Verifying Galilean Invariance of the KdV Equation

squenshl
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Homework Statement


Show that the KdV has Galilean invariance.
That is ut + 6uux + uxxx = 0 is invariant under the transformation xi = x - ct, tau = t, psi = phi - c/6


Homework Equations





The Attempt at a Solution


Do we use the chain rule on these and plug into the KdV?
 
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That would be what I would do. Essentially you just want to make that "change" of variables and show that you get exactly the same equation again. And changing variables in a differential equation involves the chain rule.
 
Thanks.
So d/dx = xix*d/dxi + taux*d/dtau = d/dxi
and d/dt = xit*d/dxi + taut*d/dtau = -cd/dxi + d/dtau
 
Got it.
Thanks.
 

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