Pseudoconformal Transformation: Difference between revisions

Revision as of 02:04, 31 July 2006

The pseudoconformal transformation

$u(t,x)\to v(\tau ,y)=|\tau |^{-{\frac {d}{2}}}e^{\frac {i|y|^{2}}{4t}}u(-{\frac {1}{\tau }},{\frac {y}{\tau }})$

maps solutions of the mass critical NLS to solutions. The pseudoconformal image of a soliton is an explicit blowup solution. The pseudoconformal transformation is an isometry on $L_{x}^{2}$ and on $L^{2}$ -admissible Strichartz spaces $L_{\tau }^{q}L_{y}^{r}$ .

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 The pseudoconformal transformation
-<math> u(t,x) \to v(\tau, y) = \frac{|\tau|^{-\frac{d}{2}} e^{\frac{i |y|^2}{4t}} u ( - \frac{1}{\tau} , \frac{y}{\tau}) </math>
+<math> u(t,x) \to v(\tau, y) = |\tau|^{-\frac{d}{2}} e^{\frac{i |y|^2}{4t}} u ( - \frac{1}{\tau} , \frac{y}{\tau}) </math>
 maps solutions of the [[Mass critical NLS|mass critical NLS]] to solutions. The pseudoconformal image of a [[Soliton|soliton]] is an explicit [[Blowup solution|blowup solution]]. The pseudoconformal transformation is an isometry on <math>L^2_x</math> and on <math>L^2</math>-admissible [[Strichartz estimates|Strichartz spaces]] <math>L^q_\tau L^r_y</math>.

Pseudoconformal Transformation: Difference between revisions

Revision as of 02:04, 31 July 2006

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