Modified Korteweg-de Vries equation: Difference between revisions

<center><span class="SpellE">u_t</span> + <span class="SpellE">u_xxx</span> = 6 u^2 <span class="SpellE">u_x</span>.</center>

It is completely <span class="SpellE">integrable</span>, and has infinitely many conserved quantities. Indeed, for each non-negative integer k, there is a conserved quantity which is roughly equivalent to the <span class="SpellE">H^k</span> norm of u. This equation has been studied [[modified Korteweg-de Vries on R|on the line]], [[modified Korteweg-de Vries on T|on the circle]], and [[generalized Korteweg-de Vries on R|on the half-line]].

<center><span class="SpellE">u_t</span> + <span class="SpellE">u_xxx</span> = - 6 u^2 <span class="SpellE">u_x</span></center>

 

In the defocusing case, the ''Miura transformation'' v = <span class="SpellE">u_x</span> + u^2 transforms a solution of <span class="SpellE">defocussing</span> <span class="SpellE">mKdV</span> to a solution of [#kdv <span class="SpellE">KdV</span>]

 

 

 

In the focusing case, the Miura transform is now v = <span class="SpellE">u_x</span> + <span class="SpellE">i</span> u^2. This transforms <span class="SpellE">focussing</span> <span class="SpellE">mKdV</span> to ''complex-valued'' <span class="SpellE">KdV</span>, which is a slightly less tractable equation. (However, the transformed solution v is still real in the highest order term, so in principle the real-valued theory carries over to this case).

 

The Miura transformation can be generalized. If v and w solve the system

 

 

 

 

<span class="GramE">then</span> u = a^2 v^2 + <span class="SpellE">av_x</span> + <span class="SpellE">bv</span> solves <span class="SpellE">KdV</span> (this is the ''Gardener transform'').