On well-posedness for some dispersive perturbations of Burgers' equation
We show that the Cauchy problem for a class of dispersive perturbations of Burgers' equations containing the low dispersion Benjamin-Ono equation $\partial$\_t u -- D^$\alpha$\_x $\partial$\_x u = $\partial$\_x(u^2), 0 < $\alpha$ $\le$ 1, is locally well-posed in H^s (R) when s > 3 /2 --...
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| Sprache: | eng |
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| Zusammenfassung: | We show that the Cauchy problem for a class of dispersive perturbations of
Burgers' equations containing the low dispersion Benjamin-Ono equation
$\partial$\_t u -- D^$\alpha$\_x $\partial$\_x u = $\partial$\_x(u^2), 0 <
$\alpha$ $\le$ 1, is locally well-posed in H^s (R) when s > 3 /2 -- 5$\alpha$
/4. As a consequence, we obtain global well-posedness in the energy space
H^{$\alpha$/2} (R) as soon as $\alpha$ > 6/7 . |
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| DOI: | 10.48550/arxiv.1702.03191 |