Non-uniform dependence on initial data for the Camassa--Holm equation in Besov spaces: Revisited

Abstract

In the paper, we revisit the uniform continuity properties of the data-to-solution map of the Camassa--Holm equation on the real-line case. We show that the data-to-solution map of the Camassa--Holm equation is not uniformly continuous on the initial data in Besov spaces Bp, rs(R) with s>12 and 1≤ p, r< ∞, which improves the previous works [Himonas et al., Asian J. Math., 11 (2007)], [Li et al., J. Differ. Equ., 269 (2020)] and [Li et al., J. Math. Fluid Mech., 23 (2021)]. Furthermore, we present a strengthening of our previous work in [Li et al., J. Differ. Equ., 269 (2020)] and prove that the data-to-solution map for the Camassa--Holm equation is nowhere uniformly continuous in Bsp,r(R) with s>\1+1/p,3/2\ and (p,r)∈ [1,∞]×[1,∞). The method applies also to the b-family of equations which contain the Camassa--Holm and Degasperis--Procesi equations.

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