Korteweg-de Vries equation on T: Difference between revisions
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** Remark: s=-1/2 is the <span class="SpellE">symplectic</span> regularity, and so the machinery of infinite-dimensional <span class="SpellE">symplectic</span> geometry applies once one has a continuous flow, although there are some technicalities involving approximating <span class="SpellE">KdV</span> by a suitable <span class="SpellE">symplectic</span> finite-dimensional flow. In particular one has <span class="SpellE">symplectic</span> non-squeezing [CoKeStTkTa-p9], [[Bo1999]]. | ** Remark: s=-1/2 is the <span class="SpellE">symplectic</span> regularity, and so the machinery of infinite-dimensional <span class="SpellE">symplectic</span> geometry applies once one has a continuous flow, although there are some technicalities involving approximating <span class="SpellE">KdV</span> by a suitable <span class="SpellE">symplectic</span> finite-dimensional flow. In particular one has <span class="SpellE">symplectic</span> non-squeezing [CoKeStTkTa-p9], [[Bo1999]]. | ||
* C^0 GWP in <span class="SpellE">H^s</span> for s >= -1, in the real case [<span class="SpellE">KpTp</span>-p]. | * C^0 GWP in <span class="SpellE">H^s</span> for s >= -1, in the real case [<span class="SpellE">KpTp</span>-p]. | ||
** Analytic GWP in <span class="SpellE">H^s</span> in the real case for s >= -1/2 [[ | ** Analytic GWP in <span class="SpellE">H^s</span> in the real case for s >= -1/2 [[CoKeStTkTa-p2]]; see also [[CoKeStTkTa-p3]]. | ||
** A short proof for the s > -3/10 case is in [[ | ** A short proof for the s > -3/10 case is in [[CoKeStTkTa-p2a]] | ||
** Was proven for s >= 0 in [[Bo1993b]]. | ** Was proven for s >= 0 in [[Bo1993b]]. | ||
** GWP for real initial data which are measures of small norm [[Bo1997]] <span class="GramE">The</span> small norm restriction is presumably technical. | ** GWP for real initial data which are measures of small norm [[Bo1997]] <span class="GramE">The</span> small norm restriction is presumably technical. | ||
Revision as of 14:45, 10 August 2006
The local and global well-posedness theory for the Korteweg-de Vries equation on the torus is as follows.
- Scaling is s_c = -3/2.
- C^0 LWP in H^s for s >= -1, assuming u is real [KpTp-p]
- C^0 LWP in H^s for s >= -5/8 follows (at least in principle) from work on the mKdV equation by [Takaoka and Tsutsumi?]
- Analytic LWP in H^s for s >= -1/2, in the complex case KnPoVe1996. In addition to the usual bilinear estimate, one needs a linear estimate to keep the solution in H^s for t>0.
- Analytic LWP was proven for s >= 0 in Bo1993b.
- Analytic ill posedness at s<-1/2, even in the real case Bo1997
- This has been refined to failure of uniform continuity at s<-1/2 [CtCoTa-p]
- Remark: s=-1/2 is the symplectic regularity, and so the machinery of infinite-dimensional symplectic geometry applies once one has a continuous flow, although there are some technicalities involving approximating KdV by a suitable symplectic finite-dimensional flow. In particular one has symplectic non-squeezing [CoKeStTkTa-p9], Bo1999.
- C^0 GWP in H^s for s >= -1, in the real case [KpTp-p].
- Analytic GWP in H^s in the real case for s >= -1/2 CoKeStTkTa-p2; see also CoKeStTkTa-p3.
- A short proof for the s > -3/10 case is in CoKeStTkTa-p2a
- Was proven for s >= 0 in Bo1993b.
- GWP for real initial data which are measures of small norm Bo1997 The small norm restriction is presumably technical.
- Remark: measures have the same scaling as H^{-1/2}, but neither space includes the other. (Measures are in H^{-1/2-\eps} though).
- One has GWP for real random data whose Fourier coefficients decay like 1/|k| (times a Gaussian random variable) Bo1995c. Indeed one has an invariant measure.
- Solitons are asymptotically H^1 stable [MtMe-p3], [MtMe-p].Indeed, the solution decouples into a finite sum of solitons plus dispersive radiation EckShr1988
