A remark on the vanishing diffusivity limit of the Keller-Segel equations in Besov spaces

Abstract

It is shown in [J. Differ. Equ., (2022)]22jde that given initial data u0∈ Bsp,r and for some T>0, the solutions of the parabolic-type Keller-Segel equations converge strongly in L∞TBsp,r to the hyperbolic Keller-Segel equations as the diffusivity parameter ε tends to zero. In this paper, we furthermore prove this solution maps do not converge uniformly with respect to the initial data u0 as ε0 in the same topology of Besov spaces.

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