Dispersive blow-up for a coupled Schr\"odinger-fifth order KdV system

Abstract

In this work we establish a dispersive blow-up result for the initial value problem (IVP) for the coupled Schr\"odinger-fifth order Korteweg-de Vries system align* . arrayrl i ut+∂x2 u &-2mm=α uv + γ |u|2 u, x∈ R, t∈ R,\\ ∂t v + ∂x5 v + ∂x v2&-2mm=ε ∂x |u|2, x∈ R, t∈ R,\\ u(x,0)&-2mm= u0(x), v(x,0)=v0(x). array \ align* To achieve this, we prove a local well-posedness result in Bourgain spaces of the type Xs+β,b× Ys,b, along with a regularity property for the nonlinear part of the IVP solutions. This property enables the construction of initial data that leads to the dispersive blow-up phenomenon.

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