A new result for the local well-posedness of the Camassa-Holm type equations in critial Besov spaces B1+1pp,1,1≤ p<+∞
Abstract
For the famous Camassa-Holm equation, the well-posedness in B1+1pp,1(R) with 1≤ p≤2 and the ill-posedness in B1+1pp,r(R) with 1≤ p≤+∞,\ 1<r≤+∞ had been studied in d1,d2,glmy. That is to say, it left an open problem in the critical case B1+1pp,1(R) with 2<p≤+∞ proposed by Danchin in d1,d2. In this paper, we solve this problem. The main difficulty is to prove the uniqueness, which usually needs to use the Moser-type inequality, resulting in the index p belongs to [1,2]. To overcome the difficulty, inspired by Linares, Ponce and Thomas lps, we combine the Lagrange coordinate transformation and small time conditions to avoid using the Moser-type inequality. As a result, we obtain the local well-posedness for the Camassa-Holm equation in critical Besov spaces B1+1pp,1(R) with 1≤ p<+∞. It is worth mentioning that our method is suitable for many Camassa-Holm type equations such as the Novikov equation and the two-component Camassa-Holm system, which can also improve their index on the local well-posedness.
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