A remark on the zero-filter limit for the Camassa-Holm equation in Bs2,∞()
Abstract
This paper investigates the zero-filter limit problem associated with the Camassa-Holm equation. In the work cited as C.L.L.W.L, it was established that, under the hypothesis of initial data u0∈ Bs2,r() with s>32 and 1≤ r<∞, the solutions Stα(u0) of the Camassa-Holm equation exhibit convergence in the L∞T(Bs2,r) norm to the unique solution of the Burgers equation as α→ 0. Contrary to this result, the present study demonstrates that for initial data u0∈ Bs2,∞() the solutions of the Camassa-Holm equation fail to converge strongly in the L∞T(Bs2,∞) norm to the Burgers equation as α→ 0.
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