Ill-posedness for the Cauchy problem of the Camassa-Holm equation in B1∞,1(R)
Abstract
For the famous Camassa-Holm equation, the well-posedness in B1+1pp,1(R) with p∈ [1,∞) and the ill-posedness in B1+1pp,r(R) with p∈ [1,∞],\ r∈ (1,∞] had been studied in d1,d2,glmy,yyg, that is to say, it only left an open problem in the critical case B1∞,1(R) proposed by Danchin in d1,d2. In this paper, we solve this problem by proving the norm inflation and hence the ill-posedness for the Camassa-Holm equation in B1∞,1(R). Therefore, the well-posedness and ill-posedness for the Camassa-Holm equation in all critial Besov spaces B1+1pp,1(R) with p∈ [1,∞] have been completed. Finally, since the norm inflation occurs by choosing an special initial data u0∈ B1∞,1(R) but u20x B0∞,1(R) (an example implies B0∞,1(R) is not a Banach algebra), we then prove that this condition is necessary. That is, if u20x∈ B0∞,1(R) holds, then the Camassa-Holm equation has a unique solution u(t,x)∈ CT(B1∞,1(R)) C1T(B0∞,1(R)) and the norm inflation will not occur.
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