The local well-posedness, blow-up phenomena and ill-posedness of a new fifth-order Camassa-Holm type equation
Abstract
In this paper, we study a new fifth-order Camassa-Holm type equation derived by Li Li.Z. We firstly establish the local well-posedness in the sense of Hadamard for the Cauchy problem of the new fifth-order Camassa-Holm type equation in Besov spaces. Secondly, we obtain blow-up criteria. Building upon this, by utilizing the conservation laws and establishing local boundedness, we derive a blow-up result that precisely determines the blow-up time. Finally, the ill-posedness of the new fifth-order Camassa-Holm type equation in the critical Sobolev space H12 is established via a norm inflation argument.
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