Problem: Solitons

  Some nonlinear partial differential equations have solitary wave, or soliton solutions. Solitons have a finite ``extension" and they ``survive" collisions with other solitons. These concepts are well illustrated by the sine-Gordon equation:

 

where is a variable depending on the position x and time t, and m is a parameter. The simplest physical system represented by this equation is an array of pendula. Electronic excitations in polymers like (CH) , magnetic chains, and other systems are also modeled by this equation.

(a) Show that the ``single-soliton",

 

is a solution to Eq. 5.12. Calculate in terms of v and . Plot the solution for v=0. Show that is close to 0 or for almost every x, except in a range of width and estimate for v=0. Calculate the energy stored in the system, relative to the energy of the solution.

  
Figure 5.1: Solution of Eq. 5.12 as expressed in Eq. 5.14 for a=4 and a=0.0021 and m=1.

(b) Show that the ``two-soliton" (or ``breather"),

 

is also a solution. Calculate . Calculate the energy and show that it is always less than .

(c) In Figure 5.1 the two-soliton solution is plotted for two values of m. Demonstrate that, for small a and for most values of the time t, the solution can be approximated by the sum of two, appropriately selected ``one-soliton" solutions.