Difference between revisions of "Example Calculations for the KdV and IST"
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− | ==Example 2 Hat Function Potential== | + | ==Example 2: Hat Function Potential== |
We solve for the case when | We solve for the case when |
Revision as of 03:15, 24 September 2010
Nonlinear PDE's Course | |
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Example1 Delta function potential.
We have already calculated the scattering data for the delta function potential. The scattering data is
The spectral data evolves as
so that
Example 2: Hat Function Potential
We solve for the case when
For the even solutions we need to solve
where [math]\displaystyle{ \kappa=\sqrt{b-k^{2}} }[/math].
For the odd solutions we need to solve and
Recall that the solitons have amplitude [math]\displaystyle{ 2k_{n}^{2} }[/math] or [math]\displaystyle{ -2\lambda_{n} }[/math]. This can be seen in the height of the solitary waves.
We cannot work with a hat function numerically, because the jump in [math]\displaystyle{ u }[/math] leads to high frequencies which dominate the response.. We can smooth our function by a number of methods. We use here the function [math]\displaystyle{ \tanh\left( x\right) }[/math] so we write
where [math]\displaystyle{ \nu }[/math] is an appropriate constant to make the function increase in value sufficiently rapidly but not too rapidly.
Animation | Three-dimensional plot. |
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