Global well-posedness and limit behavior for the modified finite-depth-fluid equation

Abstract

Considering the Cauchy problem for the modified finite-depth-fluid equation ∂tu-δ(∂x2u) u2ux=0, u(0)=u0, where δ f=-i -1[(2π δ )-12π δ ] f, δ 1, and u is a real-valued function, we show that it is uniformly globally well-posed if u0 ∈ Hs (s≥ 1/2) with u0L2 sufficiently small for all δ 1. Our result is sharp in the sense that the solution map fails to be C3 in Hs (s<1/2). Moreover, we prove that for any T>0, its solution converges in C([0,T]; Hs) to that of the modified Benjamin-Ono equation if δ tends to +∞.