Nonlinear Schrodinger-Airy system: Difference between revisions

Revision as of 15:24, 28 July 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

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 references.html#Kod1985 Kod1985, references.html#HasKod1987 HasKod1987

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

LWP is known when $s\geq 1/4$ . references.html#St1997d St1997d

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 references.html#Cv2004 Cv2004

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

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 '''R''' is a combination of the [[nls-3 on R|cubic NLS equation]], the [[dnls-3 on R|derivative cubic NLS equation]], [[modified Korteweg-de Vries on R|complex mKdV]], and a cubic nonlinear [[Airy equation]].  This equation is a general model for propogation of pulses in an optical fiber [[references.html#Kod1985 Kod1985]], [[references.html#HasKod1987 HasKod1987]]
-When <math>c=\delta=\epsilon = 0</math>, scaling is <math>s=-1</math>.When <math>c=\gamma=0</math>, scaling is <math>–1/2</math>.
+When <math>c=\delta=\epsilon = 0</math>, scaling is <math>s=-1</math>.When <math>c=\gamma=0</math>, scaling is –1/2.
 LWP is known when <math>s \geq 1/4</math>. [[references.html#St1997d St1997d]]