In this paper, we prove that the Cauchy problem associated to the following
higher-order Benjamin-Ono equation $$ \partial_tv-b\mathcal{H}\partial^2_xv-
a\epsilon \partial_x^3v=cv\partial_xv-d\epsilon
\partial_x(v\mathcal{H}\partial_xv+\mathcal{H}(v\partial_xv)), $$ is globally
well-posed in the energy space $H^1(\mathbb R)$. Moreover, we study the limit
behavior when the small positive parameter $\epsilon$ tends to zero and show
that, under a condition on the coefficients $a$, $b$, $c$ and $d$, the solution
$v_{\epsilon}$ to this equation converges to the corresponding solution of the
Benjamin-Ono equation

Molinet, Luc

Pilod, Didier

Communications in Partial Differential Equations

English

arXiv

International audienceIn this paper, we prove that the Cauchy problem associated to the following higher-order Benjamin-Ono equation $$ \partial_tv-b\mathcal{H}\partial^2_xv- a\epsilon \partial_x^3v=cv\partial_xv-d\epsilon \partial_x(v\mathcal{H}\partial_xv+\mathcal{H}(v\partial_xv)), $$ is globally well-posed in the energy space $H^1(\mathbb R)$. Moreover, we study the limit behavior when the small positive parameter $\epsilon$ tends to zero and show that, under a condition on the coefficients $a$, $b$, $c$ and $d$, the solution $v_{\epsilon}$ to this equation converges to the corresponding solution of the Benjamin-Ono equation

HAL Université de Tours

Global well-posedness and limit behavior for a higher-order Benjamin-Ono equation

Luc Molinet

Didier Pilod

Crossref

Global Well-Posedness and Limit Behavior for a Higher-Order Benjamin-Ono Equation

http://citeseerx.ist.psu.edu/viewdoc/summary?doi=10.1.1.400.2499

Global well-posedness and limit behavior for a higher-order Benjamin-Ono
  equation

Global well-posedness and limit behavior for a higher-order Benjamin-Ono equation

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HAL Université de Tours

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