A note on the uniqueness properties of solutions for the Schr\"odinger-Korteweg de Vries system
Abstract
In this work we prove that if (ui,vi), i=1,2, are smooth enough solutions of the coupled Schr\"odinger-Korteweg-de Vries system align* . arrayrl i ut+∂x2 u &-2mm=β uv - |u|2 u,\\ ∂t v + ∂x3 v &-2mm=γ ∂x |u|2-12∂x (v2) array \ align* with appropriate decay at infinity such that at two different times t0=0 and t1=1 satisfy that u1(0)-u2(0),u1(1)-u2(1),v1(0)-v2(0),v1(1)-v2(1)∈ H1(eax2dx), for a>0 big enough, then u1=u2 and v1=v2. (Let us recall that f∈ H1(eax2 dx) iff f∈ L2(eax2dx) and ∂x f∈ L2(eax2dx)).
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