On the analyticity of the nonlinear Fourier transform of the Benjamin-Ono equation on T
Abstract
We prove that the nonlinear Fourier transform of the Benjamin-Ono equation on T, also referred to as Birkhoff map, is a real analytic diffeomorphism from the scale of Sobolev spaces Hs0(T,R), s > -1/2, to the scale of weighted 2-sequence spaces, hs +1/2r,0(N,C), s >-1/2. As an application we show that for any -1/2<s<0, the flow map of the Benjamin-Ono equation S0t : Hs0(T,R) Hs0(T,R) is nowhere locally uniformly continuous in Hs0(T,R).
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