We prove that, the initial value problem associated to u_{t} + i\alphau_{xx}
+ \beta u_{xxx} + i\gamma |u|^{2}u = 0, x,t \in R, is locally well-posed in
Sobolev spaces H^{s} for s>-1/4

Carvajal, Xavier

English

arXiv

We prove that the initial value problem associated with $$ partial_tu+ialpha partial^2_x u+Beta partial^3_x u +igamma|u|^2u = 0, quad x,t in mathbb{R}, $$ is locally well-posed in $H^s$ for $s>-1/4$

Xavier Carvajal

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Local well-posedness for a higher order nonlinear Schrodinger equation in Sobolev spaces of negative indices

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Well-posedness for a higher order nonlinear Schrodinger equation in Sobolev spaces of negative indices

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