Sharp well-posedness results of the Benjamin-Ono equation in Hs(T,R) and qualitative properties of its solution

Abstract

We prove that the Benjamin--Ono equation on the torus is globally in time well-posed in the Sobolev space Hs(T,R) for any s > - 1/2 and ill-posed for s - 1/2. Hence the critical Sobolev exponent sc=-1/2 of the Benjamin--Ono equation is the threshold for well-posedness on the torus. The obtained solutions are almost periodic in time. Furthermore, we prove that the traveling wave solutions of the Benjamin-Ono equation on the torus are orbitally stable in Hs(T,R) for any s > - 1/2. Novel conservation laws and a nonlinear Fourier transform on Hs(T,R) with s > - 1/2 are key ingredients into the proofs of these results.