On long time behavior of solutions of the Schr\"odinger-KdV system with and without resonant interactions

Abstract

We consider the long time behavior of the solutions of the coupled Schr\"odinger-KdV systems eqnarray* \ arraylllli∂tu+∂2xu=α uv+β u|u|2,30pt (x,t)∈ R× R+,\\ ∂tv+∂3xv+v∂xv=γ ∂x(|u|2), 20pt (x,t)∈ R× R+,\\ u, v)|t=0 =(u0, v0). array . eqnarray* We show that global solutions to this system satisfy locally energy decay in a suitable interval, growing unbounded in time, in two situations. In the first case, we regard the parameter vector (α,β,γ)∈ R+× R+× R+ without any size assumption on the initial data in H1(R)× H1(R). In the second one, we consider the parameter vector (α,β,γ)∈ R+× R-× R+. In this case, we give a smallness" criterion involving the product of the parameter -β and a constant depending on the initial data in H1(R)× H1(R). Our results answer positively the open questions raised in [F. Linares, A. J. Mendez, SIAM J. Math. Anal. 53(2021) 3838-3855]. We use new ideas and different techniques from the latter paper.

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