Remark on the ill-posedness for KdV-Burgers equation in Fourier amalgam spaces
Abstract
We have established (a weak form of) ill-posedness for the KdV-Burgers equation on a real line in Fourier amalgam spaces wsp,q with s<-1. The particular case p=q=2 recovers the result of L. Molinet and F. Ribaud [Int. Math. Res. Not., (2002), pp. 1979-2005]. The result is new even in Fourier Lebesgue space FLsq which corresponds to the case p=q(≠ 2) and in modulation space Ms2,q which corresponds to the case p=2,q≠ 2.
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