Sharp Well-Posedness Results for the Schr\"odinger-Benjamin-Ono System

Abstract

This work is concerned with the Cauchy problem for a coupled Schr\"odinger-Benjamin-Ono system \ arrayl i∂tu+∂x2u=α uv, t\!∈\![-T,T], \ x\!∈\! R,\\ ∂tv+ H∂2xv=β ∂x(|u|2),\\ u(0,x)=φ, \ v(0,x)=, (φ,)\!∈\!Hs( R)\!×\!Hs'\!( R). array . In the non-resonant case (||1), we prove local well-posedness for a large class of initial data. This improves the results obtained by Bekiranov, Ogawa and Ponce (1998). Moreover, we prove C2-ill-posedness at low-regularity, and also when the difference of regularity between the initial data is large enough. As far as we know, this last ill-posedness result is the first of this kind for a nonlinear dispersive system. Finally, we also prove that the local well-posedness result obtained by Pecher (2006) in the resonant case (||=1) is sharp except for the end-point.