Nonlinear Schrodinger-Airy system: Difference between revisions

Revision as of 14:18, 3 August 2006

The nonlinear Schrodinger-Airy system

\partial _{t}u+ic\partial _{x}^{2}u+\partial _{x}^{3}u=i\gamma |u|^{2}u+\delta |u|^{2}\partial _{x}u+\epsilon u^{2}\partial _{x}u

on R is a combination of the cubic NLS equation, the derivative cubic NLS equation, complex mKdV, and a cubic nonlinear Airy equation. This equation is a general model for propogation of pulses in an optical fiber Kod1985, HasKod1987.

When $c=\delta =\epsilon =0\,$ , scaling is $s=-1\,$ .When $c=\gamma =0\,$ , scaling is \u20131/2.

LWP is known when $s\geq 1/4\,$ . St1997d

For $s>3/4\,$ this is in Lau1997, Lau2001

The $s\geq 1/4\,$ result is also known when $c$ is a time-dependent function [Cv2002], [CvLi2003]

For $s<-1/4\,$ and $\delta \,$ or $\epsilon \,$ non-zero, the solution map is not $C^{3}\,$ .

When $\delta =\epsilon =0\,$ LWP is known for $s>-1/4\,$ Cv2004

For $s<-1/4\,$ the solution map is not $C^{3}\,$ [CvLi-p]

@@ Line 15: / Line 15: @@
 For <math>s < -1/4\,</math> and <math>\delta\,</math> or <math>\epsilon\,</math> non-zero, the solution map is not <math>C^3\,</math>.
-When <math>delta = epsilon = 0\,</math> LWP is known for <math>s > -1/4\,</math> [[Bibliography#Cv2004|Cv2004]]
+When <math>\delta = \epsilon = 0\,</math> LWP is known for <math>s > -1/4\,</math> [[Bibliography#Cv2004|Cv2004]]
 For <math>s < -1/4\,</math> the solution map is not <math>C^3\,</math> [<span class="SpellE">CvLi</span>-p]