the soliton's width (**~1/ k**),
the faster it propagates.

The lattice is compressed by the value **2 k/b**
around a soliton (we assume

A more complete description of the Toda solitons you can find in the book:

M. Toda, *Theory of Nonlinear Lattices*,
(Springer-Verlag, New York 1989).

The above

You can launch either a *wide soliton* (** k=0.5**)
or a

The time is shown in units of the shortest period of
small amplitude plane wave vibrations,
.
Energy is shown in arbitrary units. The **kinetic**
energy of the particle and the **potential**
energy of the bond are shown as the **red** and the
**yellow** bars, respectively.

If you wait for a while you will see a power spectrum of the particles' vibrations. It will be shown in the left panel. As the time of the evolution goes the spectrum resolution improves. The frequency unit is the maximal plane wave frequency, .

Last modified: December 1, 1996

Sergey Kiselev,