Ill-posedness in the critical Sobolev space for the b-Novikov equation
Abstract
This article proves norm inflation in the critical Sobolev space H3/2(R) for the b-Novikov equation, which is a 1-parameter family of Camassa-Holm-type equations with cubic nonlinearities. This result completes the well-posedness theory for this equation, which was previously known to be locally well-posed in Hs(R) for s>3/2 and ill-posed in Hs(R) for s<3/2.
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